(* Content-type: application/mathematica *) (*** Wolfram Notebook File ***) (* http://www.wolfram.com/nb *) (* CreatedBy='Mathematica 6.0' *) (*CacheID: 234*) (* Internal cache information: NotebookFileLineBreakTest NotebookFileLineBreakTest NotebookDataPosition[ 145, 7] NotebookDataLength[ 9486664, 160658] NotebookOptionsPosition[ 9462917, 159953] NotebookOutlinePosition[ 9466426, 160050] CellTagsIndexPosition[ 9465508, 160027] WindowFrame->Normal ContainsDynamic->True *) (* Beginning of Notebook Content *) Notebook[{ Cell[CellGroupData[{ Cell[BoxData[ RowBox[{"2", "-", "2"}]], "Input", CellChangeTimes->{{3.3949044134974327`*^9, 3.394904422720999*^9}}], Cell[BoxData["0"], "Output", CellChangeTimes->{3.3949044240175056`*^9}] }, Open ]], Cell[CellGroupData[{ Cell[TextData[{ "Physicist's Introduction to ", StyleBox["Mathematica", FontSlant->"Italic"], " 6" }], "Title", CellChangeTimes->{{3.394579470096292*^9, 3.3945794805215673`*^9}, 3.395926374237507*^9}, FontColor->RGBColor[0, 0, 1]], Cell[TextData[StyleBox["Third Edition 2007", FontSlant->"Italic"]], "Subtitle", CellChangeTimes->{{3.394579519605548*^9, 3.3945795336356897`*^9}, { 3.394579849753665*^9, 3.3945798497607594`*^9}}], Cell["PHYSICS 200", "Subtitle", CellChangeTimes->{{3.394579873314529*^9, 3.3945798826114264`*^9}}], Cell[CellGroupData[{ Cell["Nicholas Wheeler", "Author", CellChangeTimes->{{3.39457972270331*^9, 3.3945797314311037`*^9}}], Cell["REED COLLEGE", "Institution", CellChangeTimes->{{3.3945797341591387`*^9, 3.39457973632885*^9}, { 3.394579793724296*^9, 3.3945797937303047`*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["", "Author", CellChangeTimes->{{3.3949045512170773`*^9, 3.3949045512328253`*^9}}], Cell["", "Institution"] }, Open ]], Cell[CellGroupData[{ Cell["", "Author", CellChangeTimes->{{3.394904566674387*^9, 3.394904566680563*^9}}], Cell["", "Institution"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[StyleBox["Laboratory 2", FontColor->RGBColor[1, 0, 0]]], "Subtitle", CellChangeTimes->{{3.394581250479834*^9, 3.394581255896365*^9}, 3.394810647542058*^9, 3.394904595337902*^9}], Cell[CellGroupData[{ Cell["More Advanced Graphics", "Section", CellChangeTimes->{{3.3948256925765657`*^9, 3.394825696660104*^9}, { 3.3949046357176237`*^9, 3.394904641919806*^9}}], Cell[TextData[{ "We resume our survey of the graphic resources provided by ", StyleBox["Mathematica", FontSlant->"Italic"], " 6 where we left off in ", StyleBox["Laboratory 1", FontColor->GrayLevel[0]], "." }], "Text", CellChangeTimes->{{3.394919453929192*^9, 3.394919523017693*^9}, { 3.394919563528599*^9, 3.394919570389977*^9}}], Cell["", "Text", CellChangeTimes->{{3.394923770833211*^9, 3.394923770837469*^9}}], Cell[CellGroupData[{ Cell["Graphics Primitives", "Subsection", CellChangeTimes->{{3.394923785539322*^9, 3.39492378993991*^9}, 3.3967420246846724`*^9}, FontColor->RGBColor[1, 0, 0]], Cell[TextData[{ "Graphics are constructed by assembly of points, lines and similar \ \"primatives.\" It is sometimes useful to know that those are ", StyleBox["directly accessible to the user", FontVariations->{"Underline"->True}], ". 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StyleBox[\\\"x\\\", \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"r\\\", \ \\\"TI\\\"], StyleBox[\\\"y\\\", \\\"TI\\\"]]}], \\\"}\\\"}]}], \ \\\"]\\\"}]\\) gives an elliptical disk with semi\[Hyphen]axes of lengths \\!\ \\(\\*SubscriptBox[StyleBox[\\\"r\\\", \\\"TI\\\"], StyleBox[\\\"x\\\", \ \\\"TI\\\"]]\\) and \\!\\(\\*SubscriptBox[StyleBox[\\\"r\\\", \\\"TI\\\"], \ StyleBox[\\\"y\\\", \\\"TI\\\"]]\\), oriented parallel to the coordinate \ axes. \"\>", "MSG"], " ", ButtonBox[ StyleBox["\[RightSkeleton]", "SR"], Active->True, BaseStyle->"Link", ButtonData->"paclet:ref/Disk"]}]], "Print", "PrintUsage", CellChangeTimes->{3.394929224760648*^9}, CellTags->"Info3394904024-6193308"], Cell[BoxData[ RowBox[{ StyleBox["\<\"\!\(\*RowBox[{\\\"Text\\\", \\\"[\\\", StyleBox[\\\"expr\\\", \ \\\"TI\\\"], \\\"]\\\"}]\) displays with \!\(\*StyleBox[\\\"expr\\\", \ \\\"TI\\\"]\) in plain text format. \\n\!\(\*RowBox[{\\\"Text\\\", \\\"[\\\", \ RowBox[{StyleBox[\\\"expr\\\", \\\"TI\\\"], \\\",\\\", \ StyleBox[\\\"coords\\\", \\\"TI\\\"]}], \\\"]\\\"}]\) is a graphics primitive \ that displays the textual form of \!\(\*StyleBox[\\\"expr\\\", \\\"TI\\\"]\) \ centered at the point specified by \!\(\*StyleBox[\\\"coords\\\", \\\"TI\\\"]\ \). \"\>", "MSG"], " ", ButtonBox[ StyleBox["\[RightSkeleton]", "SR"], Active->True, BaseStyle->"Link", ButtonData->"paclet:ref/Text"]}]], "Print", "PrintUsage", CellChangeTimes->{3.39492922532903*^9}, CellTags->"Info3394904025-8049909"] }, Open ]] }, Open ]], Cell[TextData[{ "I use those primitives to construct a graphic in (if I may be forgiven for \ trivializing the work of an important artist) the \"style of Piet ", Cell[BoxData[ TagBox[ ButtonBox[ PaneSelectorBox[{False->"\<\"Mondrian\"\>", True-> StyleBox["\<\"Mondrian\"\>", "HyperlinkActive"]}, Dynamic[ CurrentValue["MouseOver"]], BaselinePosition->Baseline, FrameMargins->0, ImageSize->Automatic], BaseStyle->"Hyperlink", ButtonData->{ URL["http://en.wikipedia.org/wiki/Piet_Mondrian"], None}, 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", StyleBox["Needs", "Input"], "\[LongDash]not ", StyleBox["<<", "Input"], "\[LongDash]is therefore the preferred (because least hazardous) command. 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SubscriptBox[StyleBox[\\\"f\\\", \\\"TI\\\"], StyleBox[\\\"y\\\", \ \\\"TI\\\"]]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\", \ RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\ \", RowBox[{StyleBox[\\\"y\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}]}], \\\"]\\\"}]\\) generates \ a plot of the vector field given by the vector valued function \ \\!\\(\\*RowBox[{\\\"{\\\", RowBox[{SubscriptBox[StyleBox[\\\"f\\\", \\\"TI\\\ \"], StyleBox[\\\"x\\\", \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"f\ \\\", \\\"TI\\\"], StyleBox[\\\"y\\\", \\\"TI\\\"]]}], \\\"}\\\"}]\\) as a \ function of \\!\\(\\*StyleBox[\\\"x\\\", \\\"TI\\\"]\\) and \ \\!\\(\\*StyleBox[\\\"y\\\", \ \\\"TI\\\"]\\).\\n\\!\\(\\*RowBox[{\\\"VectorFieldPlot\\\", \\\"[\\\", \ RowBox[{RowBox[{\\\"{\\\", RowBox[{SubscriptBox[StyleBox[\\\"f\\\", \ \\\"TI\\\"], StyleBox[\\\"x\\\", \\\"TI\\\"]], \\\",\\\", \ SubscriptBox[StyleBox[\\\"f\\\", \\\"TI\\\"], StyleBox[\\\"y\\\", \ \\\"TI\\\"]]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\", \ RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dx\\\", \ \\\"TI\\\"]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\", RowBox[{StyleBox[\\\ \"y\\\", \\\"TI\\\"], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \ \\\"TI\\\"], StyleBox[\\\"min\\\", \\\"TI\\\"]], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"max\\\", \ \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dy\\\", \\\"TI\\\"]}], \\\"}\\\"}]}], \ \\\"]\\\"}]\\) uses steps \\!\\(\\*StyleBox[\\\"dx\\\", \\\"TI\\\"]\\) in \ variable \\!\\(\\*StyleBox[\\\"x\\\", \\\"TI\\\"]\\), and steps \ \\!\\(\\*StyleBox[\\\"dy\\\", \\\"TI\\\"]\\) in variable \\!\\(\\*StyleBox[\\\ \"y\\\", \\\"TI\\\"]\\).\"\>", "MSG"], " ", ButtonBox[ StyleBox["\[RightSkeleton]", "SR"], Active->True, BaseStyle->"Link", ButtonData->"paclet:VectorFieldPlots/ref/VectorFieldPlot"]}]], "Print", \ "PrintUsage", CellChangeTimes->{3.394935399530493*^9}, CellTags->"Info3394910197-3000706"] }, Open ]], Cell[TextData[{ "Click on the ", StyleBox["\[GreaterGreater]", FontColor->RGBColor[0, 0, 1]], ", then on the MORE ABOUT at the bottom of the page and discover that the \ package supplies several additional commands\[LongDash]most notably" }], "Text", CellChangeTimes->{{3.3949357488597116`*^9, 3.3949358279325037`*^9}, { 3.394935903893868*^9, 3.3949359546994333`*^9}}], Cell[CellGroupData[{ Cell[BoxData[{ RowBox[{"?", "GradientFieldPlot"}], "\[IndentingNewLine]", RowBox[{"?", "HamiltonianFieldPlot"}]}], "Input", CellChangeTimes->{{3.394935966563232*^9, 3.394935996294219*^9}}], Cell[CellGroupData[{ Cell[BoxData[ RowBox[{ StyleBox["\<\"\\!\\(\\*RowBox[{\\\"GradientFieldPlot\\\", \\\"[\\\", \ RowBox[{StyleBox[\\\"f\\\", \\\"TI\\\"], \\\",\\\", RowBox[{\\\"{\\\", \ RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\ \", RowBox[{StyleBox[\\\"y\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}]}], \\\"]\\\"}]\\) generates \ a plot of the gradient vector field of the scalar function \\!\\(\\*StyleBox[\ \\\"f\\\", \\\"TI\\\"]\\).\\n\\!\\(\\*RowBox[{\\\"GradientFieldPlot\\\", \ \\\"[\\\", RowBox[{StyleBox[\\\"f\\\", \\\"TI\\\"], \\\",\\\", \ RowBox[{\\\"{\\\", RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dx\\\", \ \\\"TI\\\"]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\", RowBox[{StyleBox[\\\ \"y\\\", \\\"TI\\\"], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \ \\\"TI\\\"], StyleBox[\\\"min\\\", \\\"TI\\\"]], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"max\\\", \ \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dy\\\", \\\"TI\\\"]}], \\\"}\\\"}]}], \ \\\"]\\\"}]\\) uses steps \\!\\(\\*StyleBox[\\\"dx\\\", \\\"TI\\\"]\\) in \ variable \\!\\(\\*StyleBox[\\\"x\\\", \\\"TI\\\"]\\), and steps \ \\!\\(\\*StyleBox[\\\"dy\\\", \\\"TI\\\"]\\) in variable \\!\\(\\*StyleBox[\\\ \"y\\\", \\\"TI\\\"]\\).\"\>", "MSG"], " ", ButtonBox[ StyleBox["\[RightSkeleton]", "SR"], Active->True, BaseStyle->"Link", ButtonData->"paclet:VectorFieldPlots/ref/GradientFieldPlot"]}]], "Print", \ "PrintUsage", CellChangeTimes->{3.394936032612749*^9}, CellTags->"Info3394910831-6827466"], Cell[BoxData[ RowBox[{ StyleBox["\<\"\\!\\(\\*RowBox[{\\\"HamiltonianFieldPlot\\\", \\\"[\\\", \ RowBox[{StyleBox[\\\"f\\\", \\\"TI\\\"], \\\",\\\", RowBox[{\\\"{\\\", \ RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\ \", RowBox[{StyleBox[\\\"y\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]]}], \\\"}\\\"}]}], \\\"]\\\"}]\\) generates \ a plot of the Hamiltonian vector field of the scalar-valued function \ \\!\\(\\*StyleBox[\\\"f\\\", \\\"TI\\\"]\\) as a function of \ \\!\\(\\*StyleBox[\\\"x\\\", \\\"TI\\\"]\\) and \\!\\(\\*StyleBox[\\\"y\\\", \ \\\"TI\\\"]\\).\\n\\!\\(\\*RowBox[{\\\"HamiltonianFieldPlot\\\", \\\"[\\\", \ RowBox[{StyleBox[\\\"f\\\", \\\"TI\\\"], \\\",\\\", RowBox[{\\\"{\\\", \ RowBox[{StyleBox[\\\"x\\\", \\\"TI\\\"], \\\",\\\", \ SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], StyleBox[\\\"min\\\", \ \\\"TI\\\"]], \\\",\\\", SubscriptBox[StyleBox[\\\"x\\\", \\\"TI\\\"], \ StyleBox[\\\"max\\\", \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dx\\\", \ \\\"TI\\\"]}], \\\"}\\\"}], \\\",\\\", RowBox[{\\\"{\\\", RowBox[{StyleBox[\\\ \"y\\\", \\\"TI\\\"], \\\",\\\", SubscriptBox[StyleBox[\\\"y\\\", \ \\\"TI\\\"], StyleBox[\\\"min\\\", \\\"TI\\\"]], \\\",\\\", \ SubscriptBox[StyleBox[\\\"y\\\", \\\"TI\\\"], StyleBox[\\\"max\\\", \ \\\"TI\\\"]], \\\",\\\", StyleBox[\\\"dy\\\", \\\"TI\\\"]}], \\\"}\\\"}]}], \ \\\"]\\\"}]\\) uses steps \\!\\(\\*StyleBox[\\\"dx\\\", \\\"TI\\\"]\\) in \ variable \\!\\(\\*StyleBox[\\\"x\\\", \\\"TI\\\"]\\), and steps \ \\!\\(\\*StyleBox[\\\"dy\\\", \\\"TI\\\"]\\) in variable \\!\\(\\*StyleBox[\\\ \"y\\\", \\\"TI\\\"]\\).\"\>", "MSG"], " ", ButtonBox[ StyleBox["\[RightSkeleton]", "SR"], Active->True, BaseStyle->"Link", ButtonData->"paclet:VectorFieldPlots/ref/HamiltonianFieldPlot"]}]], "Print",\ "PrintUsage", CellChangeTimes->{3.394936033159277*^9}, CellTags->"Info3394910832-2944645"] }, Open ]] }, Open ]], Cell["\<\ and their 3D analogs, which are of especial interest to physicists.\ \>", "Text", CellChangeTimes->{{3.3949360077483187`*^9, 3.394936025350243*^9}}], Cell["", "Text", CellChangeTimes->{{3.394935419620988*^9, 3.394935419647066*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["Example", "Subsubsection", CellChangeTimes->{{3.394934864724854*^9, 3.394934870475573*^9}}], Cell[TextData[{ "A 2-dimensional vector field is a 2-element list, of the form ", Cell[BoxData[ FormBox[ RowBox[{"{", RowBox[{ RowBox[{ SubscriptBox["V", "x"], "[", RowBox[{"x", ",", "y"}], "]"}], ",", " ", RowBox[{ SubscriptBox["V", "y"], "[", RowBox[{"x", ",", "y"}], "]"}]}], "}"}], TraditionalForm]], "Equation"], ". 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antiprism", "Tooltip"]& ]], {1767.2727272727275`, -196.8}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 2] (3^Rational[1, 2] + Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { Rational[1, 2], Rational[1, 2] (Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { 1, Rational[1, 2] (3^Rational[1, 2] + Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { Rational[3, 2], Rational[1, 2] (Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { 2, Rational[1, 2] (3^Rational[1, 2] + Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { Rational[5, 2], Rational[1, 2] (Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { 3, Rational[1, 2] (3^Rational[1, 2] + Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { Rational[7, 2], Rational[1, 2] (Cot[Rational[1, 9] Pi] + Csc[Rational[1, 9] Pi])}, { 4, Rational[1, 2] (3^Rational[1, 2] + Cot[Rational[1, 9] Pi] + 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6^Rational[1, 2]), Rational[1, 4] (8 + 7 2^Rational[1, 2] + 6^Rational[1, 2])}, { 2 + 5 2^Rational[-1, 2], 1 + 2^Rational[1, 2]}, { 2 + 5 2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 3 + 5 2^Rational[-1, 2], 1 + 2^Rational[1, 2]}, { 3 + 5 2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 3 (1 + 2^Rational[1, 2]), 1 + 3 2^Rational[-1, 2]}, { 3 (1 + 2^Rational[1, 2]), 2 + 3 2^Rational[-1, 2]}, { Rational[1, 4] (12 + 11 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (4 + 5 2^Rational[1, 2] - 6^Rational[1, 2])}, { Rational[1, 4] (12 + 11 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (8 + 7 2^Rational[1, 2] + 6^Rational[1, 2])}, { 3 + 7 2^Rational[-1, 2], 1 + 2^Rational[1, 2]}, { 3 + 7 2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 4 + 7 2^Rational[-1, 2], 1 + 2^Rational[1, 2]}, { 4 + 7 2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 4 (1 + 2^Rational[1, 2]), 1 + 3 2^Rational[-1, 2]}, { 4 (1 + 2^Rational[1, 2]), 2 + 3 2^Rational[-1, 2]}, { Rational[1, 4] (16 + 15 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (4 + 5 2^Rational[1, 2] - 6^Rational[1, 2])}, { Rational[1, 4] (16 + 15 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (8 + 7 2^Rational[1, 2] + 6^Rational[1, 2])}}, {{ 0, 3.1213203435596424`}, {0, 4.121320343559642}, { 0.7071067811865475, 2.414213562373095}, {0.7071067811865475, 4.82842712474619}, {1.7071067811865475`, 2.414213562373095}, { 1.7071067811865475`, 4.82842712474619}, {1.8892695359907652`, 5.694452528530629}, {1.8892695359907652`, 6.694452528530629}, { 2.155394517270574, 2.155394517270574}, {2.155394517270574, 5.087246169848711}, {2.2552949397752036`, 5.32842712474619}, { 2.389269535990765, 7.5604779323150675`}, {2.414213562373095, 0.7071067811865475}, {2.414213562373095, 1.7071067811865475`}, { 2.414213562373095, 3.1213203435596424`}, {2.414213562373095, 4.121320343559642}, {2.7552949397752045`, 6.194452528530629}, { 2.7552949397752045`, 7.926503336099506}, { 3.1213203435596424`, 0}, {3.1213203435596424`, 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7.501459732221806, 2.155394517270574}, {7.501459732221806, 5.087246169848711}, {7.949747468305832, 2.414213562373095}, { 7.949747468305832, 4.82842712474619}, {8.949747468305832, 2.414213562373095}, {8.949747468305832, 4.82842712474619}, { 9.65685424949238, 3.1213203435596424`}, {9.65685424949238, 4.121320343559642}, {9.915673294594901, 2.155394517270574}, { 9.915673294594901, 5.087246169848711}}], PolygonBox[{{23, 28, 22, 17}, {28, 23, 29, 35}, {28, 35, 36}, {22, 28, 30, 24}, {22, 24, 18}, {17, 22, 12, 8}, {17, 8, 7}, {23, 17, 11, 21}, {23, 21, 27}, {4, 2, 1, 3, 5, 15, 16, 6}, {21, 16, 15, 20, 26, 33, 34, 27}, {40, 34, 33, 39, 41, 43, 44, 42}, {48, 44, 43, 47, 49, 51, 52, 50}, {20, 14, 13, 19, 25, 31, 32, 26}, {50, 52, 54}, {49, 53, 51}, {42, 44, 46}, {41, 45, 43}, {27, 34, 38}, {26, 37, 33}, {10, 16, 21}, {9, 20, 15}}]]}, "\"augmented truncated cube\""], Annotation[#, "augmented truncated cube", "Tooltip"]& ]], {1374.5454545454545`, -590.4000000000001}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.00000000000006`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (-1 + 5 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 7 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { 1 + Rational[3, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), 0}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 17 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 21 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (39 + 25 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (28 - 2 5^Rational[1, 2] + 2 (75 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 25 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (47 + 5^Rational[1, 2] + (750 + 246 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (17 - 5^ Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (97 + 7 5^Rational[1, 2] + (1830 + 654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (37 - 13 5^Rational[1, 2] + (150 - 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (598 + 254 5^Rational[1, 2] + 4 (6 (745 + 331 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 15 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 7 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (48 - 3^Rational[1, 2] + 28 5^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-76679 - 603508 # - 746224 #^2 + 236816 #^3 + 415584 #^4 - 192 #^5 - 20736 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-47 + 3^Rational[1, 2] - 27 5^Rational[1, 2] + 15^Rational[1, 2])), Root[ 19441 - 368096 # - 756020 #^2 + 260336 #^3 + 461424 #^4 - 4544 #^5 - 23360 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] (((4 + 5 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 ((6 (85 + 31 5^Rational[1, 2]))^Rational[1, 2] + 4 (-48 + 3^Rational[1, 2] - 30 5^Rational[1, 2] + 15^Rational[1, 2]))), Root[-2151239 - 4950268 # - 2850964 #^2 + 472256 #^3 + 552384 #^4 - 6912 #^5 - 24576 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (37 - 13 5^Rational[1, 2] + (150 - 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-49 + 3^Rational[1, 2] - 29 5^Rational[1, 2] + 15^Rational[1, 2])), Root[-396479 - 1371736 # - 1099860 #^2 + 238336 #^3 + 358064 #^4 - 4544 #^5 - 20160 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {Root[ 152722621 + 349563384 # + 222695504 #^2 + 23475648 #^3 - 9049696 #^4 - 441984 #^5 + 184576 #^6 - 12288 #^7 + 256 #^8& , 7, 0], Root[ 10321 - 275228 # - 2178540 #^2 - 210288 #^3 + 508464 #^4 + 7168 #^5 - 24640 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] (360 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (17 - 5^ Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (97 + 7 5^Rational[1, 2] + (1830 + 654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[77, 4] + 8 5^Rational[1, 2] + Rational[1, 2] (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (24 + 14 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (47 + 5^Rational[1, 2] + (750 + 246 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 64] (392 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 135181 - 6464 # - 656796 #^2 - 221568 #^3 + 317184 #^4 + 7744 #^5 - 20224 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] (424 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (49 + 31 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 32] ((50 - 10 5^Rational[1, 2])^Rational[1, 2] + 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 4 (49 + 3^Rational[1, 2] + 29 5^Rational[1, 2] + 15^Rational[1, 2]) + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + 2 15^Rational[1, 2])), Root[-80459 - 645704 # - 1002420 #^2 - 27136 #^3 + 359024 #^4 - 14656 #^5 - 20160 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[-1186799 + 37554308 # + 117848860 #^2 + 30868848 #^3 - 6365456 #^4 - 742208 #^5 + 192960 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[ 589321 - 237292 # - 1460624 #^2 - 31376 #^3 + 350304 #^4 - 10048 #^5 - 18176 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (1 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2]) + 2 (196 + 8 3^Rational[1, 2] + 116 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^ Rational[1, 2])), Root[-40199 - 672256 # - 522876 #^2 + 380928 #^3 + 259584 #^4 - 53824 #^5 - 20224 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (27 + 17 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[3384001 + 84410704 # + 112475844 #^2 + 36113888 #^3 - 3680656 #^4 - 1456384 #^5 + 246336 #^6 - 13568 #^7 + 256 #^8& , 8, 0], Root[ 141541 - 102412 # - 403980 #^2 + 296448 #^3 + 184224 #^4 - 69568 #^5 - 21760 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[2612461 + 7491790 # + 6452642 #^2 + 1599520 #^3 - 240336 #^4 - 69480 #^5 + 13488 #^6 - 800 #^7 + 16 #^8& , 8, 0], Root[-666599 - 2359672 # - 1745640 #^2 + 762288 #^3 + 432864 #^4 - 67648 #^5 - 24640 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, {Root[ 31027861 + 163898340 # + 200320748 #^2 + 35730400 #^3 - 8861136 #^4 - 699200 #^5 + 205632 #^6 - 12800 #^7 + 256 #^8& , 8, 0], Root[ 35521 - 128192 # - 718624 #^2 - 176816 #^3 + 416784 #^4 - 9408 #^5 - 20736 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[306575401 + 458664888 # + 213372160 #^2 + 17463408 #^3 - 8219776 #^4 - 471168 #^5 + 184640 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[-106259 - 750852 # - 831924 #^2 + 87104 #^3 + 276544 #^4 - 16128 #^5 - 18176 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (29 + 17 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 17 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[302441641 + 461267724 # + 213835664 #^2 + 16996368 #^3 - 8169136 #^4 - 471744 #^5 + 184576 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[-44519 - 654852 # - 443980 #^2 + 361328 #^3 + 184944 #^4 - 53248 #^5 - 18240 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, {Rational[3, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[3, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (59 + 35 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (29 + 19 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}}, {{ 0, 5.3865332128413606`}, {0.30901699437494745`, 4.435476696546207}, {0.30901699437494745`, 6.337589729136514}, { 0.44890338239103666`, 2.688723237140821}, {1.118033988749895, 1.945578411663427}, {1.118033988749895, 3.8476914442537344`}, { 1.118033988749895, 6.9253749814289876`}, {1.4270509831248424`, 0.9945218953682734}, {1.4270509831248424`, 2.896634927958581}, { 1.618033988749895, 7.791400385213427}, {2.118033988749895, 3.8476914442537344`}, {2.118033988749895, 6.9253749814289876`}, { 2.23606797749979, 0.4067366430758002}, {2.23606797749979, 3.4844201802510537`}, {2.257920376765984, 3.692331871068813}, { 2.9270509831248424`, 4.435476696546207}, {2.9270509831248424`, 6.337589729136514}, {2.9270509831248424`, 7.51316023372146}, { 3.1315395142321365`, 6.381055108209634}, {3.23606797749979, 0.4067366430758002}, {3.23606797749979, 3.4844201802510537`}, { 3.23606797749979, 5.3865332128413606`}, {3.23606797749979, 6.562103717426307}, {3.23606797749979, 8.464216750016615}, { 4.045084971874737, 0.9945218953682734}, {4.045084971874737, 2.896634927958581}, {4.045084971874737, 5.974318465133834}, { 4.045084971874737, 9.052002002309088}, {4.354101966249685, 1.945578411663427}, {4.545084971874737, 2.030609524174142}, { 4.73606797749979, 1.945578411663427}, {4.940556508607084, 0}, { 5.045084971874737, 0.9945218953682734}, {5.045084971874737, 2.896634927958581}, {5.045084971874737, 5.974318465133834}, { 5.045084971874737, 9.052002002309088}, {5.854101966249685, 0.4067366430758002}, 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Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, {( 2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[ 3, 2]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 1}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 4 + 3^Rational[1, 2]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, {( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2], Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[-28619 + 194308 # - 303804 #^2 + 170304 #^3 - 96 #^4 - 41408 #^5 + 18944 #^6 - 3584 #^7 + 256 #^8& , 7, 0], Rational[1, 4] ( 14 + (2 (40 + 5^Rational[1, 2] - 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (7 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (7 + 3 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (11 + 3 3^Rational[1, 2])}, { Root[-43859 + 157748 # - 211540 #^2 + 115808 #^3 + 2064 #^4 - 33408 #^5 + 16320 #^6 - 3328 #^7 + 256 #^8& , 7, 0], Rational[1, 4] ( 14 + (97 + 17 5^Rational[1, 2] - (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { Root[-23399 + 89600 # - 102192 #^2 + 1040 #^3 + 79584 #^4 - 64000 #^5 + 22592 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (28 + 9 3^Rational[1, 2] - 15^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (7 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (7 + 3 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (11 + 3 3^Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (35 + 12 3^Rational[1, 2] + 5^Rational[1, 2] + (15 - 6 5^Rational[1, 2])^ Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {2 + ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[ 1, 32] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] - ( 30 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (66 + 24 3^Rational[1, 2] - 2 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[ 860161 + 1729568 # + 373640 #^2 - 584272 #^3 - 124416 #^4 + 69312 #^5 + 4800 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Root[559261 + 1519400 # + 832668 #^2 - 376960 #^3 - 207696 #^4 + 56000 #^5 + 11072 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[1101721 + 1554448 # + 177636 #^2 - 510336 #^3 - 115776 #^4 + 60352 #^5 + 7424 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[12457681 + 32379232 # + 12890616 #^2 - 3016784 #^3 - 1199616 #^4 + 217408 #^5 + 19904 #^6 - 5376 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (97 + 17 5^Rational[1, 2] - (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] ( 7 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[-213599 + 17889440 # + 15366908 #^2 - 136000 #^3 - 1643856 #^4 + 127680 #^5 + 40512 #^6 - 6400 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (43 + 11 5^Rational[1, 2] - (6 (85 + 31 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { Root[22048321 + 32720432 # + 10926600 #^2 - 2745248 #^3 - 1145296 #^4 + 185728 #^5 + 24960 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 12 + (30 (3 + 5^Rational[1, 2]))^Rational[1, 2])}, { Root[42522481 + 48286612 # + 11008748 #^2 - 3872096 #^3 - 1110240 #^4 + 189504 #^5 + 27648 #^6 - 5888 #^7 + 256 #^8& , 7, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]) + 2 (25 + 9 3^Rational[1, 2] - 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Root[35973421 + 42110464 # + 10272132 #^2 - 3547328 #^3 - 1161840 #^4 + 173248 #^5 + 32192 #^6 - 6144 #^7 + 256 #^8& , 7, 0], Rational[1, 16] (50 + 16 3^Rational[1, 2] - 2 5^Rational[1, 2] + 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[22304101 + 31759888 # + 10212060 #^2 - 2571712 #^3 - 1096336 #^4 + 156992 #^5 + 29760 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 9 3^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[19745461 + 27997328 # + 9030516 #^2 - 2378176 #^3 - 1089216 #^4 + 135872 #^5 + 34304 #^6 - 6144 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (68 + 26 5^Rational[1, 2] + 2 (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[2812801 + 13871728 # + 12359336 #^2 + 1215664 #^3 - 1331136 #^4 - 53568 #^5 + 64704 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 3 3^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[-11225399 + 14461784 # + 18361732 #^2 + 950992 #^3 - 1790400 #^4 + 23168 #^5 + 61312 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]) - 2 (-25 - 3 3^Rational[1, 2] + 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Root[7049025 + 18289800 # + 14134500 #^2 + 1393200 #^3 - 1620720 #^4 - 37440 #^5 + 68160 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (46 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[20671081 + 26930368 # + 6702360 #^2 - 3041872 #^3 - 946816 #^4 + 168512 #^5 + 27840 #^6 - 5888 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (77 + 19 5^Rational[1, 2] + (6 (785 + 349 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (42 + 8 3^Rational[1, 2] - 10 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[8283901 + 18383888 # + 11436020 #^2 + 220448 #^3 - 1262976 #^4 - 5568 #^5 + 57600 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Root[3510121 + 21639892 # + 15704368 #^2 - 362656 #^3 - 1624800 #^4 + 66304 #^5 + 54208 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[885481 + 1400208 # + 443696 #^2 - 161376 #^3 - 63256 #^4 + 9792 #^5 + 1984 #^6 - 384 #^7 + 16 #^8& , 8, 0], Rational[1, 2] ( 6 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[5175661 + 13965808 # + 10269116 #^2 + 596704 #^3 - 1240656 #^4 - 36288 #^5 + 62784 #^6 - 7424 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (23 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[4995961 + 13916048 # + 9292080 #^2 - 259392 #^3 - 1256736 #^4 + 27392 #^5 + 55040 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (38 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[75148861 + 91060364 # + 26236484 #^2 - 4634752 #^3 - 2056416 #^4 + 200256 #^5 + 47616 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 14 + (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-19124879 + 13205792 # + 16905908 #^2 - 541216 #^3 - 1763760 #^4 + 106944 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[16289701 + 38249788 # + 17808320 #^2 - 1779152 #^3 - 1689776 #^4 + 112832 #^5 + 51200 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 760321 - 2770508 # + 4124016 #^2 - 3282384 #^3 + 1534224 #^4 - 433472 #^5 + 72704 #^6 - 6656 #^7 + 256 #^8& , 4, 0]}, { Root[46339801 + 62400964 # + 20757544 #^2 - 3104992 #^3 - 1805376 #^4 + 150976 #^5 + 49216 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1321321 - 4395268 # + 5964180 #^2 - 4353088 #^3 + 1883664 #^4 - 498112 #^5 + 79040 #^6 - 6912 #^7 + 256 #^8& , 4, 0]}, { Root[7761301 + 21299724 # + 13454592 #^2 - 96688 #^3 - 1470560 #^4 + 22848 #^5 + 59392 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 6 3^Rational[1, 2] + 2 5^Rational[1, 2] - 2 15^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2] - 15^Rational[1, 2]))}, { Root[12106981 + 22506792 # + 11064908 #^2 - 1088416 #^3 - 1389360 #^4 + 80384 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (2 + 3^Rational[1, 2] + 2 5^Rational[1, 2] - 15^Rational[1, 2]))}}, {{0, 5.232050807568877}, { 0.17281636480318796`, 2.3660254037844384`}, { 0.17281636480318796`, 3.3660254037844384`}, {0.5877852522924731, 4.42303381319393}, {0.5877852522924731, 6.041067801943825}, { 0.672816364803188, 1.5}, {0.672816364803188, 4.232050807568877}, {1.172816364803188, 2.3660254037844384`}, { 1.172816364803188, 3.3660254037844384`}, { 1.5388417685876268`, 1}, {1.5388417685876268`, 4.732050807568877}, {1.5388417685876268`, 5.732050807568877}, { 2.038841768587627, 1.8660254037844386`}, {2.038841768587627, 3.8660254037844384`}, {2.123872881098342, 2.057008409409491}, { 2.123872881098342, 3.675042398159386}, {2.4048671723720654`, 5.232050807568877}, {2.7116581333908147`, 2.8660254037844384`}, { 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3084288 #^6 - 851968 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2], 0}, { Root[3481 - 91504 # + 862432 #^2 - 3587072 #^3 + 6685440 #^4 - 6258688 #^5 + 3039232 #^6 - 720896 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2], Rational[ 1, 2] (2 + Rational[-1, 2] (7 - 5^ Rational[1, 2] + (6 (5 - 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Root[1 - 52 # + 900 #^2 - 6592 #^3 + 21024 #^4 - 31168 #^5 + 20480 #^6 - 4608 #^7 + 256 #^8& , 8, 0]^ Rational[1, 2], (Rational[1, 2] + Rational[ 1, 8] (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 2] (2 + (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[3481 - 124768 # + 1095360 #^2 - 4023808 #^3 + 7386624 #^4 - 7094272 #^5 + 3461120 #^6 - 786432 #^7 + 65536 #^8& , 6, 0]^ Rational[1, 2]}, { Root[1 - 128 # + 3760 #^2 - 45568 #^3 + 263424 #^4 - 745472 #^5 + 962560 #^6 - 458752 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 176 # + 5520 #^2 - 61184 #^3 + 305664 #^4 - 733184 #^5 + 819200 #^6 - 393216 #^7 + 65536 #^8& , 7, 0]^ Rational[1, 2]}, { Rational[1, 4] (2^Rational[1, 2] + 6^Rational[1, 2] + Root[65536 - 393216 # + 819200 #^2 - 733184 #^3 + 305664 #^4 - 61184 #^5 + 5520 #^6 - 176 #^7 + #^8& , 8, 0]^ Rational[1, 2]), Root[1 - 176 # + 5520 #^2 - 61184 #^3 + 305664 #^4 - 733184 #^5 + 819200 #^6 - 393216 #^7 + 65536 #^8& , 7, 0]^ Rational[1, 2]}, { Root[625 - 40000 # + 776000 #^2 - 5728000 #^3 + 16883200 #^4 - 21094400 #^5 + 11325440 #^6 - 2293760 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 304 # + 25440 #^2 - 549376 #^3 + 2022144 #^4 - 2891776 #^5 + 1925120 #^6 - 589824 #^7 + 65536 #^8& , 7, 0]^ Rational[1, 2]}, { 0, Root[1 - 688 # + 43968 #^2 - 686336 #^3 + 2854400 #^4 - 4530176 #^5 + 3084288 #^6 - 851968 #^7 + 65536 #^8& , 7, 0]^ Rational[1, 2]}, { Root[703921 - 8137696 # + 36328512 #^2 - 81590528 #^3 + 99683840 #^4 - 66363392 #^5 + 22597632 #^6 - 3211264 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 68 # + 1380 #^2 - 9728 #^3 + 22944 #^4 - 24512 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 7, 0]^Rational[1, 2]}, { Root[1 - 96 # + 3200 #^2 - 45824 #^3 + 305664 #^4 - 978944 #^5 + 1413120 #^6 - 720896 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 176 # + 5520 #^2 - 61184 #^3 + 305664 #^4 - 733184 #^5 + 819200 #^6 - 393216 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2]}, { Root[1 - 16304 # + 94080 #^2 - 216496 #^3 + 254624 #^4 - 161536 #^5 + 52800 #^6 - 7424 #^7 + 256 #^8& , 8, 0]^ Rational[1, 2], Root[3481 - 107216 # + 824640 #^2 - 2884864 #^3 + 5348864 #^4 - 5423104 #^5 + 2887680 #^6 - 720896 #^7 + 65536 #^8& , 7, 0]^ Rational[1, 2]}, { Rational[ 1, 2] (2 + Rational[-1, 2] (7 - 5^ Rational[1, 2] - (6 (5 - 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[ 1, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[1 - 272 # + 7680 #^2 - 82432 #^3 + 418304 #^4 - 1036288 #^5 + 1167360 #^6 - 524288 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 112 # + 3920 #^2 - 51712 #^3 + 300544 #^4 - 831488 #^5 + 1064960 #^6 - 524288 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2]}, { 2^Rational[-1, 2] + Root[1 - 96 # + 3200 #^2 - 45824 #^3 + 305664 #^4 - 978944 #^5 + 1413120 #^6 - 720896 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[ 1 - 112 # + 3920 #^2 - 51712 #^3 + 300544 #^4 - 831488 #^5 + 1064960 #^6 - 524288 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2]}, { Root[1 - 9856 # + 379392 #^2 - 4003328 #^3 + 15587840 #^4 - 22065152 #^5 + 12029952 #^6 - 2228224 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 68 # + 1380 #^2 - 9728 #^3 + 22944 #^4 - 24512 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 8, 0]^Rational[1, 2]}, { Root[625 - 820000 # + 22304000 #^2 - 97216000 #^3 + 152435200 #^4 - 103731200 #^5 + 30248960 #^6 - 3276800 #^7 + 65536 #^8& , 8, 0]^Rational[1, 2], Root[1 - 30768 # + 588128 #^2 - 3237376 #^3 + 7330560 #^4 - 7561216 #^5 + 3760128 #^6 - 851968 #^7 + 65536 #^8& , 8, 0]^ Rational[1, 2]}, { Rational[ 1, 2] (Rational[1, 2] (7 + 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{7.751436690336248, 3.9811458133203086`}, {7.865022551804868, 4.9746739971688}, { 8.105442798821276, 4.916388923521373}, {8.292864648466079, 1.579580503339465}, {8.446148822283561, 3.261857933717552}, { 8.883084006373519, 0.4292701170414589}, {8.902659344054657, 2.372139920210654}, {9.234548249063705, 4.2865526292881855`}, { 9.421970098708508, 0.9497442091140351}, {9.670492848054227, 3.6772548304764032`}, {9.879662195786226, 2.1589136842349195`}, { 9.902110143326768, 2.4052775099963575`}}, PolygonBox[{{6, 9, 14, 11}, {16, 18, 14, 9}, {20, 15, 14, 18}, {3, 8, 7, 1}, {16, 9, 7, 8}, {4, 2, 7, 9}, {19, 17, 13, 12}, {16, 8, 13, 17}, {5, 10, 13, 8}, {27, 21, 22, 25}, {16, 17, 22, 21}, {23, 24, 22, 17}, {28, 33, 29, 26}, {35, 31, 29, 33}, {27, 25, 29, 31}, {44, 42, 37, 38}, {35, 33, 37, 42}, {30, 36, 37, 33}, {48, 43, 45, 50}, {35, 42, 45, 43}, {47, 49, 45, 42}, {32, 34, 39, 40}, {35, 43, 39, 34}, {46, 41, 39, 43}}]]}, "\"deltoidal icositetrahedron\""], Annotation[#, "deltoidal icositetrahedron", "Tooltip"]& ]], {1767.2727272727275`, -984.0000000000001}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.0000000000002}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 2] Root[121 + 616 # + 525 #^2 - 826 #^3 - 361 #^4 + 284 #^5 + 15 #^6 - 14 #^7 + #^8& , 8, 0]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[-59 + 460 # + 228 #^2 - 4560 #^3 + 144 #^4 + 5440 #^5 - 448 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Root[-2399 + 4588 # + 16356 #^2 - 22256 #^3 - 20976 #^4 + 16192 #^5 + 2624 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[601 + 1696 # + 1209 #^2 - 458 #^3 - 741 #^4 - 116 #^5 + 71 #^6 + 18 #^7 + #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[-419 + 1604 # + 5609 #^2 + 3998 #^3 + 579 #^4 - 264 #^5 - 69 #^6 + 2 #^7 + #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[-4259 + 12700 # - 11103 #^2 + 1390 #^3 + 2739 #^4 - 1520 #^5 + 323 #^6 - 30 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 1 + 80 # + 1992 #^2 + 15200 #^3 - 96 #^4 - 28480 #^5 + 18368 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Root[ 2281 - 488 # - 17200 #^2 - 19808 #^3 + 7104 #^4 + 23808 #^5 + 14400 #^6 + 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), -1 + Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[-59 + 452 # + 468 #^2 - 6256 #^3 - 1200 #^4 + 8384 #^5 - 2752 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[1801 + 7564 # + 3860 #^2 - 18224 #^3 - 18096 #^4 + 8256 #^5 + 6720 #^6 - 2816 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-59 - 1208 # - 6492 #^2 - 14256 #^3 - 13200 #^4 - 2816 #^5 + 3008 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-839 - 29672 # - 13932 #^2 + 35056 #^3 + 15600 #^4 - 11264 #^5 - 4672 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2], Rational[1, 2] Root[121 + 616 # + 525 #^2 - 826 #^3 - 361 #^4 + 284 #^5 + 15 #^6 - 14 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-59 + 460 # + 228 #^2 - 4560 #^3 + 144 #^4 + 5440 #^5 - 448 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-2399 + 4588 # + 16356 #^2 - 22256 #^3 - 20976 #^4 + 16192 #^5 + 2624 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[601 + 1696 # + 1209 #^2 - 458 #^3 - 741 #^4 - 116 #^5 + 71 #^6 + 18 #^7 + #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[-419 + 1604 # + 5609 #^2 + 3998 #^3 + 579 #^4 - 264 #^5 - 69 #^6 + 2 #^7 + #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[-4259 + 12700 # - 11103 #^2 + 1390 #^3 + 2739 #^4 - 1520 #^5 + 323 #^6 - 30 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 1 + 80 # + 1992 #^2 + 15200 #^3 - 96 #^4 - 28480 #^5 + 18368 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[ 14701 + 66676 # + 80580 #^2 - 12096 #^3 - 54336 #^4 + 2944 #^5 + 12800 #^6 - 3584 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[2281 - 488 # - 17200 #^2 - 19808 #^3 + 7104 #^4 + 23808 #^5 + 14400 #^6 + 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), -1 + Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-59 + 452 # + 468 #^2 - 6256 #^3 - 1200 #^4 + 8384 #^5 - 2752 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[1801 + 7564 # + 3860 #^2 - 18224 #^3 - 18096 #^4 + 8256 #^5 + 6720 #^6 - 2816 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-59 - 1208 # - 6492 #^2 - 14256 #^3 - 13200 #^4 - 2816 #^5 + 3008 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-839 - 29672 # - 13932 #^2 + 35056 #^3 + 15600 #^4 - 11264 #^5 - 4672 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[ 61 - 3796 # + 57024 #^2 + 11248 #^3 - 49696 #^4 + 6016 #^5 + 10176 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { 2 (1 + 3^Rational[1, 2]), Rational[1, 2] Root[121 + 616 # + 525 #^2 - 826 #^3 - 361 #^4 + 284 #^5 + 15 #^6 - 14 #^7 + #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[ 2161 + 21196 # + 36444 #^2 - 11888 #^3 - 38976 #^4 + 7744 #^5 + 8576 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-59 + 460 # + 228 #^2 - 4560 #^3 + 144 #^4 + 5440 #^5 - 448 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-2399 + 4588 # + 16356 #^2 - 22256 #^3 - 20976 #^4 + 16192 #^5 + 2624 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[601 + 1696 # + 1209 #^2 - 458 #^3 - 741 #^4 - 116 #^5 + 71 #^6 + 18 #^7 + #^8& , 8, 0]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[-419 + 1604 # + 5609 #^2 + 3998 #^3 + 579 #^4 - 264 #^5 - 69 #^6 + 2 #^7 + #^8& , 8, 0]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[-4259 + 12700 # - 11103 #^2 + 1390 #^3 + 2739 #^4 - 1520 #^5 + 323 #^6 - 30 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[ 1 + 80 # + 1992 #^2 + 15200 #^3 - 96 #^4 - 28480 #^5 + 18368 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[2281 - 488 # - 17200 #^2 - 19808 #^3 + 7104 #^4 + 23808 #^5 + 14400 #^6 + 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), -1 + Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-59 + 452 # + 468 #^2 - 6256 #^3 - 1200 #^4 + 8384 #^5 - 2752 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[1801 + 7564 # + 3860 #^2 - 18224 #^3 - 18096 #^4 + 8256 #^5 + 6720 #^6 - 2816 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-59 - 1208 # - 6492 #^2 - 14256 #^3 - 13200 #^4 - 2816 #^5 + 3008 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-839 - 29672 # - 13932 #^2 + 35056 #^3 + 15600 #^4 - 11264 #^5 - 4672 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[241 - 244 # - 1456 #^2 + 2612 #^3 - 996 #^4 - 156 #^5 + 141 #^6 - 22 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Root[12457681 + 32379232 # + 12890616 #^2 - 3016784 #^3 - 1199616 #^4 + 217408 #^5 + 19904 #^6 - 5376 #^7 + 256 #^8& , 7, 0], Root[-59 + 1444 # + 33724 #^2 + 73728 #^3 + 50464 #^4 + 3776 #^5 - 6144 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-213599 + 17889440 # + 15366908 #^2 - 136000 #^3 - 1643856 #^4 + 127680 #^5 + 40512 #^6 - 6400 #^7 + 256 #^8& , 7, 0], Root[-479 - 4676 # - 11276 #^2 + 3888 #^3 + 21664 #^4 + 6656 #^5 - 4224 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[601 + 1696 # + 1209 #^2 - 458 #^3 - 741 #^4 - 116 #^5 + 71 #^6 + 18 #^7 + #^8& , 8, 0]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[-419 + 1604 # + 5609 #^2 + 3998 #^3 + 579 #^4 - 264 #^5 - 69 #^6 + 2 #^7 + #^8& , 8, 0]}, { Root[22048321 + 32720432 # + 10926600 #^2 - 2745248 #^3 - 1145296 #^4 + 185728 #^5 + 24960 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Root[ 961 + 13268 # + 55320 #^2 + 93488 #^3 + 60864 #^4 + 3392 #^5 - 7360 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[42522481 + 48286612 # + 11008748 #^2 - 3872096 #^3 - 1110240 #^4 + 189504 #^5 + 27648 #^6 - 5888 #^7 + 256 #^8& , 7, 0], Root[-599 + 4684 # - 9008 #^2 - 5488 #^3 + 18240 #^4 + 5248 #^5 - 4928 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[ 241 + 4016 # - 10728 #^2 - 37792 #^3 - 31200 #^4 - 4288 #^5 + 5312 #^6 + 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-359 - 2336 # - 3208 #^2 + 4192 #^3 + 7200 #^4 - 2112 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[2281 - 488 # - 17200 #^2 - 19808 #^3 + 7104 #^4 + 23808 #^5 + 14400 #^6 + 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[ 361 - 836 # - 1320 #^2 + 436 #^3 + 864 #^4 + 136 #^5 - 55 #^6 - 6 #^7 + #^8& , 8, 0]}, { Root[35973421 + 42110464 # + 10272132 #^2 - 3547328 #^3 - 1161840 #^4 + 173248 #^5 + 32192 #^6 - 6144 #^7 + 256 #^8& , 7, 0], Root[ 1 - 32 # - 584 #^2 - 496 #^3 + 1404 #^4 + 352 #^5 - 416 #^6 - 64 #^7 + 16 #^8& , 8, 0]}, { Root[22304101 + 31759888 # + 10212060 #^2 - 2571712 #^3 - 1096336 #^4 + 156992 #^5 + 29760 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Root[ 61 + 512 # + 1648 #^2 + 2484 #^3 + 1600 #^4 + 64 #^5 - 312 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), -1 + Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-59 + 452 # + 468 #^2 - 6256 #^3 - 1200 #^4 + 8384 #^5 - 2752 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-59 - 1208 # - 6492 #^2 - 14256 #^3 - 13200 #^4 - 2816 #^5 + 3008 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[-839 - 29672 # - 13932 #^2 + 35056 #^3 + 15600 #^4 - 11264 #^5 - 4672 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[19745461 + 27997328 # + 9030516 #^2 - 2378176 #^3 - 1089216 #^4 + 135872 #^5 + 34304 #^6 - 6144 #^7 + 256 #^8& , 8, 0], Root[-59 - 1612 # + 10960 #^2 + 38688 #^3 + 33664 #^4 + 1792 #^5 - 6720 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-1475 - 100 # + 8100 #^2 + 5200 #^3 - 9520 #^4 - 9920 #^5 - 960 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Root[ 2812801 + 13871728 # + 12359336 #^2 + 1215664 #^3 - 1331136 #^4 - 53568 #^5 + 64704 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[ 181 + 1748 # - 200 #^2 - 6432 #^3 + 1264 #^4 + 5632 #^5 - 1920 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[-11225399 + 14461784 # + 18361732 #^2 + 950992 #^3 - 1790400 #^4 + 23168 #^5 + 61312 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[-179 - 152 # + 2896 #^2 - 2656 #^3 - 2976 #^4 + 3712 #^5 + 64 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[7049025 + 18289800 # + 14134500 #^2 + 1393200 #^3 - 1620720 #^4 - 37440 #^5 + 68160 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (1 + 5^Rational[1, 2])}, { Root[20671081 + 26930368 # + 6702360 #^2 - 3041872 #^3 - 946816 #^4 + 168512 #^5 + 27840 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Root[ 1 + 612 # + 6808 #^2 + 21984 #^3 + 19440 #^4 - 1536 #^5 - 6272 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], 0}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (1 + 5^Rational[1, 2])}, { Root[8283901 + 18383888 # + 11436020 #^2 + 220448 #^3 - 1262976 #^4 - 5568 #^5 + 57600 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1 + 452 # - 5792 #^2 - 6816 #^3 + 5440 #^4 + 4864 #^5 - 2112 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[3510121 + 21639892 # + 15704368 #^2 - 362656 #^3 - 1624800 #^4 + 66304 #^5 + 54208 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (2 + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[885481 + 1400208 # + 443696 #^2 - 161376 #^3 - 63256 #^4 + 9792 #^5 + 1984 #^6 - 384 #^7 + 16 #^8& , 8, 0], Root[-479 - 2972 # - 2300 #^2 + 6288 #^3 + 7504 #^4 - 2368 #^5 - 4800 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[5175661 + 13965808 # + 10269116 #^2 + 596704 #^3 - 1240656 #^4 - 36288 #^5 + 62784 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[ 1 - 12 # - 140 #^2 - 252 #^3 + 264 #^4 + 432 #^5 - 200 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Root[4995961 + 13916048 # + 9292080 #^2 - 259392 #^3 - 1256736 #^4 + 27392 #^5 + 55040 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 272 #^2 - 96 #^3 + 7360 #^4 + 3584 #^5 - 4032 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 5^Rational[1, 2])}, { Root[75148861 + 91060364 # + 26236484 #^2 - 4634752 #^3 - 2056416 #^4 + 200256 #^5 + 47616 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[-659 + 228 # + 5148 #^2 - 2384 #^3 - 10160 #^4 + 5376 #^5 + 2368 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-19124879 + 13205792 # + 16905908 #^2 - 541216 #^3 - 1763760 #^4 + 106944 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[16289701 + 38249788 # + 17808320 #^2 - 1779152 #^3 - 1689776 #^4 + 112832 #^5 + 51200 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[-1475 + 2000 # + 6700 #^2 - 9200 #^3 - 5520 #^4 + 8000 #^5 - 320 #^6 - 1280 #^7 + 256 #^8& , 7, 0]}, { Root[46339801 + 62400964 # + 20757544 #^2 - 3104992 #^3 - 1805376 #^4 + 150976 #^5 + 49216 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 3 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[7761301 + 21299724 # + 13454592 #^2 - 96688 #^3 - 1470560 #^4 + 22848 #^5 + 59392 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[-59 - 2032 # + 11056 #^2 - 12016 #^3 - 9536 #^4 + 17792 #^5 - 3776 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[12106981 + 22506792 # + 11064908 #^2 - 1088416 #^3 - 1389360 #^4 + 80384 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 61 + 354 # - 58 #^2 - 1408 #^3 + 360 #^4 + 968 #^5 - 288 #^6 - 64 #^7 + 16 #^8& , 8, 0]}}, {{0, 5.112088461821332}, { 0.17281636480318796`, 2.2460630580368948`}, { 0.17281636480318796`, 3.246063058036895}, {0.5877852522924731, 4.303071467446387}, {0.5877852522924731, 5.921105456196278}, { 0.672816364803188, 1.3800376542524564`}, {0.672816364803188, 4.112088461821334}, {0.672816364803188, 6.11208846182132}, { 1.172816364803188, 2.2460630580368948`}, {1.172816364803188, 3.246063058036895}, {1.172816364803188, 6.978113865605776}, { 1.5388417685876268`, 0.8800376542524563}, {1.5388417685876268`, 4.612088461821334}, {1.5388417685876268`, 5.612088461821328}, { 2.038841768587627, 1.7460630580368952`}, {2.038841768587627, 3.7460630580368943`}, {2.038841768587627, 6.47811386560577}, { 2.123872881098342, 1.9370460636619475`}, {2.123872881098342, 3.555080052411842}, {2.538841768587627, 4.612088461821334}, { 2.538841768587627, 5.612088461821328}, 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5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[1, 2] 3^Rational[1, 2], Rational[3, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (9 + 5^Rational[1, 2] + (130 + 58 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[9, 4] + Rational[-1, 4] 5^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ Rational[1, 2]}, { 6, (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 6, 1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (38 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[1071541 - 1101612 # - 245952 #^2 + 654656 #^3 - 219200 #^4 - 19584 #^5 + 23488 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, {5 + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (9 - 5^ Rational[1, 2] + (130 + 58 5^Rational[1, 2])^ Rational[1, 2])}, { 7, (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 7, 1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 8, (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 8, 1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 9, (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 9, 1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 10, (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 10, 1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}}, {{ 0, 3.0776835371752536`}, {0, 4.077683537175254}, { 1, 3.0776835371752536`}, {1, 4.077683537175254}, { 2, 3.0776835371752536`}, {2, 4.077683537175254}, { 2.6964611102567795`, 5.924211590202814}, {2.739926489329899, 5.719723059095459}, {2.881966011250105, 1.5388417685876268`}, { 3, 3.0776835371752536`}, {3, 4.077683537175254}, { 3.0489434837048464`, 4.768666542800306}, {3.103197753332579, 6.837757047845354}, {3.1909830056250525`, 0.5877852522924731}, { 3.1909830056250525`, 2.48989828488278}, {3.6909830056250525`, 6.028740053470407}, {3.7920883091822404`, 4.099535936441448}, { 3.9122147477075266`, 7.425542300137828}, {4, 0}, { 4, 3.0776835371752536`}, {4, 4.077683537175254}, { 4, 5.077683537175254}, {4.0932633569242, 7.530070763405448}, { 4.5, 6.61652530576288}, {5, 0}, {5, 3.0776835371752536`}, { 5, 4.077683537175254}, {5, 5.077683537175254}, { 5.087785252292473, 7.425542300137828}, {5.3090169943749475`, 6.028740053470407}, {5.8090169943749475`, 0.5877852522924731}, { 5.8090169943749475`, 2.48989828488278}, {5.866025403784438, 4.577683537175254}, {5.896802246667421, 6.837757047845354}, { 5.951056516295154, 4.768666542800306}, { 6, 3.0776835371752536`}, {6, 4.077683537175254}, { 6.052161819852342, 6.697870659829265}, {6.118033988749895, 1.5388417685876268`}, {6.260073510670101, 5.719723059095459}, { 7, 3.0776835371752536`}, {7, 4.077683537175254}, { 8, 3.0776835371752536`}, {8, 4.077683537175254}, { 9, 3.0776835371752536`}, {9, 4.077683537175254}, { 10, 3.0776835371752536`}, {10, 4.077683537175254}}], PolygonBox[{{26, 20, 15, 9, 14, 19, 25, 31, 39, 32}, {2, 1, 3, 4}, {4, 3, 5, 6}, {6, 5, 10, 11}, {11, 10, 20, 21}, {21, 20, 26, 27}, {27, 26, 36, 37}, {37, 36, 41, 42}, {42, 41, 43, 44}, {44, 43, 45, 46}, {46, 45, 47, 48}, {22, 28, 30, 24, 16}, {28, 22, 21, 27}, {28, 27, 33}, {30, 28, 35, 40}, {30, 40, 38}, {24, 30, 34, 29}, {24, 29, 23}, {16, 24, 18, 13}, {16, 13, 7}, {22, 16, 8, 12}, {22, 12, 17}}]]}, "\"elongated pentagonal cupola\""], Annotation[#, "elongated pentagonal cupola", "Tooltip"]& ]], {1374.5454545454545`, -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, (Rational[13, 10] + Rational[3, 4] 3^Rational[1, 2])^ Rational[1, 2]}, {(Rational[-1, 2] 10^Rational[-1, 2]) (-3 + 3^Rational[1, 2]), 3 (Rational[1, 5] (2 + 3^Rational[1, 2]))^Rational[1, 2]}, { 10^Rational[-1, 2], Rational[1, 10] (70 - 15 3^Rational[1, 2])^Rational[1, 2]}, { 3 10^Rational[-1, 2], (Rational[19, 10] + Rational[21, 20] 3^Rational[1, 2])^ Rational[1, 2]}, {(Rational[1, 2] 10^Rational[-1, 2]) (5 + 3^Rational[1, 2]), 0}, {(Rational[-1, 2] 10^Rational[-1, 2]) (-9 + 3^Rational[1, 2]), 10^Rational[-1, 2] (4 + 3 3^Rational[1, 2])}, { 2 Rational[2, 5]^Rational[1, 2], (Rational[7, 10] + Rational[3, 20] 3^Rational[1, 2])^Rational[1, 2]}, { 3 Rational[2, 5]^Rational[1, 2], Rational[3, 2] (Rational[3, 5] (2 + 3^Rational[1, 2]))^ Rational[1, 2]}, {(Rational[1, 2] 10^Rational[-1, 2]) (11 + 3^Rational[1, 2]), 10^ Rational[-1, 2]}, {(Rational[-1, 2] 10^Rational[-1, 2]) (-15 + 3^Rational[1, 2]), (Rational[26, 5] + 3 3^Rational[1, 2])^ Rational[1, 2]}, { 7 10^Rational[-1, 2], Rational[3, 2] (Rational[1, 5] (2 + 3^Rational[1, 2]))^ Rational[1, 2]}, { 9 10^Rational[-1, 2], (Rational[37, 10] + Rational[33, 20] 3^Rational[1, 2])^ Rational[1, 2]}, {(Rational[1, 2] 10^Rational[-1, 2]) (17 + 3^Rational[1, 2]), Rational[2, 5]^ Rational[1, 2]}, {(Rational[-1, 2] 10^Rational[-1, 2]) (-21 + 3^Rational[1, 2]), (3 10^Rational[-1, 2]) (2 + 3^Rational[1, 2])}, { 10^Rational[1, 2], (Rational[13, 10] + Rational[3, 4] 3^Rational[1, 2])^Rational[1, 2]}, { 6 Rational[2, 5]^Rational[1, 2], (Rational[49, 10] + Rational[39, 20] 3^Rational[1, 2])^ Rational[1, 2]}, {(Rational[1, 2] 10^Rational[-1, 2]) (23 + 3^Rational[1, 2]), 3 10^Rational[-1, 2]}, {(Rational[-1, 2] 10^Rational[-1, 2]) (-27 + 3^Rational[1, 2]), (Rational[1, 5] (38 + 21 3^Rational[1, 2]))^ Rational[1, 2]}, { 13 10^Rational[-1, 2], (Rational[19, 10] + Rational[21, 20] 3^Rational[1, 2])^Rational[1, 2]}, { 3 Rational[5, 2]^Rational[1, 2], Rational[3, 2] (Rational[14, 5] + 3^Rational[1, 2])^ Rational[1, 2]}, {(Rational[1, 2] 10^Rational[-1, 2]) (29 + 3^Rational[1, 2]), 2 Rational[2, 5]^Rational[1, 2]}, { 8 Rational[2, 5]^Rational[1, 2], Rational[3, 2] (Rational[3, 5] (2 + 3^Rational[1, 2]))^ Rational[1, 2]}}, {{0, 1.612153251299844}, { 0.20048037027267387`, 2.5918509705660124`}, { 0.31622776601683794`, 0.6634699532493302}, {0.9486832980505138, 1.928381017316682}, {1.064430693794678, 0}, {1.1491636683231878`, 2.90807873658285}, {1.2649110640673518`, 0.9796977192661681}, { 1.8973665961010275`, 2.2446087833335198`}, {2.0131139918451915`, 0.31622776601683794`}, {2.0978469663737016`, 3.224306502599688}, {2.2135943621178655`, 1.2959254852830062`}, { 2.8460498941515415`, 2.5608365493503578`}, {2.961797289895706, 0.6324555320336759}, {3.046530264424215, 3.5405342686165264`}, { 3.1622776601683795`, 1.612153251299844}, {3.794733192202055, 2.8770643153671958`}, {3.9104805879462194`, 0.9486832980505138}, {3.995213562474729, 3.856762034633364}, { 4.110960958218893, 1.928381017316682}, {4.743416490252569, 3.1932920813840338`}, {4.859163885996733, 1.2649110640673518`}, { 5.059644256269407, 2.2446087833335198`}}], PolygonBox[{{3, 7, 4, 1}, {7, 3, 5}, {1, 4, 2}, {7, 11, 8, 4}, {11, 7, 9}, {4, 8, 6}, {11, 15, 12, 8}, {15, 11, 13}, {8, 12, 10}, { 15, 19, 16, 12}, {19, 15, 17}, {12, 16, 14}, {19, 22, 20, 16}, { 22, 19, 21}, {16, 20, 18}}]]}, "\"elongated pentagonal dipyramid\""], Annotation[#, "elongated pentagonal dipyramid", "Tooltip"]& ]], {1767.2727272727275`, -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 0, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 1, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 1, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 2, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 2, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (34 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (13 + 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[135781 - 1734412 # + 3712188 #^2 - 3402544 #^3 + 1669200 #^4 - 473344 #^5 + 77888 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {3, Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 3, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 4 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (7 - 5^Rational[1, 2] + Root[-61184 + 48128 # + 156288 #^2 - 160064 #^3 + 59840 #^4 - 11024 #^5 + 1068 #^6 - 52 #^7 + #^8& , 8, 0])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1005181 - 3374652 # + 4749488 #^2 - 3651744 #^3 + 1673600 #^4 - 466944 #^5 + 77248 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (17 - 5^Rational[1, 2]), Root[ 276025 - 1396300 # + 2525600 #^2 - 2305600 #^3 + 1198080 #^4 - 368640 #^5 + 66240 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (21 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (32 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (35 + 2 5^Rational[1, 2] - 4 15^Rational[1, 2])^ Rational[1, 2])}, { Rational[9, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[ 361561 - 1636872 # + 2918288 #^2 - 2688144 #^3 + 1407200 #^4 - 430464 #^5 + 75328 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (42 + 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[ 25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0]}, { 4, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[3, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 5 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[9, 2] + Rational[-1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[-239 + 376 # + 2442 #^2 - 5002 #^3 + 3740 #^4 - 1378 #^5 + 267 #^6 - 26 #^7 + #^8& , 8, 0]}, { Rational[1, 4] (21 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { 5 + Rational[-1, 2] 3^Rational[1, 2], Root[ 25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[9, 2], Root[-74975 - 170800 # + 1023600 #^2 - 1446800 #^3 + 949280 #^4 - 333440 #^5 + 64320 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (22 - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { 5, Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { 5, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 5, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 5, Rational[3, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (18 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[361561 - 1636872 # + 2918288 #^2 - 2688144 #^3 + 1407200 #^4 - 430464 #^5 + 75328 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (19 + 5^Rational[1, 2]), Root[ 276025 - 1396300 # + 2525600 #^2 - 2305600 #^3 + 1198080 #^4 - 368640 #^5 + 66240 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[11, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[1, 2] 3^Rational[1, 2], 1 + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1005181 - 3374652 # + 4749488 #^2 - 3651744 #^3 + 1673600 #^4 - 466944 #^5 + 77248 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] ( 22 + (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), 0}, { Rational[1, 4] (20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[1845721 - 5617232 # + 7065528 #^2 - 4852784 #^3 + 2005440 #^4 - 513344 #^5 + 79808 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {6, Root[ 241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { 6, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 6, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (38 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (65 + 28 5^Rational[1, 2] + 2 (30 (47 + 21 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (22 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (48 + 3^Rational[1, 2] - 15^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[135781 - 1734412 # + 3712188 #^2 - 3402544 #^3 + 1669200 #^4 - 473344 #^5 + 77888 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (23 + 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (24 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { 7, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 7, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (46 + 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 8, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 8, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 9, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 9, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 10, Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 10, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 3.4523872262302318`}, {0, 4.4523872262302255`}, { 1, 3.4523872262302318`}, {1, 4.4523872262302255`}, { 2, 3.4523872262302318`}, {2, 4.4523872262302255`}, { 2.6964611102567795`, 6.298915279257727}, {2.739926489329899, 6.094426748149988}, {3, 3.4523872262302318`}, { 3, 4.4523872262302255`}, {3.0489434837048464`, 5.143370231855278}, {3.103197753332579, 7.212460736900286}, { 3.6909830056250525`, 6.403443742525039}, {3.739926489329899, 1.8103477043100213`}, {3.7920883091822404`, 4.474239625496422}, { 3.9122147477075266`, 7.8002459891929385`}, {3.947838180147658, 0.8322001035762162}, {4, 3.4523872262302318`}, { 4, 4.4523872262302255`}, {4, 5.4523872262302255`}, { 4.048943483704846, 2.7614042206051748`}, {4.0932633569242, 7.904774452460451}, {4.103197753332579, 0.6923137155601267}, { 4.133974596215562, 2.9523872262302286`}, {4.5, 6.991228994817493}, {4.6909830056250525`, 1.5013307099350766`}, { 4.912214747707527, 0.10452846326765342`}, { 5, 2.4523872262302273`}, {5, 3.4523872262302318`}, { 5, 4.4523872262302255`}, {5, 5.4523872262302255`}, { 5.087785252292473, 7.8002459891929385`}, {5.3090169943749475`, 6.403443742525039}, {5.5, 0.9135454576426009}, { 5.866025403784438, 4.9523872262302255`}, {5.896802246667421, 7.212460736900286}, {5.9067366430758, 0}, {5.951056516295154, 5.143370231889423}, {6, 2.4523872262302273`}, { 6, 3.4523872262302318`}, {6, 4.4523872262302255`}, { 6.052161819852342, 7.072574348884239}, {6.087785252292473, 0.10452846326765342`}, {6.207911690817759, 3.430534826964033}, { 6.260073510670101, 6.094426748149988}, {6.3090169943749475`, 1.5013307099350766`}, {6.896802246667421, 0.6923137155601267}, { 6.951056516295154, 2.7614042206051748`}, { 7, 3.4523872262302318`}, {7, 4.4523872262302255`}, { 7.260073510670101, 1.8103477043100213`}, {7.303538889743221, 1.6058591732027274`}, {8, 3.4523872262302318`}, { 8, 4.4523872262302255`}, {9, 3.4523872262302318`}, { 9, 4.4523872262302255`}, {10, 3.4523872262302318`}, { 10, 4.4523872262302255`}}], PolygonBox[{{20, 31, 33, 25, 13}, {31, 20, 19, 30}, {31, 30, 35}, { 33, 31, 38, 45}, {33, 45, 42}, {25, 33, 36, 32}, {25, 32, 22}, { 13, 25, 16, 12}, {13, 12, 7}, {20, 13, 8, 11}, {20, 11, 15}, {39, 28, 26, 34, 46}, {28, 39, 40, 29}, {28, 29, 24}, {26, 28, 21, 14}, {26, 14, 17}, {34, 26, 23, 27}, {34, 27, 37}, {46, 34, 43, 47}, {46, 47, 52}, {39, 46, 51, 48}, {39, 48, 44}, {2, 1, 3, 4}, {4, 3, 5, 6}, {6, 5, 9, 10}, {10, 9, 18, 19}, {19, 18, 29, 30}, {30, 29, 40, 41}, {41, 40, 49, 50}, {50, 49, 53, 54}, {54, 53, 55, 56}, {56, 55, 57, 58}}]]}, "\"elongated pentagonal gyrobicupola\""], Annotation[#, "elongated pentagonal gyrobicupola", "Tooltip"]& ]], {2160., -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 0}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 0}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 1}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 1}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 2}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 2}, { Rational[1, 4] ( 4 + (2 (124 + 47 5^Rational[1, 2] + (16575 + 7386 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (31 - 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (293 + 131 5^Rational[1, 2] + (6 (20905 + 9349 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), 4 + Rational[-1, 2] (Rational[3, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] ( 4 + (2 (94 + 31 5^Rational[1, 2] + 5 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (29 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 5 + Rational[-1, 2] 5^Rational[1, 2] + Rational[-1, 4] (30 - 6 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (39 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 3}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 3}, { Rational[1, 4] ( 4 + (2 (94 + 19 5^Rational[1, 2] + 5 (195 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (154 + 55 5^Rational[1, 2] + 7 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (176 + 77 5^Rational[1, 2] + (44295 + 19806 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (37 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (31 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] (9 - 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (94 + 31 5^Rational[1, 2] + 5 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (37 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (17 - 5^Rational[1, 2])}, { 1 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (17 - 5^Rational[1, 2])}, { Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (41 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (124 + 47 5^Rational[1, 2] + (16575 + 7386 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (35 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (206 + 89 5^Rational[1, 2] + (53835 + 24054 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (35 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 4}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 4}, { Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (19 - 5^Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (45 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (39 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (193 + 79 5^Rational[1, 2] + 3 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[9, 2]}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (176 + 77 5^Rational[1, 2] + (44295 + 19806 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (37 + 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (21 - 5^Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (21 - 5^Rational[1, 2])}, { Rational[1, 2] ( 2 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (41 + 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 5}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 5}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 5}, { Rational[1, 4] ( 4 + (335 + 137 5^Rational[1, 2] + 5 (6990 + 3126 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), 5}, { 0, Rational[1, 8] (39 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { 1 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (19 + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (19 + 5^Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (202 + 82 5^Rational[1, 2] + 16 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (37 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[11, 2]}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { 1 + (Rational[19, 2] + Rational[7, 2] 5^Rational[1, 2] + (6 (25 + 11 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (35 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (395 + 157 5^Rational[1, 2] + 5 (8670 + 3846 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (21 + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (56 + 25 5^Rational[1, 2] + (4575 + 2046 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 6}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 6}, { Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 2] ( 2 + (63 + 24 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (39 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (23 + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (23 + 5^Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (335 + 137 5^Rational[1, 2] + 5 (6990 + 3126 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (11 + 5^Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { 1 + (Rational[19, 2] + Rational[7, 2] 5^Rational[1, 2] + (6 (25 + 11 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 7}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 7}, { Rational[1, 4] ( 4 + (202 + 82 5^Rational[1, 2] + 16 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (41 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (20 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 24 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (49 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 8}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 8}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 9}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 9}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 10}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 10}}, {{4.885678718695127, 0}, { 5.885678718695127, 0}, {4.885678718695127, 1}, { 5.885678718695127, 1}, {4.885678718695127, 2}, { 5.885678718695127, 2}, {8.16766531276015, 2.212835404891247}, { 9.241602407362347, 2.352721792907336}, {7.216608796464994, 2.5218523992661943`}, {1.945578411663427, 2.863892090339851}, { 2.9401003070317, 2.9684205536075043`}, {4.885678718695127, 3}, { 5.885678718695127, 3}, {6.350583392680556, 3.0218523992661943`}, {8.755450565052621, 3.0218523992661943`}, { 9.98474723283974, 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5.3090169943749475`}, {8.825779025726828, 5.3090169943749475`}, {0.7866102045505141, 5.360113611983911}, { 7.831257130358554, 5.413545457642601}, {3.3468369501075004`, 5.5}, {1.7376667208456675`, 5.669130606358858}, {6.8802006140634, 5.722562452017549}, {10.364620794314455`, 5.8090169943749475`}, {6.0935904095128866`, 5.978147600733806}, { 4.885678718695127, 6}, {5.885678718695127, 6}, { 0.19882495225804095`, 6.169130606358858}, {2.6036921246301064`, 6.169130606358858}, {8.419042382651028, 6.222562452017549}, { 3.9346222023999737`, 6.3090169943749475`}, {8.825779025726828, 6.3090169943749475`}, {3.55474864092526, 6.478147600733806}, { 9.776835542021981, 6.618033988749895}, {1.7376667208456675`, 6.669130606358858}, {6.8802006140634, 6.722562452017549}, { 0.7866102045505141, 6.978147600733806}, {2.0159068723376334`, 6.978147600733806}, {4.420774044709699, 6.978147600733806}, { 4.885678718695127, 7}, {5.885678718695127, 7}, { 7.831257130358554, 7.031579446392495}, {8.825779025726828, 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78, 77, 75, 76}}]]}, "\"elongated pentagonal gyrobirotunda\""], Annotation[#, "elongated pentagonal gyrobirotunda", "Tooltip"]& ]], {2552.727272727273, -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {359.99999999999955`, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 0, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 1, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 1, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[-1, 2] 5^Rational[1, 2] + Rational[-1, 4] (30 - 6 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (31 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 2, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 2, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (29 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 - 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (13 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (34 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[ 79861 + 509456 # - 1304416 #^2 + 1047152 #^3 - 319856 #^4 - 1856 #^5 + 22016 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 8] ((50 - 10 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 2 (9 - 5^ Rational[ 1, 2] + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]))}, { Rational[1, 8] (33 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 3, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 3, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 4 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (9 - 5^ Rational[ 1, 2] + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-144359 + 621864 # - 964676 #^2 + 657648 #^3 - 154416 #^4 - 36864 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (15 - 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (37 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (35 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), 2 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (32 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-790499 + 2333036 # - 2562476 #^2 + 1304752 #^3 - 258336 #^4 - 32896 #^5 + 25216 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, {Rational[9, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[-60779 + 419464 # - 925316 #^2 + 821808 #^3 - 280496 #^4 - 4864 #^5 + 23616 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 4, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 4, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 4, Rational[1, 4] ( 8 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[9, 2] + Rational[-1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[-76799 - 336064 # - 103376 #^2 + 538672 #^3 - 269616 #^4 + 12224 #^5 + 19456 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (31 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 8] (35 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[9, 2], Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[9, 2], Rational[1, 4] ( 8 + (193 + 79 5^Rational[1, 2] + 3 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (33 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 5, Rational[1, 4] ( 8 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (18 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-60779 + 419464 # - 925316 #^2 + 821808 #^3 - 280496 #^4 - 4864 #^5 + 23616 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (37 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (37 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 5^Rational[1, 2]), 2 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (35 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (41 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5 + Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] ( 6 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-144359 + 621864 # - 964676 #^2 + 657648 #^3 - 154416 #^4 - 36864 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-662399 + 1868404 # - 1986836 #^2 + 944208 #^3 - 125456 #^4 - 63424 #^5 + 29376 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 6, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (38 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[212341 - 190924 # - 449956 #^2 + 591392 #^3 - 203936 #^4 - 13376 #^5 + 22016 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-77939 + 1481724 # - 2476136 #^2 + 1561968 #^3 - 381216 #^4 - 16704 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 8] (43 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (20 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (41 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 7, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 7, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 8, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 8, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 9, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 9, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 10, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 10, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}}, {{0, 4.885678718695127}, { 0, 5.885678718695127}, {1, 4.885678718695127}, { 1, 5.885678718695127}, {1.863892090339851, 1.945578411663427}, { 1.9684205536075043`, 2.9401003070317}, {2, 4.885678718695127}, { 2, 5.885678718695127}, {2.277437547982452, 3.891156823326854}, { 2.381966011250105, 0.9945218953682734}, {2.6909830056250525`, 1.945578411663427}, {2.6964611102567795`, 7.732206771722625}, { 2.739926489329899, 7.527718240615333}, {2.777437547982452, 2.3523150547392273`}, {3, 4.885678718695127}, { 3, 5.885678718695127}, {3.0218523992661943`, 4.677767027877368}, {3.0489434837048464`, 6.5766617243201795`}, { 3.103197753332579, 8.645752229365225}, {3.1909830056250525`, 0.4067366430758002}, {3.277437547982452, 3.891156823326854}, { 3.5864545423573992`, 2.9401003070317}, {3.6909830056250525`, 1.945578411663427}, {3.6909830056250525`, 3.9346222023999737`}, { 3.6909830056250525`, 7.836735234990281}, {3.7920883091822404`, 5.907531117961336}, {3.9122147477075266`, 9.233537481657716}, { 4, 0.9945218953682734}, {4, 4.885678718695127}, { 4, 5.885678718695127}, {4, 6.885678718695127}, {4.0932633569242, 9.338065944925347}, {4.104528463267654, 0}, {4.360113611983911, 0.7866102045505141}, {4.5, 3.3468369501075004`}, {4.5, 8.424520487282754}, {4.669130606358858, 1.7376667208456675`}, { 5, 4.885678718695127}, {5, 5.885678718695127}, { 5, 6.885678718695127}, {5.087785252292473, 9.233537481657716}, { 5.169130606358858, 0.19882495225804095`}, {5.169130606358858, 2.6036921246301064`}, {5.3090169943749475`, 3.9346222023999737`}, {5.3090169943749475`, 7.836735234990281}, { 5.478147600733806, 3.55474864092526}, {5.669130606358858, 1.7376667208456675`}, {5.866025403784438, 6.385678718695127}, { 5.896802246667421, 8.645752229365225}, {5.951056516295154, 6.576661724320192}, {5.978147600733806, 0.7866102045505141}, { 5.978147600733806, 2.0159068723376334`}, {5.978147600733806, 4.420774044709699}, {6, 4.885678718695127}, { 6, 5.885678718695127}, {6.052161819852342, 8.505865841349129}, { 6.260073510670101, 7.527718240615323}, {6.478147600733806, 3.55474864092526}, {6.647278207092664, 1.5297550300279084`}, { 6.787164595108753, 2.6036921246301064`}, { 7, 4.885678718695127}, {7, 5.885678718695127}, { 8, 4.885678718695127}, {8, 5.885678718695127}, { 9, 4.885678718695127}, {9, 5.885678718695127}, { 10, 4.885678718695127}, {10, 5.885678718695127}}], PolygonBox[{{31, 40, 45, 36, 25}, {40, 31, 30, 39}, {40, 39, 48}, { 45, 40, 50, 57}, {45, 57, 56}, {36, 45, 49, 41}, {36, 41, 32}, { 25, 36, 27, 19}, {25, 19, 12}, {31, 25, 13, 18}, {31, 18, 26}, { 35, 22, 23, 37, 43}, {35, 44, 38, 29, 24}, {35, 24, 22}, {24, 29, 17}, {22, 21, 9, 6, 14}, {22, 14, 23}, {14, 6, 5}, {23, 11, 10, 20, 28}, {23, 28, 37}, {28, 20, 33}, {37, 34, 42, 51, 47}, {37, 47, 43}, {47, 51, 59}, {43, 52, 60, 58, 46}, {43, 46, 35}, {46, 58, 53}, {2, 1, 3, 4}, {4, 3, 7, 8}, {8, 7, 15, 16}, {16, 15, 29, 30}, {30, 29, 38, 39}, {39, 38, 54, 55}, {55, 54, 61, 62}, {62, 61, 63, 64}, {64, 63, 65, 66}, {66, 65, 67, 68}}]]}, "\"elongated pentagonal gyrocupolarotunda\""], Annotation[#, "elongated pentagonal gyrocupolarotunda", "Tooltip"]& ]], {2945.4545454545455`, -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 0, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 1, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 1, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 2, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 2, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (34 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (13 + 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[135781 - 1734412 # + 3712188 #^2 - 3402544 #^3 + 1669200 #^4 - 473344 #^5 + 77888 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 8] (34 + 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[ 25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0]}, { 3, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 3, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 4 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { 4 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (7 - 5^Rational[1, 2] + Root[-61184 + 48128 # + 156288 #^2 - 160064 #^3 + 59840 #^4 - 11024 #^5 + 1068 #^6 - 52 #^7 + #^8& , 8, 0])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1005181 - 3374652 # + 4749488 #^2 - 3651744 #^3 + 1673600 #^4 - 466944 #^5 + 77248 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {4 + Rational[-1, 2] 3^Rational[1, 2], Root[ 25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), Root[ 276025 - 1396300 # + 2525600 #^2 - 2305600 #^3 + 1198080 #^4 - 368640 #^5 + 66240 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (32 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (35 + 2 5^Rational[1, 2] - 4 15^Rational[1, 2])^ Rational[1, 2])}, { Rational[9, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[9, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[ 361561 - 1636872 # + 2918288 #^2 - 2688144 #^3 + 1407200 #^4 - 430464 #^5 + 75328 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, { 4, Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { 4, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[3, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[9, 2] + Rational[-1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[-239 + 376 # + 2442 #^2 - 5002 #^3 + 3740 #^4 - 1378 #^5 + 267 #^6 - 26 #^7 + #^8& , 8, 0]}, { Rational[9, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[9, 2], Root[-74975 - 170800 # + 1023600 #^2 - 1446800 #^3 + 949280 #^4 - 333440 #^5 + 64320 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 18 + (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), 0}, { 5, Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { 5, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 5, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 5, Rational[3, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (18 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] (18 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[361561 - 1636872 # + 2918288 #^2 - 2688144 #^3 + 1407200 #^4 - 430464 #^5 + 75328 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 8] (40 + 3^Rational[1, 2] - 15^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2]), Root[ 276025 - 1396300 # + 2525600 #^2 - 2305600 #^3 + 1198080 #^4 - 368640 #^5 + 66240 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { 5 + Rational[1, 2] 3^Rational[1, 2], 1 + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1005181 - 3374652 # + 4749488 #^2 - 3651744 #^3 + 1673600 #^4 - 466944 #^5 + 77248 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] ( 20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[1845721 - 5617232 # + 7065528 #^2 - 4852784 #^3 + 2005440 #^4 - 513344 #^5 + 79808 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {6, Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 6, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (38 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (65 + 28 5^Rational[1, 2] + 2 (30 (47 + 21 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[135781 - 1734412 # + 3712188 #^2 - 3402544 #^3 + 1669200 #^4 - 473344 #^5 + 77888 #^6 - 6912 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 8] (38 + 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 7, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 7, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 8, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 8, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 9, Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 9, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { 10, Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 10, Rational[1, 2] + Root[-239 + 752 # + 9768 #^2 - 40016 #^3 + 59840 #^4 - 44096 #^5 + 17088 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 3.4523872262302318`}, {0, 4.4523872262302255`}, { 1, 3.4523872262302318`}, {1, 4.4523872262302255`}, { 2, 3.4523872262302318`}, {2, 4.4523872262302255`}, { 2.6964611102567795`, 6.298915279257727}, {2.739926489329899, 1.8103477043100213`}, {2.739926489329899, 6.094426748149988}, { 2.947838180147658, 0.8322001035762162}, { 3, 3.4523872262302318`}, {3, 4.4523872262302255`}, { 3.0489434837048464`, 2.7614042206051748`}, {3.0489434837048464`, 5.143370231855278}, {3.103197753332579, 0.6923137155601267}, { 3.103197753332579, 7.212460736900286}, {3.1339745962155616`, 2.9523872262302286`}, {3.6909830056250525`, 1.5013307099350766`}, {3.6909830056250525`, 6.403443742525039}, { 3.7920883091822404`, 4.474239625496422}, {3.9122147477075266`, 0.10452846326765342`}, {3.9122147477075266`, 7.8002459891929385`}, {4, 2.4523872262302273`}, { 4, 3.4523872262302318`}, {4, 4.4523872262302255`}, { 4, 5.4523872262302255`}, {4.0932633569242, 7.904774452460451}, { 4.5, 0.9135454576426009}, {4.5, 6.991228994817493}, { 4.9067366430758, 0}, {5, 2.4523872262302273`}, { 5, 3.4523872262302318`}, {5, 4.4523872262302255`}, { 5, 5.4523872262302255`}, {5.087785252292473, 0.10452846326765342`}, {5.087785252292473, 7.8002459891929385`}, {5.207911690817759, 3.430534826964033}, { 5.3090169943749475`, 1.5013307099350766`}, {5.3090169943749475`, 6.403443742525039}, {5.866025403784438, 4.9523872262302255`}, { 5.896802246667421, 0.6923137155601267}, {5.896802246667421, 7.212460736900286}, {5.951056516295154, 2.7614042206051748`}, { 5.951056516295154, 5.143370231889423}, { 6, 3.4523872262302318`}, {6, 4.4523872262302255`}, { 6.052161819852342, 7.072574348884239}, {6.260073510670101, 1.8103477043100213`}, {6.260073510670101, 6.094426748149988}, { 6.303538889743221, 1.6058591732027274`}, { 7, 3.4523872262302318`}, {7, 4.4523872262302255`}, { 8, 3.4523872262302318`}, {8, 4.4523872262302255`}, { 9, 3.4523872262302318`}, {9, 4.4523872262302255`}, { 10, 3.4523872262302318`}, {10, 4.4523872262302255`}}], PolygonBox[{{26, 34, 39, 29, 19}, {34, 26, 25, 33}, {34, 33, 40}, { 39, 34, 44, 49}, {39, 49, 47}, {29, 39, 42, 36}, {29, 36, 27}, { 19, 29, 22, 16}, {19, 16, 7}, {26, 19, 9, 14}, {26, 14, 20}, {31, 23, 18, 28, 38}, {23, 31, 32, 24}, {23, 24, 17}, {18, 23, 13, 8}, {18, 8, 10}, {28, 18, 15, 21}, {28, 21, 30}, {38, 28, 35, 41}, {38, 41, 50}, {31, 38, 48, 43}, {31, 43, 37}, {2, 1, 3, 4}, {4, 3, 5, 6}, {6, 5, 11, 12}, {12, 11, 24, 25}, {25, 24, 32, 33}, {33, 32, 45, 46}, {46, 45, 51, 52}, {52, 51, 53, 54}, {54, 53, 55, 56}, {56, 55, 57, 58}}]]}, "\"elongated pentagonal orthobicupola\""], Annotation[#, "elongated pentagonal orthobicupola", "Tooltip"]& ]], {3338.1818181818185`, -1377.6000000000001`}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 0}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 0}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 1}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 1}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 4 + Rational[-1, 2] 5^Rational[1, 2] + Rational[-1, 4] (30 - 6 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (31 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 2}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 2}, { Rational[1, 4] ( 4 + (2 (124 + 47 5^Rational[1, 2] + (16575 + 7386 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (31 - 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (29 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (293 + 131 5^Rational[1, 2] + (6 (20905 + 9349 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), 4 + Rational[-1, 2] (Rational[3, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] (7 - 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (94 + 31 5^Rational[1, 2] + 5 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (29 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (13 - 5^Rational[1, 2])}, { Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (33 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 3}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 3}, { Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (94 + 19 5^Rational[1, 2] + 5 (195 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (154 + 55 5^Rational[1, 2] + 7 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (176 + 77 5^Rational[1, 2] + (44295 + 19806 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (33 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (15 - 5^Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (37 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (31 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (94 + 31 5^Rational[1, 2] + 5 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (37 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (35 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (17 - 5^Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (17 - 5^Rational[1, 2])}, { 1 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (17 - 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (124 + 47 5^Rational[1, 2] + (16575 + 7386 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (35 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (206 + 89 5^Rational[1, 2] + (53835 + 24054 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (35 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 4}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 4}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 4}, { 0, Rational[1, 8] (31 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] ( 4 + (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (39 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (35 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[9, 2]}, { Rational[1, 4] ( 4 + (193 + 79 5^Rational[1, 2] + 3 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[9, 2]}, { Rational[1, 4] ( 4 + (2 (176 + 77 5^Rational[1, 2] + (44295 + 19806 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (37 + 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (33 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 2] ( 2 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (41 + 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 5}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 5}, { Rational[1, 4] ( 4 + (335 + 137 5^Rational[1, 2] + 5 (6990 + 3126 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), 5}, { Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (37 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (37 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (19 + 5^Rational[1, 2])}, { 1 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (19 + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (19 + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (202 + 82 5^Rational[1, 2] + 16 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (37 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (35 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { 1 + (Rational[19, 2] + Rational[7, 2] 5^Rational[1, 2] + (6 (25 + 11 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (35 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (395 + 157 5^Rational[1, 2] + 5 (8670 + 3846 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (21 + 5^Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (2 (56 + 25 5^Rational[1, 2] + (4575 + 2046 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (39 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 6}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 6}, { Rational[1, 2] ( 2 + (63 + 24 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (39 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (23 + 5^Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (335 + 137 5^Rational[1, 2] + 5 (6990 + 3126 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (11 + 5^Rational[1, 2])}, { Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 20 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { 1 + (Rational[19, 2] + Rational[7, 2] 5^Rational[1, 2] + (6 (25 + 11 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (41 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 7}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 7}, { Rational[1, 4] ( 4 + (202 + 82 5^Rational[1, 2] + 16 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 8] (41 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (265 + 103 5^Rational[1, 2] + 5 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (20 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 8}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 8}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 9}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 9}, { Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 10}, { Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), 10}}, {{4.885678718695127, 0}, { 5.885678718695127, 0}, {4.885678718695127, 1}, { 5.885678718695127, 1}, {1.945578411663427, 1.863892090339851}, { 2.9401003070317, 1.9684205536075043`}, {4.885678718695127, 2}, { 5.885678718695127, 2}, {8.16766531276015, 2.212835404891247}, { 3.891156823326854, 2.277437547982452}, {9.241602407362347, 2.352721792907336}, {0.9945218953682734, 2.381966011250105}, { 7.216608796464994, 2.5218523992661943`}, {1.945578411663427, 2.6909830056250525`}, {2.3523150547392273`, 2.777437547982452}, { 4.885678718695127, 3}, {5.885678718695127, 3}, { 4.677767027877368, 3.0218523992661943`}, {6.350583392680556, 3.0218523992661943`}, {8.755450565052621, 3.0218523992661943`}, { 9.98474723283974, 3.0218523992661943`}, {0.4067366430758002, 3.1909830056250525`}, {3.891156823326854, 3.277437547982452}, { 9.033690716544587, 3.3308693936411418`}, {7.216608796464994, 3.5218523992661943`}, {2.9401003070317, 3.5864545423573992`}, { 1.945578411663427, 3.6909830056250525`}, {3.9346222023999737`, 3.6909830056250525`}, {6.836735234990281, 3.6909830056250525`}, { 8.16766531276015, 3.8308693936411418`}, {10.572532485132214`, 3.8308693936411418`}, {0.9945218953682734, 4}, { 4.885678718695127, 4}, {5.885678718695127, 4}, { 0, 4.104528463267654}, {9.033690716544587, 4.330869393641142}, { 0.7866102045505141, 4.360113611983911}, {3.3468369501075004`, 4.5}, {7.424520487282754, 4.5}, {9.98474723283974, 4.639886388016089}, {1.7376667208456675`, 4.669130606358858}, { 10.771357437390254`, 4.895471536732346}, { 4.885678718695127, 5}, {5.885678718695127, 5}, { 9.776835542021981, 5}, {0.19882495225804095`, 5.169130606358858}, {2.6036921246301064`, 5.169130606358858}, { 3.9346222023999737`, 5.3090169943749475`}, {6.836735234990281, 5.3090169943749475`}, {8.825779025726828, 5.3090169943749475`}, { 7.831257130358554, 5.413545457642601}, {3.55474864092526, 5.478147600733806}, {1.7376667208456675`, 5.669130606358858}, { 6.8802006140634, 5.722562452017549}, {10.364620794314455`, 5.8090169943749475`}, {0.7866102045505141, 5.978147600733806}, { 2.0159068723376334`, 5.978147600733806}, {4.420774044709699, 5.978147600733806}, {6.0935904095128866`, 5.978147600733806}, { 4.885678718695127, 6}, {5.885678718695127, 6}, { 8.419042382651028, 6.222562452017549}, {8.825779025726828, 6.3090169943749475`}, {3.55474864092526, 6.478147600733806}, { 9.776835542021981, 6.618033988749895}, {1.5297550300279084`, 6.647278207092664}, {6.8802006140634, 6.722562452017549}, { 2.6036921246301064`, 6.787164595108753}, { 4.885678718695127, 7}, {5.885678718695127, 7}, { 7.831257130358554, 7.031579446392495}, {8.825779025726828, 7.136107909660149}, {4.885678718695127, 8}, { 5.885678718695127, 8}, {4.885678718695127, 9}, { 5.885678718695127, 9}, {4.885678718695127, 10}, { 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{RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 0, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 1, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 1, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 2, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 2, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (34 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[ 79861 + 509456 # - 1304416 #^2 + 1047152 #^3 - 319856 #^4 - 1856 #^5 + 22016 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 8] ((50 - 10 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 2 (9 - 5^ Rational[ 1, 2] + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]))}, { 5 + Rational[-1, 2] 5^Rational[1, 2] + Rational[-1, 4] (30 - 6 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 3, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 3, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (9 - 5^ Rational[ 1, 2] + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (17 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-144359 + 621864 # - 964676 #^2 + 657648 #^3 - 154416 #^4 - 36864 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (37 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (9 - 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (17 - 5^Rational[1, 2]), 2 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (41 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (32 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-790499 + 2333036 # - 2562476 #^2 + 1304752 #^3 - 258336 #^4 - 32896 #^5 + 25216 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, {Rational[9, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[-60779 + 419464 # - 925316 #^2 + 821808 #^3 - 280496 #^4 - 4864 #^5 + 23616 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { 4, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 4, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 4, Rational[1, 4] ( 8 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (41 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[9, 2] + Rational[-1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[-76799 - 336064 # - 103376 #^2 + 538672 #^3 - 269616 #^4 + 12224 #^5 + 19456 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 - 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (45 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[9, 2], Rational[1, 4] ( 8 + (193 + 79 5^Rational[1, 2] + 3 (6 (785 + 349 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (43 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 5, Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 5, Rational[1, 4] ( 8 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (18 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-60779 + 419464 # - 925316 #^2 + 821808 #^3 - 280496 #^4 - 4864 #^5 + 23616 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (39 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 4] (19 + 5^Rational[1, 2]), 2 + Rational[ 3, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (43 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[11, 2], Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (41 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5 + Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] ( 6 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-144359 + 621864 # - 964676 #^2 + 657648 #^3 - 154416 #^4 - 36864 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (20 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-662399 + 1868404 # - 1986836 #^2 + 944208 #^3 - 125456 #^4 - 63424 #^5 + 29376 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, {6, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 6, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (38 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[212341 - 190924 # - 449956 #^2 + 591392 #^3 - 203936 #^4 - 13376 #^5 + 22016 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-77939 + 1481724 # - 2476136 #^2 + 1561968 #^3 - 381216 #^4 - 16704 #^5 + 26176 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (23 + 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (43 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 7, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 7, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (24 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 8, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 8, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 9, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 9, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { 10, Rational[ 1, 4] (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 10, Rational[1, 4] ( 4 + (103 + 41 5^Rational[1, 2] + 3 (30 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}}, {{0, 4.885678718695127}, { 0, 5.885678718695127}, {1, 4.885678718695127}, { 1, 5.885678718695127}, {2, 4.885678718695127}, { 2, 5.885678718695127}, {2.6964611102567795`, 7.732206771722625}, {2.739926489329899, 7.527718240615333}, { 2.863892090339851, 1.945578411663427}, {2.9684205536075043`, 2.9401003070317}, {3, 4.885678718695127}, { 3, 5.885678718695127}, {3.0489434837048464`, 6.5766617243201795`}, {3.103197753332579, 8.645752229365225}, { 3.277437547982452, 3.891156823326854}, {3.381966011250105, 0.9945218953682734}, {3.6909830056250525`, 1.945578411663427}, { 3.6909830056250525`, 7.836735234990281}, {3.777437547982452, 2.3523150547392273`}, {3.7920883091822404`, 5.907531117961336}, { 3.9122147477075266`, 9.233537481657716}, { 4, 4.885678718695127}, {4, 5.885678718695127}, { 4, 6.885678718695127}, {4.021852399266194, 4.677767027877368}, { 4.0932633569242, 9.338065944925347}, {4.1909830056250525`, 0.4067366430758002}, {4.277437547982451, 3.891156823326854}, { 4.5, 8.424520487282754}, {4.586454542357399, 2.9401003070317}, { 4.6909830056250525`, 1.945578411663427}, {4.6909830056250525`, 3.9346222023999737`}, {5, 0.9945218953682734}, { 5, 4.885678718695127}, {5, 5.885678718695127}, { 5, 6.885678718695127}, {5.087785252292473, 9.233537481657716}, { 5.104528463267654, 0}, {5.3090169943749475`, 7.836735234990281}, {5.360113611983911, 0.7866102045505141}, { 5.5, 3.3468369501075004`}, {5.669130606358858, 1.7376667208456675`}, {5.866025403784438, 6.385678718695127}, { 5.896802246667421, 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+ 5^Rational[1, 2]), (10 - 2 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (1 + 5^Rational[1, 2]), Root[ 5 - 5 #^2 + #^4& , 3, 0]}, { Rational[1, 2] (4 + 5^Rational[1, 2]), Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (4 + 5^Rational[1, 2]), Rational[1, 2] (25 - 10 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 5^Rational[1, 2]), (10 - 2 5^Rational[1, 2])^ Rational[1, 2]}, {Rational[1, 2] (5 + 5^Rational[1, 2]), 0}, { Rational[1, 2] (5 + 5^Rational[1, 2]), Root[ 5 - 5 #^2 + #^4& , 3, 0]}, { Rational[1, 2], Rational[1, 2] (65 - 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2], Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2], Rational[1, 2] (65 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] (25 - 10 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (3 - 5^Rational[1, 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Rational[1, 2])}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (3 + 3^Rational[1, 2] + 5^Rational[1, 2]), 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] (5 + 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (5 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (5 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 3 + 3^Rational[1, 2], Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 + 3^Rational[1, 2], Rational[1, 2] ( 5 + (6 (32 + 3 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (6 + 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (6 + 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 10 + (718 + 38 5^Rational[1, 2] + 28 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 10 + (838 + 110 5^Rational[1, 2] + 28 (750 + 330 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (11 + 2 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (11 + 2 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { 5^Rational[1, 2] + Rational[1, 2] (5 + 3^Rational[1, 2]), Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[3, 2] (1 + 3^Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (227 + 32 5^Rational[1, 2] + 56 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 2] (-1 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[3, 2] (1 + 3^Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (227 + 32 5^Rational[1, 2] + 56 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[3, 2] (3 + 3^Rational[1, 2]), Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[-1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[17, 4] + 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[17, 4] + 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[17, 4] + 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 10 + (718 + 38 5^Rational[1, 2] + 28 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[17, 4] + 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 10 + (838 + 110 5^Rational[1, 2] + 28 (750 + 330 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (8 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 6 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 + 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 5 + (6 (32 + 3 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (9 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] (11 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (11 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (11 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 3 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 2 (3 + 3^Rational[1, 2]), Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 6 + (8 + Rational[3, 2] 15^Rational[1, 2])^Rational[1, 2], ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 6 + (8 + Rational[3, 2] 15^Rational[1, 2])^Rational[1, 2], Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (23 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (23 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (23 + 6 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (23 + 6 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[11, 2] + Rational[3, 2] 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 6 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[3, 2] (1 + 3^Rational[1, 2])}, { 6 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 6 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 6 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 6 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 2] (-1 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[3, 2] (1 + 3^Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[5, 2] (3 + 3^Rational[1, 2]), Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[-1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (29 + 10 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (29 + 10 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (29 + 8 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (29 + 8 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 7 + (Rational[5, 2] (8 + 15^Rational[1, 2]))^Rational[1, 2], ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 7 + (Rational[5, 2] (8 + 15^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + (Rational[5, 2] (8 + 15^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] ( 6 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 7 + 2 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (15 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] (17 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (17 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (17 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (17 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (17 + 5 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 3 (3 + 3^Rational[1, 2]), Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 9 + (Rational[5, 2] (8 + 15^Rational[1, 2]))^Rational[1, 2], ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 9 + (Rational[5, 2] (8 + 15^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (35 + 12 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (35 + 12 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (35 + 10 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (35 + 10 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[17, 2] + Rational[5, 2] 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 2 + ( 3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 9 + 3 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[3, 2] (1 + 3^Rational[1, 2])}, { 9 + 3 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 9 + 3 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 9 + 3 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 9 + 3 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 1, 2] (-1 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[3, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[7, 2] (3 + 3^Rational[1, 2]), Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] (3 + 3^Rational[1, 2]), Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (21 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[-1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (21 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (21 + 6 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (41 + 14 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (41 + 14 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (41 + 14 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (41 + 14 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[41, 4] + 3 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[41, 4] + 3 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (20 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (20 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (20 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 6 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 10 + 3 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 0}, {Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (21 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 0}, {Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (23 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 4 (3 + 3^Rational[1, 2]), Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (24 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (24 + 7 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (47 + 16 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (47 + 16 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (47 + 14 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (47 + 14 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (47 + 14 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (47 + 14 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (23 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (23 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[23, 2] + Rational[7, 2] 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[23, 2] + Rational[7, 2] 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (24 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[3, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 2] (24 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (24 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (24 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (24 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 1, 2] (-1 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[3, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 3 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 5 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[9, 2] (3 + 3^Rational[1, 2]), Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (27 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[-1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (27 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (27 + 8 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 5, 2] + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (53 + 18 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (53 + 18 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[53, 4] + 4 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[53, 4] + 4 3^Rational[1, 2] + Rational[3, 4] 5^Rational[1, 2], Rational[1, 4] ( 6 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (26 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (26 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (26 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 6 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 13 + 4 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (27 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] (29 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (29 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), ( 2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (29 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (29 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (29 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), 1 + 2 (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (30 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), ( Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (30 + 9 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[1, 2] ( 2 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (59 + 18 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (322 + 38 5^Rational[1, 2] + 16 (6 (65 + 19 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (59 + 18 3^Rational[1, 2] + 3 5^Rational[1, 2]), Rational[1, 4] ( 4 + (2 (221 + 55 5^Rational[1, 2] + 8 (750 + 330 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (29 + 10 3^Rational[1, 2] + 5^Rational[1, 2]), Rational[ 3, 2] + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[29, 2] + Rational[9, 2] 3^Rational[1, 2] + 5^Rational[1, 2], Rational[1, 2] ( 2 + (3 (31 + 6 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 15 + 5 3^Rational[1, 2] + Rational[1, 2] 5^Rational[1, 2], Rational[1, 2] ( 3 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}}, {{0, 5.636917979940943}, { 0.30901699437494745`, 4.685861463645789}, {0.30901699437494745`, 6.587974496236096}, {0.6180339887498949, 8.041785152313008}, { 0.6180339887498949, 10.773835959881886`}, {1.118033988749895, 4.098076211353316}, {1.118033988749895, 7.17575974852857}, { 1.118033988749895, 8.907810556097447}, {1.118033988749895, 9.907810556097447}, {1.118033988749895, 11.639861363666324`}, { 2.118033988749895, 3.4437089409596924`}, {2.118033988749895, 4.098076211353316}, {2.118033988749895, 7.17575974852857}, { 2.118033988749895, 8.907810556097447}, {2.118033988749895, 9.907810556097447}, {2.118033988749895, 11.639861363666324`}, { 2.3660254037844384`, 9.080626920900635}, {2.618033988749895, 2.5776835371752536`}, {2.618033988749895, 8.041785152313008}, { 2.618033988749895, 10.773835959881886`}, {2.675042398159386, 8.12957040460548}, {2.675042398159386, 10.031683437195788`}, { 2.9270509831248424`, 4.685861463645789}, {2.9270509831248424`, 6.587974496236096}, {2.9840593925343333`, 3.9437089409596924`}, { 2.9840593925343333`, 6.67575974852857}, {2.9840593925343333`, 12.139861363666324`}, {3.23606797749979, 5.636917979940943}, { 3.4840593925343333`, 3.0776835371752536`}, {3.4840593925343333`, 4.809734344744131}, {3.4840593925343333`, 5.809734344744131}, { 3.4840593925343333`, 7.5417851523130075`}, {3.4840593925343333`, 10.619468689488262`}, {3.4840593925343333`, 11.273835959881886`}, {4.484059392534333, 3.0776835371752536`}, { 4.484059392534333, 4.809734344744131}, {4.484059392534333, 5.809734344744131}, {4.484059392534333, 7.5417851523130075`}, { 4.484059392534333, 10.619468689488262`}, {4.732050807568877, 5.636917979940943}, {4.732050807568877, 13.17870313225395}, { 4.984059392534333, 3.9437089409596924`}, {4.984059392534333, 6.67575974852857}, {5.041067801943825, 4.685861463645789}, { 5.041067801943825, 6.587974496236096}, {5.041067801943825, 12.227646615958797`}, {5.041067801943825, 14.129759648549104`}, { 5.293076386909281, 8.12957040460548}, {5.293076386909281, 10.031683437195788`}, {5.350084796318772, 8.041785152313008}, { 5.350084796318772, 10.773835959881886`}, {5.602093381284228, 9.080626920900635}, {5.850084796318772, 4.098076211353316}, { 5.850084796318772, 7.17575974852857}, {5.850084796318772, 8.907810556097447}, {5.850084796318772, 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3.2552949397752036`}, {12.15685424949238, 5.987345747344081}, { 12.65685424949238, 2.389269535990765}, {12.65685424949238, 4.121320343559642}, {12.65685424949238, 5.121320343559642}, { 12.65685424949238, 6.85337115112852}, {13.65685424949238, 2.389269535990765}, {13.65685424949238, 4.121320343559642}, { 13.65685424949238, 5.121320343559642}, {13.65685424949238, 6.85337115112852}, {14.15685424949238, 3.2552949397752036`}, { 14.15685424949238, 5.987345747344081}}], PolygonBox[{{6, 5, 9, 10}, {5, 2, 1, 4, 8, 14, 15, 9}, {4, 3, 7, 8}, {16, 12, 15, 21, 26, 22}, {15, 14, 20, 21}, {14, 11, 13, 19, 25, 20}, {31, 30, 36, 37}, {30, 21, 20, 29, 35, 44, 45, 36}, {29, 28, 34, 35}, {46, 40, 45, 51, 54, 52}, {45, 44, 50, 51}, {44, 39, 43, 49, 53, 50}, {58, 57, 61, 62}, {57, 51, 50, 56, 60, 66, 67, 61}, {56, 55, 59, 60}, {68, 64, 67, 71, 74, 72}, {67, 66, 70, 71}, {66, 63, 65, 69, 73, 70}, {78, 77, 81, 82}, {77, 71, 70, 76, 80, 86, 87, 81}, {76, 75, 79, 80}, {88, 84, 87, 91, 94, 92}, {87, 86, 90, 91}, {86, 83, 85, 89, 93, 90}, {32, 24, 23, 31, 37, 47, 48, 38}, {28, 18, 17, 27, 33, 41, 42, 34}}]]}, "\"great rhombicuboctahedron\""], Annotation[#, "great rhombicuboctahedron", "Tooltip"]& ]], {1767.2727272727275`, -2164.7999999999997`}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 359.9999999999998}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Root[80581 - 196212 # + 8956 #^2 + 162864 #^3 - 5136 #^4 - 42048 #^5 - 5696 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[ 5521 + 98120 # + 289588 #^2 + 213200 #^3 - 19616 #^4 - 49600 #^5 - 7808 #^6 + 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 2] (7 + 2 5^Rational[1, 2] - 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Root[ 34101 + 258228 # + 519696 #^2 + 296784 #^3 - 40896 #^4 - 62208 #^5 - 8256 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (1 + 2 3^Rational[1, 2] - 5^Rational[1, 2]), Root[ 1381 + 11172 # + 23856 #^2 + 14576 #^3 - 7616 #^4 - 10752 #^5 - 1856 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (7 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Root[ 61 + 11548 # + 33520 #^2 - 9392 #^3 - 55136 #^4 - 29888 #^5 - 1280 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 336 # + 984 #^2 + 2848 #^3 - 656 #^4 - 4224 #^5 - 1664 #^6 + 512 #^7 + 256 #^8& , 7, 0], Root[-21299 - 45372 # + 202096 #^2 + 211344 #^3 - 58816 #^4 - 77568 #^5 - 10816 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 552 # - 1332 #^2 + 176 #^3 + 3280 #^4 + 1536 #^5 - 1472 #^6 - 512 #^7 + 256 #^8& , 6, 0], Root[ 1 + 12 # + 40 #^2 + 12 #^3 - 136 #^4 - 192 #^5 - 40 #^6 + 48 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] 3^Rational[1, 2], Root[-239 + 1052 # + 6176 #^2 + 1616 #^3 - 15296 #^4 - 15872 #^5 - 3136 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, {( Rational[9, 8] + Rational[3, 8] 5^Rational[1, 2])^ Rational[1, 2], Root[ 28561 - 140608 # + 37856 #^2 + 193856 #^3 + 29344 #^4 - 38912 #^5 - 8896 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, { Root[-239 - 2508 # - 6032 #^2 - 2256 #^3 + 5600 #^4 + 3264 #^5 - 1792 #^6 - 768 #^7 + 256 #^8& , 6, 0], Rational[1, 8] (-3 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[61 + 312 # - 240 #^2 - 1888 #^3 + 544 #^4 + 2688 #^5 - 1280 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[-419 - 2232 # + 720 #^2 + 7168 #^3 + 2464 #^4 - 4608 #^5 - 2240 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[ 81 - 648 # + 2052 #^3 + 504 #^4 - 1152 #^5 - 360 #^6 + 48 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 4] (-1 + 15^Rational[1, 2] + (2 (4 + 15^Rational[1, 2]))^ Rational[1, 2]), Root[-20759 - 80688 # - 20544 #^2 + 133376 #^3 + 33184 #^4 - 49152 #^5 - 11456 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 2] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + Rational[1, 2] (11 + 5^Rational[1, 2]))^Rational[1, 2], Root[ 1 - 32 # - 160 #^2 + 928 #^3 + 2464 #^4 - 7168 #^5 - 3520 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 - 8 # - 44 #^2 + 336 #^3 - 476 #^4 + 128 #^5 + 144 #^6 - 96 #^7 + 16 #^8& , 7, 0], Root[-239 - 576 # + 2844 #^2 + 4768 #^3 - 4016 #^4 - 8064 #^5 - 2624 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[-479 + 2688 # - 2180 #^2 - 5712 #^3 + 3824 #^4 + 4032 #^5 - 1600 #^6 - 768 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (-1 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-59 - 304 # - 100 #^2 + 1424 #^3 + 1264 #^4 - 1856 #^5 - 1600 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-599 - 1284 # - 78 #^2 + 968 #^3 + 175 #^4 - 168 #^5 - 38 #^6 + 4 #^7 + #^8& , 8, 0]}, { Root[81 - 3888 # - 13392 #^2 - 5616 #^3 + 12240 #^4 + 5184 #^5 - 3072 #^6 - 768 #^7 + 256 #^8& , 7, 0], Rational[1, 8] (-1 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[1 + 96 # + 480 #^2 + 464 #^3 - 1136 #^4 - 2496 #^5 - 1280 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-4139 - 41232 # - 11792 #^2 + 63216 #^3 + 19040 #^4 - 21504 #^5 - 6592 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[6241 - 3792 # - 62180 #^2 - 16272 #^3 + 33584 #^4 + 7872 #^5 - 5440 #^6 - 768 #^7 + 256 #^8& , 7, 0], 0}, { Root[1 + 8 # - 64 #^2 + 44 #^3 + 184 #^4 - 128 #^5 - 136 #^6 + 16 #^7 + 16 #^8& , 8, 0], Root[ 1061461 - 472012 # - 858452 #^2 + 274176 #^3 + 195280 #^4 - 28544 #^5 - 13632 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[421 + 2688 # + 6396 #^2 + 6224 #^3 + 304 #^4 - 3648 #^5 - 1856 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1 - 18 # - 12 #^2 + 64 #^3 + 40 #^4 - 36 #^5 - 17 #^6 + 2 #^7 + #^8& , 8, 0]}, { Root[1 + 20 # - 152 #^2 - 800 #^3 - 96 #^4 + 2240 #^5 + 832 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Root[ 61 - 896 # - 1576 #^2 + 6688 #^3 + 2224 #^4 - 6784 #^5 - 2944 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[-239 - 1156 # - 8 #^2 + 5392 #^3 + 4800 #^4 - 2752 #^5 - 3008 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-1 + (235 + 100 3^Rational[1, 2] + 74 5^Rational[1, 2] + 28 15^Rational[1, 2])^Rational[1, 2])}, { Root[2341 + 5608 # - 2564 #^2 - 10096 #^3 + 1344 #^4 + 5632 #^5 - 896 #^6 - 1024 #^7 + 256 #^8& , 8, 0], Root[ 1 - 872 # - 1040 #^2 + 6368 #^3 + 4704 #^4 - 3968 #^5 - 2240 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[1201 - 2172 # - 3984 #^2 + 5744 #^3 + 5344 #^4 - 3648 #^5 - 2816 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 216061 - 1294752 # - 648752 #^2 + 457776 #^3 + 176480 #^4 - 44544 #^5 - 14272 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[61 - 768 # - 2040 #^2 + 4832 #^3 + 12784 #^4 + 2688 #^5 - 3200 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[-3599 - 9792 # - 1440 #^2 + 12448 #^3 + 5344 #^4 - 4608 #^5 - 2240 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[-2099 - 5872 # + 3788 #^2 + 25856 #^3 + 24400 #^4 + 2176 #^5 - 4672 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[ 1 - 12 # - 24 #^2 + 44 #^3 + 64 #^4 - 48 #^5 - 56 #^6 + 16 #^7 + 16 #^8& , 8, 0]}, { Root[421 + 1836 # - 12960 #^2 + 6464 #^3 + 14464 #^4 - 3456 #^5 - 4160 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + ( 5 (2 + 3^Rational[1, 2]) + (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[-239 - 528 # + 5200 #^2 + 7152 #^3 - 5296 #^4 - 9792 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[-252639 - 849852 # - 458352 #^2 + 461376 #^3 + 218880 #^4 - 54144 #^5 - 17472 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-239 - 528 # + 5200 #^2 + 7152 #^3 - 5296 #^4 - 9792 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[-67475 + 412900 # - 258800 #^2 - 593600 #^3 + 218560 #^4 + 52480 #^5 - 15680 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Root[421 + 4560 # + 15568 #^2 + 21120 #^3 + 8864 #^4 - 3840 #^5 - 3328 #^6 + 256 #^8& , 8, 0], Root[ 5581 - 15512 # - 9520 #^2 + 22528 #^3 + 11104 #^4 - 7168 #^5 - 3520 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[181 + 1796 # + 5600 #^2 + 5744 #^3 - 1376 #^4 - 5696 #^5 - 2560 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-419 - 8856 # - 16848 #^2 + 20912 #^3 + 36640 #^4 - 6912 #^5 - 6848 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-10859 - 41088 # - 21000 #^2 + 50912 #^3 + 50224 #^4 + 2688 #^5 - 7040 #^6 - 512 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[-359 - 1792 # + 656 #^2 + 10064 #^3 + 5584 #^4 - 6848 #^5 - 4096 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1061461 - 488136 # - 954288 #^2 + 152432 #^3 + 213280 #^4 - 14592 #^5 - 14528 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[81 + 3240 # + 16092 #^2 + 23760 #^3 + 8784 #^4 - 5760 #^5 - 4032 #^6 + 256 #^8& , 8, 0], Root[-1019 - 3832 # - 2824 #^2 + 2564 #^3 + 2224 #^4 - 368 #^5 - 376 #^6 + 16 #^7 + 16 #^8& , 8, 0]}, { Root[-419 - 2784 # - 180 #^2 + 10064 #^3 + 3184 #^4 - 8256 #^5 - 4160 #^6 + 256 #^7 + 256 #^8& , 8, 0], ( 5 (2 + 3^Rational[1, 2]) + (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[81 + 972 # + 2160 #^2 - 3888 #^3 - 16416 #^4 - 15552 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 161461 - 266236 # - 522688 #^2 + 153632 #^3 + 263680 #^4 - 17792 #^5 - 17728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[81 + 972 # + 2160 #^2 - 3888 #^3 - 16416 #^4 - 15552 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 136501 + 323532 # - 1099952 #^2 - 293376 #^3 + 310080 #^4 + 21504 #^5 - 18752 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[6121 + 33600 # + 69928 #^2 + 65280 #^3 + 20144 #^4 - 7680 #^5 - 5248 #^6 + 256 #^8& , 8, 0], Root[ 81 - 1620 # - 2592 #^2 + 6480 #^3 + 10944 #^4 - 3648 #^6 + 256 #^8& , 8, 0]}, { Root[6121 - 15840 # - 13088 #^2 + 26880 #^3 + 17504 #^4 - 7680 #^5 - 5632 #^6 + 256 #^8& , 8, 0], Root[ 131301 - 178200 # - 281232 #^2 + 38880 #^3 + 93024 #^4 - 9408 #^6 + 256 #^8& , 8, 0]}, { Root[61 + 4332 # + 10840 #^2 - 4128 #^3 - 28816 #^4 - 22272 #^5 - 4480 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 15121 - 168484 # - 771188 #^2 - 66832 #^3 + 286480 #^4 + 512 #^5 - 18368 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-239 - 992 # + 5660 #^2 + 6688 #^3 - 10736 #^4 - 16768 #^5 - 5440 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[-1979 - 68832 # - 52344 #^2 + 19124 #^3 + 15664 #^4 - 1008 #^5 - 1016 #^6 + 16 #^7 + 16 #^8& , 8, 0]}, { Root[14661 + 66420 # + 114912 #^2 + 88560 #^3 + 19584 #^4 - 11520 #^5 - 5952 #^6 + 256 #^8& , 8, 0], Root[ 241 - 3852 # - 51680 #^2 - 29712 #^3 + 27744 #^4 + 11712 #^5 - 5120 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[421 + 5184 # + 14424 #^2 + 6688 #^3 - 16976 #^4 - 19584 #^5 - 5504 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[-12659 - 114600 # - 140912 #^2 + 84000 #^3 + 121184 #^4 - 11968 #^6 + 256 #^8& , 8, 0]}, { Root[4525 + 30900 # + 68600 #^2 + 61200 #^3 + 12320 #^4 - 12480 #^5 - 6080 #^6 + 256 #^8& , 8, 0], Root[-839 + 10432 # - 23044 #^2 - 3584 #^3 + 19744 #^4 + 2048 #^5 - 4096 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Root[121 - 2200 # - 5208 #^2 + 9440 #^3 + 18864 #^4 - 4480 #^5 - 7552 #^6 + 256 #^8& , 8, 0], Root[-4919 + 33212 # + 50616 #^2 - 99664 #^3 - 54816 #^4 + 64448 #^5 - 8896 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[241 + 2280 # + 6088 #^2 + 5760 #^3 + 1244 #^4 - 960 #^5 - 448 #^6 + 16 #^8& , 8, 0], Root[ 9001 + 3812 # - 21220 #^2 - 8128 #^3 + 14704 #^4 + 4288 #^5 - 3520 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[-4779 - 22680 # - 23922 #^2 + 8640 #^3 + 3519 #^4 - 360 #^5 - 138 #^6 + #^8& , 8, 0], Root[ 161461 + 92372 # - 196720 #^2 - 85168 #^3 + 73024 #^4 + 18688 #^5 - 9280 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[1 + 40 # + 172 #^2 + 120 #^3 - 476 #^4 - 880 #^5 - 432 #^6 + 16 #^8& , 8, 0], Root[-239 - 12832 # - 78004 #^2 - 123136 #^3 - 5616 #^4 + 60672 #^5 - 12096 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 40 # + 172 #^2 + 120 #^3 - 476 #^4 - 880 #^5 - 432 #^6 + 16 #^8& , 8, 0], Root[-119279 + 53368 # + 225660 #^2 - 125472 #^3 - 88176 #^4 + 65152 #^5 - 5440 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[3301 - 1980 # - 9002 #^2 - 180 #^3 + 3279 #^4 - 180 #^5 - 158 #^6 + #^8& , 8, 0], 1 + Root[-4919 + 33212 # + 50616 #^2 - 99664 #^3 - 54816 #^4 + 64448 #^5 - 8896 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[3301 - 32216 # + 18944 #^2 + 78688 #^3 + 4384 #^4 - 29824 #^5 - 8704 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[ 268921 + 251892 # - 234720 #^2 - 128368 #^3 + 73024 #^4 + 16128 #^5 - 8000 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[3301 - 32216 # + 18944 #^2 + 78688 #^3 + 4384 #^4 - 29824 #^5 - 8704 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[ 21181 + 18372 # - 94800 #^2 - 38128 #^3 + 92224 #^4 + 23808 #^5 - 11840 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-239 + 4816 # + 42680 #^2 - 95936 #^3 + 30064 #^4 + 22784 #^5 - 8320 #^6 - 1024 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[33301 - 80698 # + 22403 #^2 + 28274 #^3 - 15825 #^4 + 1974 #^5 + 123 #^6 - 28 #^7 + #^8& , 8, 0]}, { Root[5281 - 32280 # - 10088 #^2 + 51360 #^3 + 17904 #^4 - 21120 #^5 - 10112 #^6 + 256 #^8& , 8, 0], Root[ 151681 + 88552 # - 287620 #^2 - 81968 #^3 + 89424 #^4 + 12288 #^5 - 8640 #^6 - 512 #^7 + 256 #^8& , 6, 0]}, { Root[5281 - 32280 # - 10088 #^2 + 51360 #^3 + 17904 #^4 - 21120 #^5 - 10112 #^6 + 256 #^8& , 8, 0], Root[ 10321 - 8 # - 109780 #^2 - 73328 #^3 + 67344 #^4 + 31488 #^5 - 12480 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[5281 - 32280 # - 10088 #^2 + 51360 #^3 + 17904 #^4 - 21120 #^5 - 10112 #^6 + 256 #^8& , 8, 0], Root[-1979 - 43120 # + 30108 #^2 + 189520 #^3 - 241456 #^4 + 81280 #^5 - 1728 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[ 14101 + 2656 # - 43240 #^2 - 12416 #^3 + 33904 #^4 + 7424 #^5 - 8320 #^6 - 1024 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[-10475 - 3950 # + 33300 #^2 - 13750 #^3 - 5020 #^4 + 2180 #^5 - 45 #^6 - 20 #^7 + #^8& , 8, 0]}, { Root[5281 + 23384 # + 9944 #^2 - 43552 #^3 - 10256 #^4 + 25216 #^5 - 2944 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 151681 + 88552 # - 287620 #^2 - 81968 #^3 + 89424 #^4 + 12288 #^5 - 8640 #^6 - 512 #^7 + 256 #^8& , 6, 0]}, { Root[5281 + 23384 # + 9944 #^2 - 43552 #^3 - 10256 #^4 + 25216 #^5 - 2944 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 10321 - 8 # - 109780 #^2 - 73328 #^3 + 67344 #^4 + 31488 #^5 - 12480 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[5281 + 23384 # + 9944 #^2 - 43552 #^3 - 10256 #^4 + 25216 #^5 - 2944 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[-1979 - 43120 # + 30108 #^2 + 189520 #^3 - 241456 #^4 + 81280 #^5 - 1728 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[430921 + 27376 # - 433760 #^2 - 43456 #^3 + 127584 #^4 + 12544 #^5 - 12800 #^6 - 1024 #^7 + 256 #^8& , 8, 0], Root[ 6301 - 29400 # - 37232 #^2 + 157920 #^3 + 197024 #^4 - 15808 #^6 + 256 #^8& , 8, 0]}, { Root[-3599 + 20624 # - 10016 #^2 - 36992 #^3 + 14304 #^4 + 18176 #^5 - 3584 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 77041 + 141880 # - 212712 #^2 - 72320 #^3 + 101184 #^4 + 1600 #^5 - 10048 #^6 + 256 #^8& , 6, 0]}, { Root[153781 - 267984 # - 276136 #^2 + 156832 #^3 + 134064 #^4 - 12416 #^5 - 15744 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-12659 - 114600 # - 140912 #^2 + 84000 #^3 + 121184 #^4 - 11968 #^6 + 256 #^8& , 8, 0]}, { Root[-1259 - 2920 # + 26752 #^2 - 3040 #^3 - 53216 #^4 + 33920 #^5 - 512 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 268921 + 251892 # - 234720 #^2 - 128368 #^3 + 73024 #^4 + 16128 #^5 - 8000 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[-1259 - 2920 # + 26752 #^2 - 3040 #^3 - 53216 #^4 + 33920 #^5 - 512 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 21181 + 18372 # - 94800 #^2 - 38128 #^3 + 92224 #^4 + 23808 #^5 - 11840 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[181 - 2888 # + 10286 #^2 - 7904 #^3 - 161 #^4 + 1208 #^5 - 106 #^6 - 16 #^7 + #^8& , 8, 0], Root[ 161461 + 92372 # - 196720 #^2 - 85168 #^3 + 73024 #^4 + 18688 #^5 - 9280 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[207661 + 57744 # - 309080 #^2 - 104544 #^3 + 109424 #^4 + 30336 #^5 - 12160 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 14701 - 28080 # - 185572 #^2 + 86880 #^3 + 162704 #^4 + 3840 #^5 - 16448 #^6 + 256 #^8& , 8, 0]}, { Root[121 + 1320 # - 808 #^2 - 16960 #^3 - 336 #^4 + 24320 #^5 - 1152 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 138001 + 213260 # - 194852 #^2 - 120480 #^3 + 92464 #^4 + 7360 #^5 - 9408 #^6 + 256 #^8& , 7, 0]}, { Root[-36539 + 9904 # + 628424 #^2 - 566912 #^3 + 16944 #^4 + 82176 #^5 - 11904 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 218521 + 42452 # - 418100 #^2 - 56528 #^3 + 216624 #^4 + 16448 #^5 - 15680 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[19801 - 39972 # + 19726 #^2 + 6324 #^3 - 7161 #^4 + 1452 #^5 + 34 #^6 - 24 #^7 + #^8& , 8, 0], Root[ 151681 + 88552 # - 287620 #^2 - 81968 #^3 + 89424 #^4 + 12288 #^5 - 8640 #^6 - 512 #^7 + 256 #^8& , 6, 0]}, { Root[120301 + 245280 # - 36328 #^2 - 220960 #^3 - 4176 #^4 + 56960 #^5 - 4992 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[-12659 - 114600 # - 140912 #^2 + 84000 #^3 + 121184 #^4 - 11968 #^6 + 256 #^8& , 8, 0]}, { Root[28561 + 70304 # - 118976 #^2 - 171392 #^3 + 83424 #^4 + 52736 #^5 - 11264 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 131301 - 178200 # - 281232 #^2 + 38880 #^3 + 93024 #^4 - 9408 #^6 + 256 #^8& , 8, 0]}, { Root[28561 + 70304 # - 118976 #^2 - 171392 #^3 + 83424 #^4 + 52736 #^5 - 11264 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 6301 - 29400 # - 37232 #^2 + 157920 #^3 + 197024 #^4 - 15808 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[ 64621 - 24928 # - 55690 #^2 + 47912 #^3 - 13001 #^4 + 688 #^5 + 230 #^6 - 32 #^7 + #^8& , 8, 0], Root[ 161461 + 92372 # - 196720 #^2 - 85168 #^3 + 73024 #^4 + 18688 #^5 - 9280 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[418981 - 1572280 # + 1942592 #^2 - 805600 #^3 - 90336 #^4 + 117120 #^5 - 10752 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 15361 + 159412 # - 426040 #^2 - 81008 #^3 + 179424 #^4 + 17088 #^5 - 16320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[50461 - 281944 # + 277280 #^2 + 86624 #^3 - 204896 #^4 + 64384 #^5 + 5120 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 268921 + 251892 # - 234720 #^2 - 128368 #^3 + 73024 #^4 + 16128 #^5 - 8000 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[-56519 - 214104 # + 638700 #^2 - 246016 #^3 - 148016 #^4 + 75264 #^5 + 3520 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-59159 - 60556 # + 67960 #^2 + 67296 #^3 - 23696 #^4 - 22784 #^5 + 1920 #^6 + 2304 #^7 + 256 #^8& , 6, 0]}, { Root[-179 - 33680 # + 193192 #^2 - 292000 #^3 + 42864 #^4 + 81280 #^5 - 10112 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[-923399 - 667128 # + 428060 #^2 + 353312 #^3 - 32496 #^4 - 49792 #^5 - 2880 #^6 + 2048 #^7 + 256 #^8& , 7, 0]}, { Root[-179 - 33680 # + 193192 #^2 - 292000 #^3 + 42864 #^4 + 81280 #^5 - 10112 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[-168899 - 552720 # - 407972 #^2 + 100320 #^3 + 119504 #^4 - 3840 #^5 - 10048 #^6 + 256 #^8& , 7, 0]}, { Root[-179 - 33680 # + 193192 #^2 - 292000 #^3 + 42864 #^4 + 81280 #^5 - 10112 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 14701 - 28080 # - 185572 #^2 + 86880 #^3 + 162704 #^4 + 3840 #^5 - 16448 #^6 + 256 #^8& , 8, 0]}, { Root[413641 - 1333712 # + 1234356 #^2 - 184576 #^3 - 238816 #^4 + 88832 #^5 + 2304 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-9719 + 1800 # + 53732 #^2 + 17680 #^3 - 45936 #^4 - 23360 #^5 + 3648 #^6 + 2560 #^7 + 256 #^8& , 6, 0]}, { Root[101461 - 440304 # + 586200 #^2 - 155296 #^3 - 185936 #^4 + 96384 #^5 + 640 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-172019 - 357864 # - 8896 #^2 + 226592 #^3 + 18144 #^4 - 40576 #^5 - 3264 #^6 + 2048 #^7 + 256 #^8& , 6, 0]}, { Root[472981 - 1020416 # + 422824 #^2 + 447648 #^3 - 407696 #^4 + 73856 #^5 + 14976 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-923399 - 667128 # + 428060 #^2 + 353312 #^3 - 32496 #^4 - 49792 #^5 - 2880 #^6 + 2048 #^7 + 256 #^8& , 7, 0]}, { Root[472981 - 1020416 # + 422824 #^2 + 447648 #^3 - 407696 #^4 + 73856 #^5 + 14976 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-168899 - 552720 # - 407972 #^2 + 100320 #^3 + 119504 #^4 - 3840 #^5 - 10048 #^6 + 256 #^8& , 7, 0]}, { Root[472981 - 1020416 # + 422824 #^2 + 447648 #^3 - 407696 #^4 + 73856 #^5 + 14976 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[ 14701 - 28080 # - 185572 #^2 + 86880 #^3 + 162704 #^4 + 3840 #^5 - 16448 #^6 + 256 #^8& , 8, 0]}, { Root[36661 - 235176 # + 426912 #^2 - 111808 #^3 - 154400 #^4 + 75648 #^5 + 832 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-14579 + 556 # + 59920 #^2 + 12944 #^3 - 46176 #^4 - 15296 #^5 + 6400 #^6 + 2816 #^7 + 256 #^8& , 6, 0]}, { Root[-2879 - 41112 # + 591816 #^2 - 441856 #^3 - 87056 #^4 + 87552 #^5 - 896 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-325019 - 200796 # + 305884 #^2 + 158208 #^3 - 85456 #^4 - 37824 #^5 + 5696 #^6 + 3072 #^7 + 256 #^8& , 6, 0]}, { Root[1405561 - 2664240 # + 1004192 #^2 + 765760 #^3 - 613536 #^4 + 90880 #^5 + 19968 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 131301 - 178200 # - 281232 #^2 + 38880 #^3 + 93024 #^4 - 9408 #^6 + 256 #^8& , 8, 0]}, { Root[1405561 - 2664240 # + 1004192 #^2 + 765760 #^3 - 613536 #^4 + 90880 #^5 + 19968 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 6301 - 29400 # - 37232 #^2 + 157920 #^3 + 197024 #^4 - 15808 #^6 + 256 #^8& , 8, 0]}, { Root[212701 - 893672 # + 1016200 #^2 - 54912 #^3 - 292496 #^4 + 69632 #^5 + 13440 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-1109399 - 6192 # + 845800 #^2 + 161568 #^3 - 157696 #^4 - 45888 #^5 + 6080 #^6 + 3072 #^7 + 256 #^8& , 7, 0]}, { Root[1741 - 43676 # + 90064 #^2 - 15432 #^3 - 26696 #^4 + 8336 #^5 + 576 #^6 - 288 #^7 + 16 #^8& , 8, 0], Root[-204899 - 368512 # + 63196 #^2 + 274704 #^3 + 22864 #^4 - 42368 #^5 - 6336 #^6 + 1536 #^7 + 256 #^8& , 7, 0]}, { Root[1741 - 43676 # + 90064 #^2 - 15432 #^3 - 26696 #^4 + 8336 #^5 + 576 #^6 - 288 #^7 + 16 #^8& , 8, 0], Root[-833999 - 1286072 # - 336980 #^2 + 288368 #^3 + 117264 #^4 - 21248 #^5 - 9920 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[417661 - 2598016 # + 2843224 #^2 - 394272 #^3 - 535376 #^4 + 163456 #^5 + 7296 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-12659 - 114600 # - 140912 #^2 + 84000 #^3 + 121184 #^4 - 11968 #^6 + 256 #^8& , 8, 0]}, { Root[5281 + 108664 # + 124584 #^2 - 215552 #^3 - 147216 #^4 + 107776 #^5 + 8576 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-527519 - 828768 # - 92344 #^2 + 305056 #^3 + 73344 #^4 - 32192 #^5 - 8256 #^6 + 1024 #^7 + 256 #^8& , 7, 0]}, { Root[1493341 - 3736080 # + 2637752 #^2 + 84160 #^3 - 665616 #^4 + 156160 #^5 + 14208 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 161461 + 92372 # - 196720 #^2 - 85168 #^3 + 73024 #^4 + 18688 #^5 - 9280 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[1414981 - 4249576 # + 4134784 #^2 - 1061472 #^3 - 464096 #^4 + 217216 #^5 + 1536 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[ 21181 + 18372 # - 94800 #^2 - 38128 #^3 + 92224 #^4 + 23808 #^5 - 11840 #^6 - 512 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 4.797774750332823}, {0.4067366430758002, 5.711320207975424}, { 0.4502020221489198, 5.915808739082718}, {0.5570084094094911, 3.008457021319953}, {0.7431448254773941, 4.128644143973965}, { 0.7592190165238674, 6.866865255377871}, {0.7649201002272505, 2.030309420586147}, {0.8660254037844386, 3.959513537615106}, { 1.4012585384440737`, 5.6067917447077695`}, {1.4340507065861086`, 1.2871645951087531`}, {1.508064925704643, 2.6994400269450054`}, { 1.6091702292618328`, 4.628644143973965}, {1.7102755328190211`, 6.557848261002924}, {1.8170819200795922`, 3.650496543240159}, { 2.008064925704643, 3.5654654307294438`}, {2.177195532063503, 1.9562952014676114`}, {2.379406139177879, 5.814703435525529}, { 2.385107222881263, 0.9781476007338057}, {2.587317829995639, 4.8365558347917235`}, {2.593018913699022, 0}, { 2.6723489425063534`, 5.365800053134493}, {2.7952295208133977`, 3.858408234057918}, {2.9862125264384534`, 3.357553739911685}, { 3.0790855855821535`, 6.279345510777095}, {3.0907409897061067`, 2.3630318445434115`}, {3.1225509646552734`, 6.483834041884388}, { 3.1553431327973054`, 2.1642068922853714`}, {3.363254823615067, 1.1860592915515646`}, {3.415493767983748, 4.696669446775635}, { 3.431567959030221, 7.434890558179542}, {3.431567959030221, 8.434890558179541}, {3.464360127172256, 3.115263408580524}, { 3.538374346290792, 4.527538840416776}, {3.5711665144328277`, 0.20791169081775937`}, {4.073607480950427, 6.174817047509441}, { 4.20750495264965, 3.7843940149393833`}, {4.281519171768187, 5.196669446775635}, {4.3826244753253745`, 7.125873563804593}, { 4.3826244753253745`, 8.74390755255449}, {4.4154166434674105`, 2.8062464142055736`}, {4.950649778127044, 4.45352462129824}, { 4.970409727617848, 7.934890558179542}, {5.051755081684233, 6.382728738327199}, {5.073530356434088, 4.284394014939383}, { 5.259666772501991, 5.404581137593394}, {5.409938538835682, 2.7017179509379226`}, {5.4808985145844655`, 6.183349395510924}, { 5.816675181911482, 3.6152634085805238`}, {5.901706294422198, 4.144507626923297}, {6.06868376687694, 5.374332401135974}, { 6.06868376687694, 6.992366389885866}, {6.153714879387654, 7.183349395510924}, {6.210723288797145, 3.1934511106281622`}, { 6.210723288797145, 5.095564143218436}, {6.653714879387653, 8.049374799295364}, {7.0197402831720925`, 2.605665858335666}, { 7.0197402831720925`, 5.68334939551092}, {7.0197402831720925`, 6.683349395510916}, {7.519740283172094, 7.549374799295357}, { 8.01974028317209, 2.605665858335666}, {8.01974028317209, 5.68334939551092}, {8.01974028317209, 6.683349395510916}, { 8.470796799467246, 6.355637653888549}, {8.607525535464564, 1.7966488639607197`}, {8.779813793842195, 5.404581137593394}, { 8.828757277547043, 3.1934511106281622`}, {8.828757277547043, 5.095564143218436}, {9.137774271921987, 4.144507626923297}, { 9.279813793842195, 6.943422906181019}, {9.416542529839516, 2.384434116253155}, {9.50104553592467, 7.164654648263495}, { 9.637774271921986, 2.605665858335666}, {9.779813793842195, 5.404581137593394}, {10.088830788217141`, 4.45352462129824}, { 10.088830788217141`, 6.355637653888549}, {10.137774271921993`, 4.144507626923297}, {10.310062530299614`, 7.752439900555968}, { 10.446791266296941`, 3.1934511106281622`}, {10.654702957114692`, 1.330583358862471}, {10.89784778259209, 2.8657393690057673`}, { 10.89784778259209, 3.8657393690057686`}, {10.89784778259209, 6.943422906181019}, {11.061439600190493`, 0.4170379012198697}, { 11.397847782592088`, 1.9997139652213265`}, {11.897847782592084`, 2.8657393690057673`}, {11.897847782592084`, 3.8657393690057686`}, {11.897847782592084`, 6.943422906181019}, { 12.055961495558769`, 0.5215663644875231}, {12.263873186376525`, 1.4997139652213287`}, {12.706864776967041`, 4.45352462129824}, { 12.706864776967041`, 6.355637653888549}, {12.763873186376529`, 2.3657393690057673`}, {12.84890429888724, 2.5567223746308203`}, { 12.84890429888724, 4.174756363380706}, {13.015881771341988`, 5.404581137593394}, {13.436689551179715`, 3.365739369005768}, { 13.657921293262188`, 4.144507626923297}, {13.966938287637133`, 5.095564143218436}}], PolygonBox[{{6, 3, 9, 13}, {13, 9, 17}, {9, 12, 19, 17}, {2, 1, 5, 12, 9}, {8, 14, 12}, {12, 14, 22, 19}, {4, 11, 14, 8}, {4, 7, 11}, {7, 10, 16, 11}, {11, 16, 25, 23, 15}, {10, 18, 16}, {16, 18, 28, 27}, {30, 26, 35, 38}, {38, 35, 43}, {35, 37, 45, 43}, { 24, 21, 29, 37, 35}, {37, 41, 45}, {45, 41, 49, 54}, {33, 36, 41, 37}, {19, 22, 33}, {22, 32, 36, 33}, {36, 40, 46, 48, 44}, {32, 40, 36}, {28, 18, 20, 34}, {55, 52, 58, 59}, {59, 58, 62}, {58, 57, 61, 62}, {51, 47, 50, 57, 58}, {68, 67, 61, 57, 54, 49, 53, 56, 60, 66}, {77, 71, 75, 82}, {82, 75, 73, 74, 81, 86, 90, 95, 91, 87}, {69, 63, 65, 73, 75}, {67, 68, 74, 73}, {68, 66, 72, 78, 76}, {66, 60, 64, 70}, {95, 90, 97, 98}, {81, 80, 85, 86}, {86, 85, 93, 96, 94}, {80, 84, 85}, {85, 84, 89, 92}, {31, 30, 38, 42, 39}, {84, 79, 83, 88, 89}}]]}, "\"gyrate bidiminished rhombicosidodecahedron\""], Annotation[#, "gyrate bidiminished rhombicosidodecahedron", "Tooltip"]& ]], {2160., -2164.7999999999997`}, ImageScaled[{0.5, 0.5}], {360., 359.9999999999998}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (-1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[1 - 32 # + 168 #^2 + 1456 #^3 - 2624 #^5 - 832 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 1 + 24 # - 680 #^2 + 2736 #^3 - 3616 #^4 + 576 #^5 + 2240 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-59 - 296 # + 92 #^2 + 1792 #^3 + 1200 #^4 - 2112 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 181 - 1368 # + 976 #^2 + 4176 #^3 - 6016 #^4 + 768 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (-1 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Root[ 1 - 6 # - 10 #^2 + 96 #^3 - 136 #^4 - 24 #^5 + 160 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (3 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-22259 + 478240 # - 1106488 #^2 + 161680 #^3 + 446464 #^4 - 262720 #^5 + 60608 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), 3 + (Rational[3, 2] (7 + 5^Rational[1, 2] + 3 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-238739 + 1171904 # - 1679896 #^2 + 703088 #^3 + 133504 #^4 - 177344 #^5 + 49856 #^6 - 5888 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (647 - 41 5^Rational[1, 2] + (30 (985 + 139 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (680 + 2 5^Rational[1, 2] + 30 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 0}, {4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (737 + 49 5^Rational[1, 2] + (38550 + 9570 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 5 + (Rational[1, 2] (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}}, {{0, 5.314726871570336}, { 0.17281636480318796`, 2.448701467785898}, {0.17281636480318796`, 3.448701467785898}, {0.5877852522924731, 4.505709877195389}, { 0.5877852522924731, 6.123743865945284}, {0.672816364803188, 1.5826760640014592`}, {0.672816364803188, 4.314726871570336}, { 0.672816364803188, 6.314726871570336}, {1.0388417685876268`, 2.948701467785898}, {1.172816364803188, 7.1807522753547754`}, { 1.5388417685876268`, 0.08267606400145922}, {1.5388417685876268`, 1.0826760640014592`}, {1.5388417685876268`, 2.0826760640014594`}, 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8, 0]}, { Rational[1, 4] (21 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-10919 + 31088 # + 43836 #^2 - 198096 #^3 + 229104 #^4 - 125248 #^5 + 35264 #^6 - 4864 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (46 + 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[ 25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0]}, { Rational[9, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (22 - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), 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#^4 - 6318 #^5 + 969 #^6 - 54 #^7 + #^8& , 8, 0])}, { Rational[1, 4] ( 22 - (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), Root[-59 - 872 # + 31648 #^3 + 32544 #^4 - 65408 #^5 + 28160 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 - 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { 6 + Rational[-1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[11, 2], Root[ 241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[11, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[11, 2], Root[ 11041 + 6472 # - 75220 #^2 + 64192 #^3 + 33264 #^4 - 61632 #^5 + 25920 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { 6, Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { 6, Root[61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 6, Rational[1, 6] (6 + 3^Rational[1, 2] + Root[-14499 - 44712 # - 8289 #^2 + 34344 #^3 + 6399 #^4 - 6318 #^5 + 969 #^6 - 54 #^7 + #^8& , 8, 0])}, { Rational[1, 4] (22 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-1559 + 3608 # + 19836 #^2 - 91296 #^3 + 142704 #^4 - 102208 #^5 + 33344 #^6 - 4864 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 + 5^Rational[1, 2]), Root[ 661 + 7552 # - 33300 #^2 - 37648 #^3 + 112304 #^4 - 83392 #^5 + 27840 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { 6 + Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 0}, { Rational[13, 2], Root[ 241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[13, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 6 + Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (52 + 3^Rational[1, 2] - 15^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 5^Rational[1, 2]), Root[ 1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { 6 + Rational[1, 2] 3^Rational[1, 2], Root[ 1 - 172 # + 6780 #^2 - 27872 #^3 + 46544 #^4 - 38528 #^5 + 16320 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-10919 + 31088 # + 43836 #^2 - 198096 #^3 + 229104 #^4 - 125248 #^5 + 35264 #^6 - 4864 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (24 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[17341 - 148852 # + 400316 #^2 - 518176 #^3 + 372624 #^4 - 156288 #^5 + 37824 #^6 - 4864 #^7 + 256 #^8& , 8, 0]}, { 7, Root[61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (46 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-11399 + 67008 # - 62980 #^2 - 79152 #^3 + 160064 #^4 - 102528 #^5 + 31360 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[3481 + 88028 # - 137064 #^2 - 82976 #^3 + 210464 #^4 - 127808 #^5 + 35904 #^6 - 4864 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (26 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[15, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (50 + 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 8, Root[61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[17, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 9, Root[61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[19, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { 10, Root[ 61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[21, 2], Root[ 181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 4.318412630014668}, {0.5, 3.4523872262302318`}, { 1, 4.318412630014668}, {1.5, 3.4523872262302318`}, { 2, 4.318412630014668}, {2.5, 3.4523872262302318`}, { 3, 4.318412630014668}, {3.5, 3.4523872262302318`}, { 3.6964611102567795`, 6.1649406830421425`}, {3.739926489329899, 5.960452151934918}, {4, 4.318412630014668}, {4.048943483704846, 5.009395635639464}, {4.103197753332579, 7.078486140684728}, { 4.239926489329899, 1.8103477043100213`}, {4.447838180147658, 0.8322001035762162}, {4.5, 3.4523872262302318`}, { 4.548943483704846, 2.7614042206051748`}, {4.603197753332579, 0.6923137155601267}, {4.633974596215562, 2.9523872262302286`}, { 4.6909830056250525`, 6.269469146309831}, {4.792088309182241, 4.340265029279491}, {4.912214747707527, 7.666271392977258}, { 5, 4.318412630014668}, {5, 5.318412630014654}, {5.0932633569242, 7.7707998562448966`}, {5.1909830056250525`, 1.5013307099350766`}, {5.412214747707527, 0.10452846326765342`}, {5.5, 2.4523872262302273`}, {5.5, 3.4523872262302318`}, {5.5, 6.857254398602283}, { 6, 0.9135454576426009}, {6, 4.318412630014668}, { 6, 5.318412630014654}, {6.087785252292473, 7.666271392977258}, { 6.3090169943749475`, 6.269469146309831}, {6.4067366430758, 0}, { 6.5, 2.4523872262302273`}, {6.5, 3.4523872262302318`}, { 6.587785252292473, 0.10452846326765342`}, {6.707911690817759, 3.430534826964033}, {6.8090169943749475`, 1.5013307099350766`}, { 6.866025403784438, 4.81841263001467}, {6.896802246667421, 7.078486140684728}, {6.951056516295154, 5.009395635639464}, { 7, 4.318412630014668}, {7.052161819852342, 6.938599752668695}, { 7.260073510670101, 5.960452151934918}, {7.396802246667421, 0.6923137155601267}, {7.451056516295154, 2.7614042206051748`}, { 7.5, 3.4523872262302318`}, {7.760073510670101, 1.8103477043100213`}, {7.803538889743221, 1.6058591732027274`}, { 8, 4.318412630014668}, {8.5, 3.4523872262302318`}, { 9, 4.318412630014668}, {9.5, 3.4523872262302318`}, { 10, 4.318412630014668}, {10.5, 3.4523872262302318`}}], PolygonBox[{{24, 33, 35, 30, 20}, {33, 24, 23, 32}, {33, 32, 42}, { 35, 33, 44, 47}, {35, 47, 46}, {30, 35, 43, 34}, {30, 34, 25}, { 20, 30, 22, 13}, {20, 13, 9}, {24, 20, 10, 12}, {24, 12, 21}, { 37, 28, 26, 31, 41}, {28, 37, 38, 29}, {28, 29, 19}, {26, 28, 17, 14}, {26, 14, 15}, {31, 26, 18, 27}, {31, 27, 36}, {41, 31, 39, 48}, {41, 48, 52}, {37, 41, 51, 49}, {37, 49, 40}, {1, 2, 3}, {3, 2, 4}, {3, 4, 5}, {5, 4, 6}, {5, 6, 7}, {7, 6, 8}, {7, 8, 11}, { 11, 8, 16}, {11, 16, 23}, {23, 16, 29}, {23, 29, 32}, {32, 29, 38}, {32, 38, 45}, {45, 38, 50}, {45, 50, 53}, {53, 50, 54}, {53, 54, 55}, {55, 54, 56}, {55, 56, 57}, {57, 56, 58}}]]}, "\"gyroelongated pentagonal bicupola\""], Annotation[#, "gyroelongated pentagonal bicupola", "Tooltip"]& ]], {3338.1818181818185`, -2164.7999999999997`}, ImageScaled[{0.5, 0.5}], {360., 359.9999999999998}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 0}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 1, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 1}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 3, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 2}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 5, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 3}, { Rational[ 1, 4] (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (39 - 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (347 + 149 5^Rational[1, 2] + (209310 + 93606 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 5 + Rational[-1, 2] (Rational[3, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (22 - 2 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[7, 2]}, { Rational[ 1, 4] (212 + 86 5^Rational[1, 2] + 10 (795 + 354 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (37 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (41 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 5 + Rational[-1, 2] 5^Rational[1, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 4}, { Rational[ 1, 2] (Rational[1, 2] (94 + 31 5^Rational[1, 2] + 5 (435 + 186 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (83 + Rational[67, 2] 5^Rational[1, 2] + Rational[7, 2] (795 + 354 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (100 + Rational[89, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (4745 + 2122 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (41 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (19 - 5^Rational[1, 2])}, { Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (45 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (80 + Rational[71, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (3305 + 1478 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (39 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[9, 2]}, { Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (45 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (212 + 86 5^Rational[1, 2] + 10 (795 + 354 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (45 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (21 - 5^Rational[1, 2])}, { Rational[ 1, 4] (3 (61 + 27 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (21 - 5^Rational[1, 2])}, {(Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (49 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (272 + 118 5^Rational[1, 2] + 22 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (43 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (230 + 101 5^Rational[1, 2] + (86475 + 38670 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (43 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 5}, { Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (23 - 5^Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (23 - 5^Rational[1, 2])}, { Rational[ 1, 2] (80 + Rational[71, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (3305 + 1478 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[11, 2]}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[11, 2]}, { Rational[ 1, 4] (223 + 97 5^Rational[1, 2] + (84270 + 37686 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[11, 2]}, { 0, Rational[1, 8] (43 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (100 + Rational[89, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (4745 + 2122 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (45 + 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (5 (23 + 10 5^Rational[1, 2] + 2 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2]))^ Rational[1, 2], Rational[1, 8] (49 + 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], 6}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 6}, { Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (45305 + 20261 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 6}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (3 (61 + 27 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (23 + 5^Rational[1, 2])}, { Rational[ 1, 4] (307 + 133 5^Rational[1, 2] + (182670 + 81654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (23 + 5^Rational[1, 2])}, { Rational[ 1, 2] (Rational[119, 2] + Rational[53, 2] 5^Rational[1, 2] + (6 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (45 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[13, 2]}, { Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[47, 4] + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (43 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (25 + 5^Rational[1, 2])}, { Rational[ 1, 4] (437 + 187 5^Rational[1, 2] + (6 (55985 + 25021 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (25 + 5^Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (74 + 31 5^Rational[1, 2] + (9915 + 4434 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 7}, { Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (53 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {( Rational[3, 2] (12 + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (47 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (307 + 133 5^Rational[1, 2] + (182670 + 81654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (27 + 5^Rational[1, 2])}, { Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[15, 2]}, { Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (45305 + 20261 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] (13 + 5^Rational[1, 2])}, {(Rational[47, 4] + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (51 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (55 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 8}, { Rational[ 1, 2] (Rational[119, 2] + Rational[53, 2] 5^Rational[1, 2] + (6 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (49 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (307 + 133 5^Rational[1, 2] + (182670 + 81654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (24 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 26 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (53 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 17, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 9}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 19, 2]}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], 10}, { Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2])), Rational[ 21, 2]}}, {{5.751704122479566, 0}, {4.885678718695127, 0.5}, { 5.751704122479566, 1}, {4.885678718695127, 1.5}, { 5.751704122479566, 2}, {4.885678718695127, 2.5}, { 5.751704122479566, 3}, {8.033690716544587, 3.212835404891247}, { 9.107627811146784, 3.352721792907336}, {1.945578411663427, 3.363892090339851}, {2.9401003070317, 3.4684205536075043`}, { 4.885678718695127, 3.5}, {7.082634200249433, 3.5218523992661943`}, {3.891156823326854, 3.777437547982452}, { 0.9945218953682734, 3.881966011250105}, {5.751704122479566, 4}, { 6.216608796464994, 4.021852399266194}, {8.621475968837059, 4.021852399266194}, {9.85077263662418, 4.021852399266194}, { 1.945578411663427, 4.1909830056250525`}, {2.3523150547392273`, 4.277437547982451}, {8.899716120329025, 4.330869393641142}, { 4.885678718695127, 4.5}, {4.677767027877368, 4.521852399266194}, {7.082634200249433, 4.521852399266194}, { 0.4067366430758002, 4.6909830056250525`}, {6.70276063877472, 4.6909830056250525`}, {3.891156823326854, 4.777437547982451}, { 8.033690716544587, 4.830869393641142}, {10.438557888916652`, 4.830869393641142}, {5.751704122479566, 5}, {2.9401003070317, 5.086454542357399}, {1.945578411663427, 5.1909830056250525`}, { 3.9346222023999737`, 5.1909830056250525`}, {8.899716120329025, 5.330869393641142}, {0.9945218953682734, 5.5}, { 4.885678718695127, 5.5}, {7.290545891067192, 5.5}, { 0, 5.604528463267654}, {9.85077263662418, 5.639886388016089}, { 0.7866102045505141, 5.860113611983911}, {10.637382841174693`, 5.895471536732346}, {3.3468369501075004`, 6}, { 5.751704122479566, 6}, {9.642860945806419, 6}, { 1.7376667208456675`, 6.169130606358858}, {6.70276063877472, 6.3090169943749475`}, {8.691804429511265, 6.3090169943749475`}, { 7.697282534142993, 6.413545457642601}, {4.885678718695127, 6.5}, {0.19882495225804095`, 6.669130606358858}, { 2.6036921246301064`, 6.669130606358858}, {6.746226017847839, 6.722562452017549}, {3.9346222023999737`, 6.8090169943749475`}, { 10.230646198098892`, 6.8090169943749475`}, {3.55474864092526, 6.978147600733806}, {5.959615813297325, 6.978147600733806}, { 5.751704122479566, 7}, {1.7376667208456675`, 7.169130606358858}, {8.285067786435466, 7.222562452017549}, { 8.691804429511265, 7.3090169943749475`}, {0.7866102045505141, 7.478147600733806}, {2.0159068723376334`, 7.478147600733806}, { 4.420774044709699, 7.478147600733806}, {4.885678718695127, 7.5}, {9.642860945806419, 7.618033988749895}, {6.746226017847839, 7.722562452017549}, {3.55474864092526, 7.978147600733806}, { 5.751704122479566, 8}, {7.697282534142993, 8.031579446392495}, { 8.691804429511265, 8.136107909660149}, {1.5297550300279084`, 8.147278207092665}, {2.6036921246301064`, 8.287164595108752}, { 4.885678718695127, 8.5}, {5.751704122479566, 9}, { 4.885678718695127, 9.5}, {5.751704122479566, 10}, { 4.885678718695127, 10.5}}], PolygonBox[{{29, 35, 48, 49, 38}, {47, 44, 31, 27, 38}, {49, 47, 38}, {57, 44, 47}, {60, 70, 67, 53, 49}, {48, 60, 49}, {71, 70, 60}, {45, 55, 66, 61, 48}, {35, 45, 48}, {42, 55, 45}, {22, 19, 30, 40, 35}, {29, 22, 35}, {9, 19, 22}, {25, 13, 8, 18, 29}, {38, 25, 29}, {17, 13, 25}, {52, 46, 33, 32, 43}, {34, 37, 50, 54, 43}, {32, 34, 43}, {24, 37, 34}, {21, 11, 14, 28, 32}, {33, 21, 32}, {10, 11, 21}, {36, 26, 15, 20, 33}, {46, 36, 33}, {39, 26, 36}, {59, 62, 51, 41, 46}, {52, 59, 46}, {72, 62, 59}, {56, 68, 73, 63, 52}, {43, 56, 52}, {64, 68, 56}, {3, 2, 1}, {4, 2, 3}, { 5, 4, 3}, {6, 4, 5}, {7, 6, 5}, {12, 6, 7}, {16, 12, 7}, {23, 12, 16}, {31, 23, 16}, {37, 23, 31}, {44, 37, 31}, {50, 37, 44}, { 58, 50, 44}, {65, 50, 58}, {69, 65, 58}, {74, 65, 69}, {75, 74, 69}, {76, 74, 75}, {77, 76, 75}, {78, 76, 77}}]]}, "\"gyroelongated pentagonal birotunda\""], Annotation[#, "gyroelongated pentagonal birotunda", "Tooltip"]& ]], {3730.9090909090914`, -2164.7999999999997`}, ImageScaled[{0.5, 0.5}], {360., 359.9999999999998}]}, {InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (18 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-85619 + 64628 # + 149296 #^2 - 107136 #^3 - 62336 #^4 + 44032 #^5 - 576 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (9 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[355501 - 964680 # + 775248 #^2 - 63200 #^3 - 156896 #^4 + 51840 #^5 + 1792 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { 1, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 2 + Rational[-1, 4] (10 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 12] (15 + 2 3^Rational[1, 2] - 3 5^Rational[1, 2] + 4 (6 (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (9 - 5^Rational[1, 2] - (10 - 2 5^Rational[1, 2])^ Rational[1, 2]), Root[ 61 + 1840 # + 4228 #^2 - 4240 #^3 - 2556 #^4 + 2080 #^5 + 112 #^6 - 160 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] (5 - 5^Rational[1, 2]), Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[3, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 - 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 - 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 - 5^Rational[1, 2]), Rational[1, 4] ( 4 + (142 + 58 5^Rational[1, 2] + 4 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (16 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[7381 - 30272 # + 2796 #^2 + 91264 #^3 - 101136 #^4 + 29632 #^5 + 2624 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[5, 2] + Rational[-1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[-105899 + 248920 # + 74648 #^2 - 262400 #^3 - 23696 #^4 + 55040 #^5 - 1408 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { 2, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 2, Rational[1, 2] ( 2 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[5, 2] + Rational[-1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Root[ 4621 + 20208 # - 79664 #^2 - 328656 #^3 + 12384 #^4 + 54912 #^5 - 3776 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, {Rational[5, 2], 0}, { Rational[5, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2], 1 + (Rational[3, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 3, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 3, Rational[1, 2] ( 2 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (10 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-105899 + 248920 # + 74648 #^2 - 262400 #^3 - 23696 #^4 + 55040 #^5 - 1408 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (11 + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (142 + 58 5^Rational[1, 2] + 4 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, {Rational[7, 2], 0}, { Rational[7, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (6 + 3^Rational[1, 2]), Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] (11 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[61 + 1840 # + 4228 #^2 - 4240 #^3 - 2556 #^4 + 2080 #^5 + 112 #^6 - 160 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 4] (12 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[40801 - 229360 # + 180648 #^2 + 57760 #^3 - 98896 #^4 + 23680 #^5 + 4992 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { 4, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (22 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-35279 - 266792 # + 493036 #^2 - 179856 #^3 - 68816 #^4 + 43712 #^5 - 576 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (11 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[355501 - 964680 # + 775248 #^2 - 63200 #^3 - 156896 #^4 + 51840 #^5 + 1792 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (15 + 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[9, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 5^Rational[1, 2]), Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 5, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[11, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 6, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[13, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 7, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[15, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 8, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[17, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 9, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[19, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 10, (Rational[23, 4] + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[21, 2], (5 + 2 5^Rational[1, 2])^Rational[1, 2]}}, {{ 0, 3.9437089409596924`}, {0.5, 3.0776835371752536`}, { 0.696461110256779, 5.790236993987189}, {0.7399264893298989, 5.5857484628799}, {1, 3.9437089409596924`}, {1.0489434837048464`, 4.634691946584745}, {1.1031977533325794`, 6.70378245162979}, { 1.381966011250105, 1.5388417685876268`}, {1.5, 3.0776835371752536`}, {1.6909830056250525`, 0.5877852522924731}, {1.6909830056250525`, 2.48989828488278}, { 1.6909830056250525`, 5.894765457254845}, {1.7920883091822408`, 3.965561340225546}, {1.9122147477075269`, 7.291567703922265}, { 2, 3.9437089409596924`}, {2, 4.943708940959692}, { 2.0932633569242, 7.396096167189916}, {2.5, 0}, {2.5, 3.0776835371752536`}, {2.5, 6.482550709547319}, { 3, 3.9437089409596924`}, {3, 4.943708940959692}, { 3.0877852522924734`, 7.291567703922265}, {3.3090169943749475`, 5.894765457254845}, {3.5, 0}, {3.5, 3.0776835371752536`}, { 3.8660254037844384`, 4.443708940959692}, {3.896802246667421, 6.70378245162979}, {3.9510565162951536`, 4.634691946584728}, { 4, 3.9437089409596924`}, {4.0521618198523415`, 6.563896063613704}, {4.260073510670101, 5.5857484628799}, { 4.3090169943749475`, 0.5877852522924731}, {4.3090169943749475`, 2.48989828488278}, {4.5, 3.0776835371752536`}, { 4.618033988749895, 1.5388417685876268`}, { 5, 3.9437089409596924`}, {5.5, 3.0776835371752536`}, { 6, 3.9437089409596924`}, {6.5, 3.0776835371752536`}, { 7, 3.9437089409596924`}, {7.5, 3.0776835371752536`}, { 8, 3.9437089409596924`}, {8.5, 3.0776835371752536`}, { 9, 3.9437089409596924`}, {9.5, 3.0776835371752536`}, { 10, 3.9437089409596924`}, {10.5, 3.0776835371752536`}}], PolygonBox[{{26, 19, 11, 8, 10, 18, 25, 33, 36, 34}, {1, 2, 5}, {5, 2, 9}, {5, 9, 15}, {15, 9, 19}, {15, 19, 21}, {21, 19, 26}, {21, 26, 30}, {30, 26, 35}, {30, 35, 37}, {37, 35, 38}, {16, 22, 24, 20, 12}, {22, 16, 15, 21}, {22, 21, 27}, {24, 22, 29, 32}, {24, 32, 31}, {20, 24, 28, 23}, {20, 23, 17}, {12, 20, 14, 7}, {12, 7, 3}, {16, 12, 4, 6}, {16, 6, 13}, {37, 38, 39}, {40, 39, 38}, { 39, 40, 41}, {42, 41, 40}, {41, 42, 43}, {44, 43, 42}, {43, 44, 45}, {46, 45, 44}, {45, 46, 47}, {48, 47, 46}}]]}, "\"gyroelongated pentagonal cupola\""], Annotation[#, "gyroelongated pentagonal cupola", "Tooltip"]& ]], {196.36363636363637`, -2558.3999999999996`}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { 1, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[3, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { 2, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { 3, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (22 - 2 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (43 - 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 8] (42 - 3^Rational[1, 2] - 5^Rational[1, 2] (2 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[ 6781 - 12804 # - 86360 #^2 + 229344 #^3 - 200016 #^4 + 67584 #^5 - 3200 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (21 - 5^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[12541 + 128140 # - 444148 #^2 + 538960 #^3 - 305936 #^4 + 75200 #^5 - 832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (41 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[-1, 2] 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 4, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[-1, 2] (Rational[1, 2] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 12] (15 + 2 3^Rational[1, 2] - 3 5^Rational[1, 2] + ( 3 (361 + 159 5^Rational[1, 2] + (30 (8545 + 3821 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (21 - 5^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-3659 + 33100 # - 112048 #^2 + 180400 #^3 - 143936 #^4 + 49280 #^5 - 832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (19 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (45 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (7 + 2 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[9, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 8] (45 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[3, 2] (18 + 5 5^Rational[1, 2] + (435 + 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), Rational[1, 4] ( 4 + (3 (61 + 27 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 8] (49 - 3 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), ( Rational[17, 4] + Rational[7, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[195, 2] + Rational[87, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (40 - 3^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-63659 + 294236 # - 544820 #^2 + 516384 #^3 - 259616 #^4 + 59584 #^5 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (22 - (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-59 + 5020 # - 50528 #^2 + 147440 #^3 - 160896 #^4 + 65920 #^5 - 3392 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { 5, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 5, Rational[1, 4] ( 4 + (133 + 59 5^Rational[1, 2] + (30 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (47 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (38 + 14 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] ( 22 - (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]), Root[-9239 - 4804 # + 57880 #^2 - 2016 #^3 - 92816 #^4 + 58624 #^5 - 5760 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (23 - 5^Rational[1, 2]), Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (23 - 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[11, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[11, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[11, 2], Rational[1, 4] ( 4 + (223 + 97 5^Rational[1, 2] + (84270 + 37686 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (43 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 8] (47 - 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 6, Rational[ 1, 4] (53 + 19 5^Rational[1, 2] + 3 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 6, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 6, Rational[1, 4] ( 4 + (133 + 59 5^Rational[1, 2] + (30 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] (22 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-59 + 5020 # - 50528 #^2 + 147440 #^3 - 160896 #^4 + 65920 #^5 - 3392 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (45 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (23 + 5^Rational[1, 2]), Rational[1, 4] ( 4 + (3 (61 + 27 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Rational[13, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 + 2 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (49 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (8 + Rational[7, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (25 + 5^Rational[1, 2]), Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 6 + Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] ( 2 + (133 + 59 5^Rational[1, 2] + (30 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-3659 + 33100 # - 112048 #^2 + 180400 #^3 - 143936 #^4 + 49280 #^5 - 832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (24 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-38039 + 202780 # - 415688 #^2 + 421040 #^3 - 218016 #^4 + 47680 #^5 + 2368 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (47 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 7, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (46 - 3^Rational[1, 2] + 2 5^Rational[1, 2] + 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[16141 - 54924 # + 33700 #^2 + 71664 #^3 - 111456 #^4 + 50304 #^5 - 3200 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (53 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (10 + 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (23 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[12541 + 128140 # - 444148 #^2 + 538960 #^3 - 305936 #^4 + 75200 #^5 - 832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (20 - 2 5^Rational[1, 2] - 2 (75 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (16 + 5 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (51 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (22 + Rational[17, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (185 + 82 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[15, 2], Rational[1, 8] ((250 + 110 5^Rational[1, 2])^Rational[1, 2] + 3 (3^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 8] (55 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 2] (13 + Rational[11, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 8, (Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (26 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (37 - 5 5^Rational[1, 2] + 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7.478147600733806, 2.0159068723376334`}, {7.478147600733806, 4.420774044709699}, {7.5, 4.885678718695127}, {7.978147600733806, 3.55474864092526}, {8, 5.751704122479566}, {8.147278207092665, 1.5297550300279084`}, {8.287164595108752, 2.6036921246301064`}, { 8.5, 4.885678718695127}, {9, 5.751704122479566}, {9.5, 4.885678718695127}, {10, 5.751704122479566}, {10.5, 4.885678718695127}}], PolygonBox[{{28, 40, 43, 35, 23}, {40, 28, 27, 39}, {40, 39, 48}, { 43, 40, 50, 55}, {43, 55, 53}, {35, 43, 49, 41}, {35, 41, 30}, { 23, 35, 26, 17}, {23, 17, 11}, {28, 23, 12, 16}, {28, 16, 25}, { 38, 29, 31, 42, 46}, {38, 47, 44, 34, 32}, {38, 32, 29}, {32, 34, 21}, {29, 24, 13, 9, 19}, {29, 19, 31}, {19, 9, 8}, {31, 18, 14, 22, 33}, {31, 33, 42}, {33, 22, 36}, {42, 37, 45, 56, 54}, {42, 54, 46}, {54, 56, 62}, {46, 57, 63, 60, 51}, {46, 51, 38}, {51, 60, 58}, {1, 2, 3}, {3, 2, 4}, {3, 4, 5}, {5, 4, 6}, {5, 6, 7}, { 7, 6, 10}, {7, 10, 15}, {15, 10, 20}, {15, 20, 27}, {27, 20, 34}, {27, 34, 39}, {39, 34, 44}, {39, 44, 52}, {52, 44, 59}, {52, 59, 61}, {61, 59, 64}, {61, 64, 65}, {65, 64, 66}, {65, 66, 67}, {67, 66, 68}}]]}, "\"gyroelongated pentagonal cupolarotunda\""], Annotation[#, "gyroelongated pentagonal cupolarotunda", "Tooltip"]& ]], {589.0909090909091, -2558.3999999999996`}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2], Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 2], (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 1, (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[3, 2], Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 3, 2], (Rational[17, 4] + Rational[1, 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Rational[1, 2])}, { Rational[ 1, 4] (5 (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (7 + 7 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (62 + 26 5^Rational[1, 2] + 4 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (4 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (73 + 23 5^Rational[1, 2] + 3 (870 + 366 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (3 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[3, 2] (12 + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (1 + 5^Rational[1, 2])}, { Rational[ 1, 4] (97 + 25 5^Rational[1, 2] + (6 (1745 + 659 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (85 + 37 5^Rational[1, 2] + (30 (445 + 199 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (9 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[61, 8] + Rational[17, 8] 5^Rational[1, 2] + (75 + 30 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (2 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (115 + 43 5^Rational[1, 2] + (30 (745 + 331 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-3 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (115 + 43 5^Rational[1, 2] + (30 (745 + 331 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (5 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] 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5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (43 + Rational[37, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (4745 + 2122 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (3 + 3 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (193 + 73 5^Rational[1, 2] + 19 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (3 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[47, 4] + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[3, 4] 5^Rational[1, 2] + Rational[-1, 4] (3 (5 - 2 5^Rational[1, 2]))^Rational[1, 2]}, {( Rational[47, 4] + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (1 + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (217 + 95 5^Rational[1, 2] + (75750 + 33870 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 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(18545 + 8269 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (5 + 7 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[145, 8] + Rational[61, 8] 5^Rational[1, 2] + ( Rational[15, 2] (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (-1 + 2 5^Rational[1, 2] - (15 - 6 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[145, 8] + Rational[61, 8] 5^Rational[1, 2] + ( Rational[15, 2] (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (2 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (287 + 127 5^Rational[1, 2] + (149070 + 66666 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-3 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (287 + 127 5^Rational[1, 2] + (149070 + 66666 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (5 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, 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{7.692363178967401, 4.221949092451657}, { 8.001380173342348, 3.2708925761565038`}, {8.192363178967401, 2.683107323864031}, {8.501380173342348, 1.7320508075688772`}}], PolygonBox[{{12, 16, 15, 10, 8}, {13, 9, 10, 15, 17}, {6, 11, 12, 8, 4}, {18, 20, 16, 12, 14}, {22, 19, 15, 16, 21}, {21, 24, 29, 27, 22}, {42, 41, 36, 35, 38}, {39, 33, 32, 36, 40}, {25, 23, 27, 32, 30}, {32, 27, 29, 35, 36}, {31, 35, 29}, {31, 29, 26}, {31, 37, 35}, {31, 34, 37}, {34, 31, 28}, {5, 8, 10}, {5, 10, 7}, {5, 3, 8}, {5, 1, 3}, {1, 5, 2}}]]}, "\"metabiaugmented dodecahedron\""], Annotation[#, "metabiaugmented dodecahedron", "Tooltip"]& ]], {1767.2727272727275`, -2952.}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{0, Rational[3, 2]}, {0, Rational[5, 2]}, { Rational[1, 2], Rational[1, 2] (3 - 3^Rational[1, 2])}, { Rational[1, 2], Rational[1, 2] (5 + 3^Rational[1, 2])}, { 1, Rational[3, 2]}, {1, Rational[5, 2]}, { Rational[1, 2] (1 + 3^Rational[1, 2]), 1 + Rational[-1, 2] 3^Rational[1, 2]}, { Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] (2 + 3^Rational[1, 2]), 0}, { Rational[1, 2] (2 + 3^Rational[1, 2]), 1}, { Rational[1, 2] (2 + 3^Rational[1, 2]), 3}, { Rational[1, 2] (2 + 3^Rational[1, 2]), 4}, { 1 + 3^Rational[1, 2], Rational[1, 2]}, { 1 + 3^Rational[1, 2], Rational[3, 2]}, { 1 + 3^Rational[1, 2], Rational[5, 2]}, { 1 + 3^Rational[1, 2], Rational[7, 2]}, { 1 + 3^Rational[1, 2], Rational[9, 2]}, { 1 + Rational[3, 2] 3^Rational[1, 2], 0}, { 1 + Rational[3, 2] 3^Rational[1, 2], 1}, { 1 + Rational[3, 2] 3^Rational[1, 2], 3}, { 2 + 3^Rational[1, 2], Rational[3, 2]}, { 2 + 3^Rational[1, 2], Rational[5, 2]}, { 2 + Rational[3, 2] 3^Rational[1, 2], 1}, { 2 + Rational[3, 2] 3^Rational[1, 2], 3}, { 2 (1 + 3^Rational[1, 2]), Rational[3, 2]}, { 2 (1 + 3^Rational[1, 2]), Rational[5, 2]}}, {{0, 1.5}, { 0, 2.5}, {0.5, 0.6339745962155614}, {0.5, 3.3660254037844384`}, { 1, 1.5}, {1, 2.5}, {1.3660254037844386`, 0.1339745962155614}, { 1.3660254037844386`, 3.8660254037844384`}, { 1.8660254037844386`, 0}, {1.8660254037844386`, 1}, { 1.8660254037844386`, 3}, {1.8660254037844386`, 4}, { 2.732050807568877, 0.5}, {2.732050807568877, 1.5}, { 2.732050807568877, 2.5}, {2.732050807568877, 3.5}, { 2.732050807568877, 4.5}, {3.598076211353316, 0}, { 3.598076211353316, 1}, {3.598076211353316, 3}, { 3.732050807568877, 1.5}, {3.732050807568877, 2.5}, { 4.598076211353316, 1}, {4.598076211353316, 3}, { 5.464101615137754, 1.5}, {5.464101615137754, 2.5}}], PolygonBox[{{6, 5, 10, 14, 15, 11}, {22, 21, 23, 25, 26, 24}, {5, 6, 2, 1}, {10, 5, 3, 7}, {15, 14, 21, 22}, {6, 11, 8, 4}, {10, 13, 14}, {10, 9, 13}, {14, 13, 19}, {19, 13, 18}, {15, 16, 11}, { 15, 20, 16}, {11, 16, 12}, {12, 16, 17}}]]}, "\"metabiaugmented hexagonal prism\""], Annotation[#, "metabiaugmented hexagonal prism", "Tooltip"]& ]], {2160., -2952.}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (-1 + 5 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 7 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { 1 + Rational[3, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), 0}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 17 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 21 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (17 + 11 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (39 + 25 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 16] (90 + 2 3^Rational[1, 2] + 54 5^Rational[1, 2] - 2 15^Rational[1, 2] - ((1 + 3^Rational[1, 2]) (10 - 2 5^Rational[1, 2])^Rational[1, 2]) ( 1 + 5^Rational[1, 2])), Root[-10739 - 154832 # - 107004 #^2 + 61184 #^3 + 47984 #^4 - 7168 #^5 - 6336 #^6 + 256 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 32] (-(50 - 10 5^Rational[1, 2])^Rational[1, 2] - 4 (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] - 4 (-43 - 3^Rational[1, 2] - 27 5^Rational[1, 2] + 15^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2])), Root[-64979 - 140752 # - 34304 #^2 + 88144 #^3 + 39264 #^4 - 14848 #^5 - 7616 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 16] (86 + 2 3^Rational[1, 2] + 58 5^Rational[1, 2] - 2 15^Rational[1, 2] - ((1 + 3^Rational[1, 2]) (10 - 2 5^Rational[1, 2])^Rational[1, 2]) ( 1 + 5^Rational[1, 2])), Root[-353219 - 868832 # - 439984 #^2 + 184384 #^3 + 124224 #^4 - 12288 #^5 - 10176 #^6 + 256 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 32] (172 + 8 3^Rational[1, 2] + 108 5^Rational[1, 2] - (50 - 10 5^Rational[1, 2])^ Rational[1, 2] - 4 (30 - 6 5^Rational[1, 2])^Rational[1, 2] - 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] - 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[-59 + 5988 # - 52300 #^2 + 47168 #^3 + 25824 #^4 - 19648 #^5 - 7680 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 8] (44 + 3^Rational[1, 2] + 28 5^Rational[1, 2] - 15^ Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-102719 - 238924 # - 100460 #^2 + 90064 #^3 + 52704 #^4 - 9856 #^5 - 7040 #^6 + 256 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 8] (43 + 29 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (76 + 13 5^Rational[1, 2] + (1095 - 474 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 32] (180 + 8 3^Rational[1, 2] + 116 5^Rational[1, 2] - (50 - 10 5^Rational[1, 2])^ Rational[1, 2] - 4 (30 - 6 5^Rational[1, 2])^Rational[1, 2] - 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] - 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[ 24721 - 50212 # - 63140 #^2 + 77648 #^3 + 37024 #^4 - 16768 #^5 - 7040 #^6 + 512 #^7 + 256 #^8& , 5, 0]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (598 + 254 5^Rational[1, 2] + 4 (6 (745 + 331 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 32] (-(50 - 10 5^Rational[1, 2])^Rational[1, 2] - 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] - 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2] + 8 (22 + 3^Rational[1, 2] + 14 5^Rational[1, 2])), Root[ 1741 + 10644 # - 95176 #^2 + 37088 #^3 + 45504 #^4 - 11584 #^5 - 7104 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 32] (172 + 8 3^Rational[1, 2] + 108 5^Rational[1, 2] - (50 - 10 5^Rational[1, 2])^ Rational[1, 2] + 4 (30 - 6 5^Rational[1, 2])^Rational[1, 2] - 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] - 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[ 24721 - 50212 # - 63140 #^2 + 77648 #^3 + 37024 #^4 - 16768 #^5 - 7040 #^6 + 512 #^7 + 256 #^8& , 5, 0]}, { Rational[1, 4] (19 + 15 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 7 5^Rational[1, 2]), Rational[ 1, 4] (103 + 25 5^Rational[1, 2] - (1230 - 426 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 7 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (48 - 3^Rational[1, 2] + 28 5^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-76679 - 603508 # - 746224 #^2 + 236816 #^3 + 415584 #^4 - 192 #^5 - 20736 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-47 + 3^Rational[1, 2] - 27 5^Rational[1, 2] + 15^Rational[1, 2])), Root[ 19441 - 368096 # - 756020 #^2 + 260336 #^3 + 461424 #^4 - 4544 #^5 - 23360 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] (((4 + 5 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 ((6 (85 + 31 5^Rational[1, 2]))^Rational[1, 2] + 4 (-48 + 3^Rational[1, 2] - 30 5^Rational[1, 2] + 15^Rational[1, 2]))), Root[-2151239 - 4950268 # - 2850964 #^2 + 472256 #^3 + 552384 #^4 - 6912 #^5 - 24576 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (44 + 3 3^Rational[1, 2] + 28 5^Rational[1, 2] + 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-36539 - 119624 # - 54836 #^2 + 88992 #^3 + 40864 #^4 - 15616 #^5 - 6144 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 32] (-(50 - 10 5^Rational[1, 2])^Rational[1, 2] + 4 (30 - 6 5^Rational[1, 2])^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 4 (43 + 3 3^Rational[1, 2] + 27 5^Rational[1, 2] + 15^Rational[1, 2] - (5 + 2 5^Rational[1, 2])^ Rational[1, 2])), Root[ 18481 - 79068 # + 16600 #^2 + 121632 #^3 + 32544 #^4 - 19392 #^5 - 6080 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 2] (11 + 3^Rational[1, 2] + 7 5^Rational[1, 2]), Rational[ 1, 4] (-2 + (103 + 25 5^Rational[1, 2] - (1230 - 426 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-49 + 3^Rational[1, 2] - 29 5^Rational[1, 2] + 15^Rational[1, 2])), Root[-396479 - 1371736 # - 1099860 #^2 + 238336 #^3 + 358064 #^4 - 4544 #^5 - 20160 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {Root[ 152722621 + 349563384 # + 222695504 #^2 + 23475648 #^3 - 9049696 #^4 - 441984 #^5 + 184576 #^6 - 12288 #^7 + 256 #^8& , 7, 0], Root[ 10321 - 275228 # - 2178540 #^2 - 210288 #^3 + 508464 #^4 + 7168 #^5 - 24640 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] (360 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (12 + 3^Rational[1, 2] + 7 5^Rational[1, 2]), Rational[ 1, 4] (-2 + (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[77, 4] + 8 5^Rational[1, 2] + Rational[1, 2] (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (24 + 14 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 32] (-(50 - 10 5^Rational[1, 2])^Rational[1, 2] + 4 (30 - 6 5^Rational[1, 2])^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 4 (45 + 3 3^Rational[1, 2] + 29 5^Rational[1, 2] + 15^Rational[1, 2] - (5 + 2 5^Rational[1, 2])^ Rational[1, 2])), Root[-20219 - 60668 # - 15620 #^2 + 73632 #^3 + 33424 #^4 - 19072 #^5 - 6720 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 16] (86 + 6 3^Rational[1, 2] + 58 5^Rational[1, 2] + 2 15^Rational[1, 2] + ((-1 + 3^Rational[1, 2]) (10 - 2 5^Rational[1, 2])^ Rational[1, 2]) (1 + 5^Rational[1, 2])), Root[ 24721 - 97108 # - 52620 #^2 + 77312 #^3 + 32784 #^4 - 14272 #^5 - 5440 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 64] (392 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 135181 - 6464 # - 656796 #^2 - 221568 #^3 + 317184 #^4 + 7744 #^5 - 20224 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (43 + 4 3^Rational[1, 2] + 29 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (-2 + ( 2 (46 + 5 5^Rational[1, 2] + (435 - 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 2] (13 + 3^Rational[1, 2] + 7 5^Rational[1, 2]), Rational[ 1, 4] (-2 + (103 + 25 5^Rational[1, 2] - (1230 - 426 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 64] (424 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (49 + 31 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 32] ((50 - 10 5^Rational[1, 2])^Rational[1, 2] + 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 4 (49 + 3^Rational[1, 2] + 29 5^Rational[1, 2] + 15^Rational[1, 2]) + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + 2 15^Rational[1, 2])), Root[-80459 - 645704 # - 1002420 #^2 - 27136 #^3 + 359024 #^4 - 14656 #^5 - 20160 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[-1186799 + 37554308 # + 117848860 #^2 + 30868848 #^3 - 6365456 #^4 - 742208 #^5 + 192960 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[ 589321 - 237292 # - 1460624 #^2 - 31376 #^3 + 350304 #^4 - 10048 #^5 - 18176 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (1 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2]) + 2 (196 + 8 3^Rational[1, 2] + 116 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^ Rational[1, 2])), Root[-40199 - 672256 # - 522876 #^2 + 380928 #^3 + 259584 #^4 - 53824 #^5 - 20224 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (27 + 17 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[3384001 + 84410704 # + 112475844 #^2 + 36113888 #^3 - 3680656 #^4 - 1456384 #^5 + 246336 #^6 - 13568 #^7 + 256 #^8& , 8, 0], Root[ 141541 - 102412 # - 403980 #^2 + 296448 #^3 + 184224 #^4 - 69568 #^5 - 21760 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[2612461 + 7491790 # + 6452642 #^2 + 1599520 #^3 - 240336 #^4 - 69480 #^5 + 13488 #^6 - 800 #^7 + 16 #^8& , 8, 0], Root[-666599 - 2359672 # - 1745640 #^2 + 762288 #^3 + 432864 #^4 - 67648 #^5 - 24640 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, {Root[ 31027861 + 163898340 # + 200320748 #^2 + 35730400 #^3 - 8861136 #^4 - 699200 #^5 + 205632 #^6 - 12800 #^7 + 256 #^8& , 8, 0], Root[ 35521 - 128192 # - 718624 #^2 - 176816 #^3 + 416784 #^4 - 9408 #^5 - 20736 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[306575401 + 458664888 # + 213372160 #^2 + 17463408 #^3 - 8219776 #^4 - 471168 #^5 + 184640 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[-106259 - 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0.9945218953682734}, { 3.5315794463924957`, 0.9945218953682734}, {4.509727047126302, 1.2024335861860327`}, {0.2225624520175482, 1.945578411663427}, { 1.2225624520175482`, 1.945578411663427}, {2.222562452017548, 1.945578411663427}, {3.840596440767443, 1.945578411663427}, { 4.754141898410044, 2.3523150547392273`}, {3.0315794463924957`, 2.5333636639559}, {0.7225624520175482, 2.8116038154478655`}, { 1.7225624520175482`, 2.8116038154478655`}, {3.9451249040350964`, 2.9401003070317}}], PolygonBox[{{7, 12, 11, 6, 4}, {13, 15, 12, 7, 8}, {1, 6, 5}, {4, 6, 1}, {2, 7, 4}, {9, 8, 3}, {9, 13, 8}, {18, 15, 13}, {14, 18, 13}, {17, 11, 12}, {17, 16, 11}, {16, 10, 11}}]]}, "\"metabidiminished icosahedron\""], Annotation[#, "metabidiminished icosahedron", "Tooltip"]& ]], {2945.4545454545455`, -2952.}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 2] Root[11041 - 34460 # + 22382 #^2 - 20 #^3 - 3156 #^4 + 570 #^5 + 63 #^6 - 20 #^7 + #^8& , 8, 0]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-8999 - 38036 # + 14412 #^2 + 78112 #^3 + 9840 #^4 - 28352 #^5 - 4288 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-2039 + 20788 # + 33228 #^2 - 119584 #^3 + 51440 #^4 + 15296 #^5 - 7872 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Root[-36299 - 11792 # + 91020 #^2 - 25392 #^3 - 44976 #^4 + 24832 #^5 + 320 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Root[ 26161 - 89608 # + 79260 #^2 + 22832 #^3 - 55536 #^4 + 11648 #^5 + 8000 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[6481 + 65564 # - 76686 #^2 + 10508 #^3 + 5724 #^4 - 934 #^5 - 109 #^6 + 12 #^7 + #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[961 + 3596 # - 4410 #^2 - 1796 #^3 + 1844 #^4 + 94 #^5 - 105 #^6 - 4 #^7 + #^8& , 8, 0]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] Root[107761 + 284 # - 68490 #^2 + 24956 #^3 + 1644 #^4 - 2314 #^5 + 455 #^6 - 36 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-8999 - 38036 # + 14412 #^2 + 78112 #^3 + 9840 #^4 - 28352 #^5 - 4288 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-2039 + 20788 # + 33228 #^2 - 119584 #^3 + 51440 #^4 + 15296 #^5 - 7872 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-3539 + 23524 # - 40596 #^2 - 17312 #^3 + 92784 #^4 - 79424 #^5 + 28736 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Root[ 10561 - 77240 # - 86052 #^2 + 178880 #^3 - 1456 #^4 - 40960 #^5 + 192 #^6 + 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 2] Root[-3599 + 716 # + 9639 #^2 - 6328 #^3 + 9 #^4 + 584 #^5 - 49 #^6 - 12 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 2] Root[64261 - 64336 # - 801 #^2 + 16288 #^3 - 4291 #^4 - 284 #^5 + 231 #^6 - 28 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), -1 + Root[5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 1 + Root[5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Root[-359 - 3584 # - 2640 #^2 + 31904 #^3 - 17056 #^4 - 15616 #^5 + 14400 #^6 - 3584 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[ 15061 - 3524 # - 63108 #^2 + 20688 #^3 + 43440 #^4 - 14528 #^5 - 6208 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[ 1525 + 25700 # - 82500 #^2 - 10000 #^3 + 79920 #^4 - 1600 #^5 - 9280 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[-3599 + 716 # + 9639 #^2 - 6328 #^3 + 9 #^4 + 584 #^5 - 49 #^6 - 12 #^7 + #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[64261 - 64336 # - 801 #^2 + 16288 #^3 - 4291 #^4 - 284 #^5 + 231 #^6 - 28 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2], Rational[1, 2] Root[11041 - 34460 # + 22382 #^2 - 20 #^3 - 3156 #^4 + 570 #^5 + 63 #^6 - 20 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-8999 - 38036 # + 14412 #^2 + 78112 #^3 + 9840 #^4 - 28352 #^5 - 4288 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-2039 + 20788 # + 33228 #^2 - 119584 #^3 + 51440 #^4 + 15296 #^5 - 7872 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-36299 - 11792 # + 91020 #^2 - 25392 #^3 - 44976 #^4 + 24832 #^5 + 320 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[ 26161 - 89608 # + 79260 #^2 + 22832 #^3 - 55536 #^4 + 11648 #^5 + 8000 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[6481 + 65564 # - 76686 #^2 + 10508 #^3 + 5724 #^4 - 934 #^5 - 109 #^6 + 12 #^7 + #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[961 + 3596 # - 4410 #^2 - 1796 #^3 + 1844 #^4 + 94 #^5 - 105 #^6 - 4 #^7 + #^8& , 8, 0]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[107761 + 284 # - 68490 #^2 + 24956 #^3 + 1644 #^4 - 2314 #^5 + 455 #^6 - 36 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-8999 - 38036 # + 14412 #^2 + 78112 #^3 + 9840 #^4 - 28352 #^5 - 4288 #^6 + 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-2039 + 20788 # + 33228 #^2 - 119584 #^3 + 51440 #^4 + 15296 #^5 - 7872 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-3539 + 23524 # - 40596 #^2 - 17312 #^3 + 92784 #^4 - 79424 #^5 + 28736 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[ 5041 - 42884 # - 28416 #^2 + 99792 #^3 - 26016 #^4 - 34496 #^5 + 22016 #^6 - 4352 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[10561 - 77240 # - 86052 #^2 + 178880 #^3 - 1456 #^4 - 40960 #^5 + 192 #^6 + 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[-3599 + 716 # + 9639 #^2 - 6328 #^3 + 9 #^4 + 584 #^5 - 49 #^6 - 12 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[64261 - 64336 # - 801 #^2 + 16288 #^3 - 4291 #^4 - 284 #^5 + 231 #^6 - 28 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), -1 + Root[5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1 + Root[ 5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[-359 - 3584 # - 2640 #^2 + 31904 #^3 - 17056 #^4 - 15616 #^5 + 14400 #^6 - 3584 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[ 15061 - 3524 # - 63108 #^2 + 20688 #^3 + 43440 #^4 - 14528 #^5 - 6208 #^6 + 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Root[ 1525 + 25700 # - 82500 #^2 - 10000 #^3 + 79920 #^4 - 1600 #^5 - 9280 #^6 + 256 #^8& , 8, 0]}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Root[-19559 + 109904 # - 216940 #^2 + 188336 #^3 - 55536 #^4 - 20544 #^5 + 18240 #^6 - 4096 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[-3599 + 716 # + 9639 #^2 - 6328 #^3 + 9 #^4 + 584 #^5 - 49 #^6 - 12 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] Root[64261 - 64336 # - 801 #^2 + 16288 #^3 - 4291 #^4 - 284 #^5 + 231 #^6 - 28 #^7 + #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[5281 - 6688 # - 57472 #^2 + 1184 #^3 + 59040 #^4 - 9216 #^5 - 7872 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[ 4261 - 7420 # - 41448 #^2 + 112160 #^3 - 68496 #^4 - 6400 #^5 + 15488 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Root[-2039 + 20788 # + 33228 #^2 - 119584 #^3 + 51440 #^4 + 15296 #^5 - 7872 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[30241 - 167372 # - 52912 #^2 + 226816 #^3 - 63360 #^4 - 42624 #^5 + 24768 #^6 - 4352 #^7 + 256 #^8& , 7, 0], Root[-359 + 1904 # + 332 #^2 - 14608 #^3 + 16800 #^4 + 7488 #^5 - 6528 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[32761 + 131044 # + 98940 #^2 - 101344 #^3 - 60016 #^4 + 29696 #^5 + 4800 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 22921 - 126428 # + 241940 #^2 - 190208 #^3 + 37824 #^4 + 21888 #^5 - 7680 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-4019 - 60068 # - 125400 #^2 + 251552 #^3 - 64336 #^4 - 44032 #^5 + 24960 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 15901 + 37512 # - 42652 #^2 - 40176 #^3 + 31280 #^4 + 11904 #^5 - 7232 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 2] Root[961 + 3596 # - 4410 #^2 - 1796 #^3 + 1844 #^4 + 94 #^5 - 105 #^6 - 4 #^7 + #^8& , 8, 0]}, { Root[11941 - 62908 # - 75380 #^2 + 147232 #^3 - 8736 #^4 - 54592 #^5 + 25600 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 1525 - 15800 # + 54900 #^2 - 72000 #^3 + 23280 #^4 + 16000 #^5 - 7360 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Root[18121 + 52076 # - 17436 #^2 - 130048 #^3 - 52896 #^4 + 27584 #^5 + 6656 #^6 - 3072 #^7 + 256 #^8& , 8, 0], Root[-719 - 22592 # + 85128 #^2 - 90784 #^3 + 16640 #^4 + 17216 #^5 - 5952 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-552239 - 427088 # + 773420 #^2 + 157552 #^3 - 252816 #^4 + 15168 #^5 + 20160 #^6 - 4352 #^7 + 256 #^8& , 7, 0], Root[ 14821 + 13588 # - 96772 #^2 - 45584 #^3 + 95040 #^4 - 1344 #^5 - 12672 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-35459 - 102944 # + 112064 #^2 + 148912 #^3 - 76896 #^4 - 32256 #^5 + 23616 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[-4259 + 17788 # - 18412 #^2 - 11744 #^3 + 24000 #^4 - 384 #^5 - 6912 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-2339 - 117072 # + 315740 #^2 + 66768 #^3 - 191296 #^4 - 2688 #^5 + 23680 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[ 14101 + 39012 # - 82800 #^2 - 111088 #^3 + 138304 #^4 - 1152 #^5 - 15680 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-367859 - 352564 # + 465124 #^2 + 186352 #^3 - 190176 #^4 - 2176 #^5 + 21376 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 181 + 236 # - 5808 #^2 - 6192 #^3 + 31200 #^4 - 11008 #^5 - 10048 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 37376 # - 158160 #^2 - 172624 #^3 - 19936 #^4 + 35456 #^5 + 2880 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-4259 - 6228 # + 75780 #^2 - 86368 #^3 + 17344 #^4 + 14208 #^5 - 5120 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[3541 + 8704 # - 700 #^2 - 11564 #^3 - 2856 #^4 + 2736 #^5 + 120 #^6 - 176 #^7 + 16 #^8& , 8, 0], Root[-10679 - 5208 # + 78456 #^2 - 95264 #^3 + 27424 #^4 + 11328 #^5 - 5696 #^6 - 256 #^7 + 256 #^8& , 6, 0]}, { Root[-36539 - 13416 # + 132244 #^2 + 55248 #^3 - 110896 #^4 - 22464 #^5 + 24896 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-5039 + 28272 # - 40564 #^2 - 19264 #^3 + 63744 #^4 - 12352 #^5 - 13056 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-4079 + 5084 # + 107540 #^2 + 60896 #^3 - 72096 #^4 - 14784 #^5 + 19200 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 541 - 2288 # - 18120 #^2 + 992 #^3 + 23744 #^4 + 1088 #^5 - 6720 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-101519 - 102476 # + 314440 #^2 + 31616 #^3 - 153216 #^4 + 12736 #^5 + 16960 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 1 - 388 # - 204 #^2 + 20496 #^3 + 33984 #^4 - 8512 #^5 - 9856 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[1 - 24 # - 376 #^2 - 588 #^3 - 106 #^4 + 144 #^5 + 16 #^6 - 12 #^7 + #^8& , 8, 0], Root[ 661 - 29272 # + 77288 #^2 - 67744 #^3 + 11200 #^4 + 12736 #^5 - 4672 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[150421 - 492824 # + 108460 #^2 + 360704 #^3 - 131136 #^4 - 46016 #^5 + 29440 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-179 - 316 # + 2540 #^2 + 3776 #^3 - 6576 #^4 - 13824 #^5 - 6720 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-5039 - 17324 # + 57644 #^2 + 58432 #^3 - 69936 #^4 - 20736 #^5 + 21696 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 1 - 12 # - 252 #^2 + 896 #^3 + 7360 #^4 - 384 #^5 - 4352 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[4861 + 63456 # + 85664 #^2 - 159648 #^3 - 68896 #^4 + 46464 #^5 + 3136 #^6 - 3072 #^7 + 256 #^8& , 8, 0], Root[ 7381 - 41624 # + 84212 #^2 - 70832 #^3 + 14080 #^4 + 12032 #^5 - 5248 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Root[-23819 - 20676 # + 132244 #^2 + 125568 #^3 - 96016 #^4 - 27264 #^5 + 24896 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-59 - 388 # - 144 #^2 + 2896 #^3 + 3104 #^4 - 5312 #^5 - 5376 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-4679 + 1184 # + 48720 #^2 - 21504 #^3 - 89376 #^4 + 6656 #^5 + 16640 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 181 - 1948 # + 7580 #^2 - 12448 #^3 + 6064 #^4 + 4288 #^5 - 3520 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[47041 + 118904 # - 65776 #^2 - 262672 #^3 - 76896 #^4 + 55296 #^5 + 4416 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Root[ 601 - 7408 # + 24520 #^2 - 28448 #^3 + 6384 #^4 + 7808 #^5 - 3200 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[3121 - 30400 # + 33952 #^2 + 150160 #^3 - 17856 #^4 - 71680 #^5 + 33088 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[-179 - 1816 # + 18000 #^2 + 25456 #^3 - 3376 #^4 - 17984 #^5 - 7680 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-41879 - 9684 # + 165984 #^2 + 39632 #^3 - 106016 #^4 - 2496 #^5 + 19456 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[-239 - 2124 # - 1068 #^2 + 8128 #^3 + 6160 #^4 - 5568 #^5 - 4928 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[121 - 13640 # - 49688 #^2 + 144480 #^3 - 100256 #^4 + 8000 #^5 + 13248 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[40801 + 200780 # + 161052 #^2 - 141280 #^3 - 110256 #^4 + 35840 #^5 + 10688 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 181 + 1736 # - 896 #^2 - 8288 #^3 + 5664 #^4 + 5504 #^5 - 3584 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-14579 + 119044 # - 313680 #^2 + 277216 #^3 - 15936 #^4 - 86144 #^5 + 36800 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[ 61 + 1212 # + 6300 #^2 + 7952 #^3 - 4736 #^4 - 13632 #^5 - 7040 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[2161 + 23484 # + 42860 #^2 - 40384 #^3 - 91536 #^4 + 21056 #^5 + 14400 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 121 + 352 # - 4084 #^2 - 2144 #^3 + 10144 #^4 + 128 #^5 - 4096 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[105361 + 458716 # + 166500 #^2 - 315456 #^3 - 98976 #^4 + 65344 #^5 + 5120 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-59 - 3524 # + 14604 #^2 - 17728 #^3 + 1904 #^4 + 8384 #^5 - 3264 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-20939 - 17840 # + 68068 #^2 + 24240 #^3 - 68096 #^4 + 8960 #^5 + 12672 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[-419 - 6116 # - 1760 #^2 + 11676 #^3 - 416 #^4 - 5344 #^5 + 2280 #^6 - 336 #^7 + 16 #^8& , 8, 0], Root[-59 + 132 # + 1776 #^2 + 16 #^3 - 9056 #^4 - 12672 #^5 - 5696 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[14701 - 13864 # - 193976 #^2 + 452512 #^3 - 285216 #^4 + 35264 #^5 + 16576 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 1 + (25 + 6 15^Rational[1, 2] + 2 (5 (31 + 8 15^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2])}, { Root[-3299 - 2584 # + 98284 #^2 + 10432 #^3 - 194016 #^4 + 38144 #^5 + 15616 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 241 - 524 # - 2648 #^2 + 1088 #^3 + 6240 #^4 + 832 #^5 - 3008 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[54601 - 171560 # + 116932 #^2 + 115440 #^3 - 162896 #^4 + 41600 #^5 + 9408 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[-239 + 2576 # - 8016 #^2 + 5992 #^3 + 3884 #^4 - 6416 #^5 + 2496 #^6 - 352 #^7 + 16 #^8& , 8, 0], Root[ 1861 + 13148 # + 33728 #^2 + 35216 #^3 + 5440 #^4 - 15104 #^5 - 8512 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-5975 - 2600 # + 55800 #^2 + 400 #^3 - 68160 #^4 + 22720 #^5 + 9920 #^6 - 3840 #^7 + 256 #^8& , 8, 0], 0}, { Root[1861 - 23124 # - 56256 #^2 + 104272 #^3 + 50944 #^4 - 101376 #^5 + 39616 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Root[-1619 - 3704 # + 5852 #^2 + 16288 #^3 + 640 #^4 - 13888 #^5 - 7168 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-51419 - 454416 # + 437180 #^2 + 239696 #^3 - 325536 #^4 + 72896 #^5 + 9600 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 61 + 72 # - 640 #^2 - 848 #^3 + 1344 #^4 + 1408 #^5 - 960 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 3500 # - 38012 #^2 + 133200 #^3 - 125696 #^4 + 31040 #^5 + 8832 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-287099 + 122844 # + 541280 #^2 - 230704 #^3 - 212736 #^4 + 73856 #^5 + 8640 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 661 - 8 # - 5444 #^2 + 1376 #^3 + 8064 #^4 + 448 #^5 - 2816 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-8039 - 56688 # + 16556 #^2 + 283856 #^3 - 263856 #^4 + 59648 #^5 + 9024 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 44 #^2 + 176 #^3 + 864 #^4 + 448 #^5 - 896 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Root[42781 - 261096 # + 52540 #^2 + 247776 #^3 - 104416 #^4 - 46464 #^5 + 32000 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[ 421 - 3788 # - 6344 #^2 + 18176 #^3 + 16224 #^4 - 9152 #^5 - 7616 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[270841 - 1098768 # + 1318796 #^2 - 231184 #^3 - 386016 #^4 + 127808 #^5 + 4224 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[-59 - 312 # + 740 #^2 + 2288 #^3 + 144 #^4 - 2368 #^5 - 960 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[1741 + 23856 # + 28104 #^2 - 12028 #^3 - 14216 #^4 + 4944 #^5 + 616 #^6 - 272 #^7 + 16 #^8& , 8, 0], Root[ 361 + 836 # - 9808 #^2 - 2992 #^3 + 12000 #^4 + 1152 #^5 - 3648 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-49619 + 173072 # + 560616 #^2 - 307584 #^3 - 200016 #^4 + 90368 #^5 + 5504 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[-1619 - 12180 # - 21812 #^2 + 5280 #^3 + 19184 #^4 - 960 #^5 - 4288 #^6 + 256 #^8& , 8, 0]}, { Root[279541 - 802884 # + 245964 #^2 + 520672 #^3 - 263696 #^4 - 29376 #^5 + 33856 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Root[ 1 + 16 # - 308 #^2 + 608 #^3 + 2400 #^4 - 3968 #^5 - 5888 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-43259 - 112524 # + 405872 #^2 + 33008 #^3 - 321600 #^4 + 106112 #^5 + 4032 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 181 + 2768 # - 6404 #^2 - 1376 #^3 + 8544 #^4 - 1408 #^5 - 2816 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-43019 - 76196 # + 310480 #^2 + 425616 #^3 - 368096 #^4 + 24896 #^5 + 26880 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[ 61 + 452 # - 1804 #^2 - 1024 #^3 + 5904 #^4 - 192 #^5 - 4416 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[66541 + 816156 # + 343104 #^2 - 790768 #^3 - 218336 #^4 + 135744 #^5 + 4096 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[-1319 - 5552 # + 1668 #^2 + 14656 #^3 + 1200 #^4 - 9344 #^5 - 2752 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-10919 + 1894 # + 64930 #^2 - 2184 #^3 - 32636 #^4 + 6176 #^5 + 1320 #^6 - 336 #^7 + 16 #^8& , 8, 0], Root[ 1 - 68 # + 1080 #^2 - 848 #^3 - 11136 #^4 - 12992 #^5 - 3520 #^6 + 768 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 6.689338311827788}, {0.17281636480318796`, 3.8233129080433472`}, {0.17281636480318796`, 4.823312908043347}, 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2])^Rational[1, 2])^ Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (-1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[1 - 32 # + 168 #^2 + 1456 #^3 - 2624 #^5 - 832 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 1 + 24 # - 680 #^2 + 2736 #^3 - 3616 #^4 + 576 #^5 + 2240 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-59 - 296 # + 92 #^2 + 1792 #^3 + 1200 #^4 - 2112 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 181 - 1368 # + 976 #^2 + 4176 #^3 - 6016 #^4 + 768 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (-1 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Root[ 1 - 6 # - 10 #^2 + 96 #^3 - 136 #^4 - 24 #^5 + 160 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (3 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[750361 - 11524 # - 2045436 #^2 + 1309632 #^3 - 85536 #^4 - 135616 #^5 + 45056 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Root[ 6301 - 1038 # - 29962 #^2 + 24384 #^3 - 1000 #^4 - 4776 #^5 + 1888 #^6 - 288 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-72479 + 675004 # - 1542900 #^2 + 942496 #^3 - 61296 #^4 - 114944 #^5 + 40640 #^6 - 5376 #^7 + 256 #^8& , 7, 0], Root[-39239 + 275208 # - 624920 #^2 + 487248 #^3 - 70816 #^4 - 63168 #^5 + 29120 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[24481 - 19136 # - 1152736 #^2 + 625168 #^3 + 158304 #^4 - 184704 #^5 + 50496 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (36 - (50 - 10 5^Rational[1, 2])^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 2 (6 (53 - 5 5^Rational[1, 2] + 2 (250 + 82 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 3 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (14 + 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (16 + 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 15 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (647 - 41 5^Rational[1, 2] + (30 (985 + 139 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (680 + 2 5^Rational[1, 2] + 30 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 0}, {4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (737 + 49 5^Rational[1, 2] + (38550 + 9570 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 5 + (Rational[1, 2] (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}}, {{0, 5.314726871570336}, { 0.17281636480318796`, 2.448701467785898}, {0.17281636480318796`, 3.448701467785898}, {0.5877852522924731, 4.505709877195389}, { 0.5877852522924731, 6.123743865945284}, {0.672816364803188, 1.5826760640014592`}, {0.672816364803188, 4.314726871570336}, { 0.672816364803188, 6.314726871570336}, {1.0388417685876268`, 2.948701467785898}, {1.172816364803188, 7.1807522753547754`}, { 1.5388417685876268`, 0.08267606400145922}, {1.5388417685876268`, 1.0826760640014592`}, {1.5388417685876268`, 2.0826760640014594`}, {1.5388417685876268`, 3.814726871570336}, { 1.5388417685876268`, 4.814726871570336}, {1.5388417685876268`, 5.814726871570336}, {1.7079723749464848`, 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{76, 72, 79}, {72, 71, 78, 79}, {79, 78, 87, 92, 88}, {71, 75, 78}, {78, 75, 81, 84}, { 104, 101, 108, 111}, {111, 108, 115}, {108, 107, 114, 115}, {98, 93, 97, 107, 108}, {107, 110, 114}, {114, 110, 117, 118}, {100, 103, 110, 107}, {100, 95, 103}, {95, 94, 102, 103}, {103, 102, 112, 116, 113}, {94, 99, 102}, {102, 99, 106, 109}, {65, 56, 55, 64, 69}, {99, 91, 96, 105, 106}}]]}, "\"metabigyrate rhombicosidodecahedron\""], Annotation[#, "metabigyrate rhombicosidodecahedron", "Tooltip"]& ]], {3730.9090909090914`, -2952.}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}]}, {InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{0, Rational[7, 2] + 3^Rational[1, 2]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, {( 2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[ 3, 2]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 1}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 4 + 3^Rational[1, 2]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { 1 + 3^Rational[1, 2], Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (35 + 12 3^Rational[1, 2] + 5^Rational[1, 2] + (15 - 6 5^Rational[1, 2])^ Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[ 1, 32] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] - ( 30 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (66 + 24 3^Rational[1, 2] - 2 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 3 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[860161 + 1729568 # + 373640 #^2 - 584272 #^3 - 124416 #^4 + 69312 #^5 + 4800 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Root[559261 + 1519400 # + 832668 #^2 - 376960 #^3 - 207696 #^4 + 56000 #^5 + 11072 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[1101721 + 1554448 # + 177636 #^2 - 510336 #^3 - 115776 #^4 + 60352 #^5 + 7424 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[12457681 + 32379232 # + 12890616 #^2 - 3016784 #^3 - 1199616 #^4 + 217408 #^5 + 19904 #^6 - 5376 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (97 + 17 5^Rational[1, 2] - (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] ( 7 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[-213599 + 17889440 # + 15366908 #^2 - 136000 #^3 - 1643856 #^4 + 127680 #^5 + 40512 #^6 - 6400 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (43 + 11 5^Rational[1, 2] - (6 (85 + 31 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { Root[22048321 + 32720432 # + 10926600 #^2 - 2745248 #^3 - 1145296 #^4 + 185728 #^5 + 24960 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 12 + (30 (3 + 5^Rational[1, 2]))^Rational[1, 2])}, { Root[42522481 + 48286612 # + 11008748 #^2 - 3872096 #^3 - 1110240 #^4 + 189504 #^5 + 27648 #^6 - 5888 #^7 + 256 #^8& , 7, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]) + 2 (25 + 9 3^Rational[1, 2] - 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Root[35973421 + 42110464 # + 10272132 #^2 - 3547328 #^3 - 1161840 #^4 + 173248 #^5 + 32192 #^6 - 6144 #^7 + 256 #^8& , 7, 0], Rational[1, 16] (50 + 16 3^Rational[1, 2] - 2 5^Rational[1, 2] + 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[22304101 + 31759888 # + 10212060 #^2 - 2571712 #^3 - 1096336 #^4 + 156992 #^5 + 29760 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 9 3^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[19745461 + 27997328 # + 9030516 #^2 - 2378176 #^3 - 1089216 #^4 + 135872 #^5 + 34304 #^6 - 6144 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (68 + 26 5^Rational[1, 2] + 2 (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[2812801 + 13871728 # + 12359336 #^2 + 1215664 #^3 - 1331136 #^4 - 53568 #^5 + 64704 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 3 3^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[-11225399 + 14461784 # + 18361732 #^2 + 950992 #^3 - 1790400 #^4 + 23168 #^5 + 61312 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]) - 2 (-25 - 3 3^Rational[1, 2] + 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Root[7049025 + 18289800 # + 14134500 #^2 + 1393200 #^3 - 1620720 #^4 - 37440 #^5 + 68160 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (46 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[20671081 + 26930368 # + 6702360 #^2 - 3041872 #^3 - 946816 #^4 + 168512 #^5 + 27840 #^6 - 5888 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (77 + 19 5^Rational[1, 2] + (6 (785 + 349 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (42 + 8 3^Rational[1, 2] - 10 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[8283901 + 18383888 # + 11436020 #^2 + 220448 #^3 - 1262976 #^4 - 5568 #^5 + 57600 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Root[3510121 + 21639892 # + 15704368 #^2 - 362656 #^3 - 1624800 #^4 + 66304 #^5 + 54208 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[ 885481 + 1400208 # + 443696 #^2 - 161376 #^3 - 63256 #^4 + 9792 #^5 + 1984 #^6 - 384 #^7 + 16 #^8& , 8, 0], Rational[1, 2] ( 6 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[5175661 + 13965808 # + 10269116 #^2 + 596704 #^3 - 1240656 #^4 - 36288 #^5 + 62784 #^6 - 7424 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (23 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[4995961 + 13916048 # + 9292080 #^2 - 259392 #^3 - 1256736 #^4 + 27392 #^5 + 55040 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (38 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[75148861 + 91060364 # + 26236484 #^2 - 4634752 #^3 - 2056416 #^4 + 200256 #^5 + 47616 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 14 + (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-19124879 + 13205792 # + 16905908 #^2 - 541216 #^3 - 1763760 #^4 + 106944 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[16289701 + 38249788 # + 17808320 #^2 - 1779152 #^3 - 1689776 #^4 + 112832 #^5 + 51200 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 760321 - 2770508 # + 4124016 #^2 - 3282384 #^3 + 1534224 #^4 - 433472 #^5 + 72704 #^6 - 6656 #^7 + 256 #^8& , 4, 0]}, { Root[46339801 + 62400964 # + 20757544 #^2 - 3104992 #^3 - 1805376 #^4 + 150976 #^5 + 49216 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1321321 - 4395268 # + 5964180 #^2 - 4353088 #^3 + 1883664 #^4 - 498112 #^5 + 79040 #^6 - 6912 #^7 + 256 #^8& , 4, 0]}, { Root[7761301 + 21299724 # + 13454592 #^2 - 96688 #^3 - 1470560 #^4 + 22848 #^5 + 59392 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 6 3^Rational[1, 2] + 2 5^Rational[1, 2] - 2 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 3 + 3^Rational[1, 2] + 5^Rational[1, 2] - 15^ Rational[1, 2]))}, { Root[12106981 + 22506792 # + 11064908 #^2 - 1088416 #^3 - 1389360 #^4 + 80384 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (2 + 3^Rational[1, 2] + 2 5^Rational[1, 2] - 15^Rational[1, 2]))}}, {{0, 5.232050807568877}, { 0.17281636480318796`, 2.3660254037844384`}, { 0.17281636480318796`, 3.3660254037844384`}, {0.5877852522924731, 4.42303381319393}, {0.5877852522924731, 6.041067801943825}, { 0.672816364803188, 1.5}, {0.672816364803188, 4.232050807568877}, {0.672816364803188, 6.232050807568877}, { 1.172816364803188, 2.3660254037844384`}, {1.172816364803188, 3.3660254037844384`}, {1.172816364803188, 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(1 + 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), 0}, {1 + Rational[3, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[296521 - 320880 # - 683232 #^2 + 830000 #^3 - 157376 #^4 - 76800 #^5 + 35392 #^6 - 5120 #^7 + 256 #^8& , 5, 0], Root[-19139 + 49712 # - 19504 #^2 - 37264 #^3 + 26064 #^4 + 5568 #^5 - 5376 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 4] (-(15 - 6 5^Rational[1, 2])^Rational[1, 2] + 5 (2 + 5^Rational[1, 2])), Rational[ 1, 4] (77 + 29 5^Rational[1, 2] - (6 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Root[-138119 - 594132 # + 1117060 #^2 + 492768 #^3 - 398416 #^4 + 18432 #^5 + 23360 #^6 - 4608 #^7 + 256 #^8& , 5, 0], Root[-239 + 2092 # - 2384 #^2 - 5104 #^3 + 6624 #^4 + 2368 #^5 - 2816 #^6 - 256 #^7 + 256 #^8& , 6, 0]}, { Root[-10919 + 335600 # + 619948 #^2 + 42240 #^3 - 218336 #^4 + 27520 #^5 + 14592 #^6 - 3840 #^7 + 256 #^8& , 7, 0], Root[ 661 + 2372 # - 9024 #^2 - 4544 #^3 + 17024 #^4 + 1408 #^5 - 4416 #^6 - 256 #^7 + 256 #^8& , 6, 0]}, { Root[-43259 - 138072 # + 210996 #^2 + 502384 #^3 - 214496 #^4 - 38208 #^5 + 29824 #^6 - 4864 #^7 + 256 #^8& , 7, 0], Root[-239 + 1856 # + 2652 #^2 - 13712 #^3 + 8240 #^4 + 4672 #^5 - 3648 #^6 - 256 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[-36539 + 390980 # + 578212 #^2 - 86640 #^3 - 176576 #^4 + 26560 #^5 + 14208 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 61 - 1948 # + 7260 #^2 + 21872 #^3 + 3984 #^4 - 11392 #^5 - 3520 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 64] ((-2) (50 + 22 5^Rational[1, 2])^Rational[1, 2] + 8 (19 + 3 3^Rational[1, 2] + 11 5^Rational[1, 2] + 15^Rational[1, 2]) + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-5 - 4 3^Rational[1, 2] + 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 241 - 892 # - 3192 #^2 + 5216 #^3 + 6240 #^4 - 5824 #^5 - 2752 #^6 + 768 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (20 + 3^Rational[1, 2] + 12 5^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[1861 + 9188 # - 21944 #^2 - 2336 #^3 + 20784 #^4 - 3328 #^5 - 4736 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (19 + 3^Rational[1, 2] + 11 5^Rational[1, 2] + 15^Rational[1, 2])), Root[ 3061 + 2764 # - 13408 #^2 - 3008 #^3 + 14400 #^4 - 1152 #^5 - 3648 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[52501 - 300436 # - 185996 #^2 + 452368 #^3 + 56064 #^4 - 153664 #^5 + 48256 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Root[ 61 - 1948 # + 7260 #^2 + 21872 #^3 + 3984 #^4 - 11392 #^5 - 3520 #^6 + 768 #^7 + 256 #^8& , 6, 0]}, { Root[-10919 - 29580 # + 46992 #^2 + 148640 #^3 - 5216 #^4 - 84480 #^5 + 35008 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 1 - 38 # + 10 #^2 + 432 #^3 + 124 #^4 - 352 #^5 - 120 #^6 + 48 #^7 + 16 #^8& , 6, 0]}, { Rational[ 1, 64] ((-6) (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + ((3 + 4 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] + 8 (19 + 2 3^Rational[1, 2] + 11 5^Rational[1, 2] + 2 15^Rational[1, 2])), Rational[1, 4] (-1 - 5^ Rational[1, 2] + (50 + 22 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (21 + 3^Rational[1, 2] + 13 5^Rational[1, 2] + 15^Rational[1, 2])), Root[-719 + 15424 # - 50208 #^2 - 7408 #^3 + 34400 #^4 - 1792 #^5 - 5568 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] ( 6 (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + ((4 + 5 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] + 8 (20 + 3^Rational[1, 2] + 12 5^Rational[1, 2] + 15^Rational[1, 2])), Root[ 1 - 92 # - 324 #^2 + 524 #^3 + 704 #^4 - 208 #^5 - 216 #^6 + 16 #^7 + 16 #^8& , 8, 0]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[-3599 - 48760 # + 8732 #^2 + 192560 #^3 - 16256 #^4 - 81920 #^5 + 34688 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 421 + 948 # - 2760 #^2 - 2672 #^3 + 7264 #^4 - 1728 #^5 - 2240 #^6 + 512 #^7 + 256 #^8& , 5, 0]}, { Root[31741 - 144320 # + 72232 #^2 + 46480 #^3 - 26756 #^4 - 320 #^5 + 1888 #^6 - 320 #^7 + 16 #^8& , 8, 0], Root[ 241 + 1508 # - 4080 #^2 - 2672 #^3 + 9344 #^4 - 2048 #^5 - 2880 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[111861 + 615924 # + 701244 #^2 - 22032 #^3 - 226656 #^4 + 9216 #^5 + 22656 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-1439 + 14228 # - 21000 #^2 - 17072 #^3 + 29024 #^4 - 3008 #^5 - 4800 #^6 + 512 #^7 + 256 #^8& , 7, 0]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 17 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 21 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 11 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2] + 3 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (17 + 11 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (39 + 25 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (47 + 5^Rational[1, 2] + (750 + 246 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + 3 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (17 - 5^ Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (97 + 7 5^Rational[1, 2] + (1830 + 654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 13 5^Rational[1, 2]), Rational[ 1, 4] (617 + 271 5^Rational[1, 2] + 7 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (37 - 13 5^Rational[1, 2] + (150 - 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (557 + 227 5^Rational[1, 2] + (16710 + 7374 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 27 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (598 + 254 5^Rational[1, 2] + 4 (6 (745 + 331 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (19 + 15 5^Rational[1, 2]), Rational[ 1, 4] (427 + 181 5^Rational[1, 2] + (6 (2165 + 961 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 7 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (48 - 3^Rational[1, 2] + 28 5^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2]), Root[-76679 - 603508 # - 746224 #^2 + 236816 #^3 + 415584 #^4 - 192 #^5 - 20736 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-47 + 3^Rational[1, 2] - 27 5^Rational[1, 2] + 15^Rational[1, 2])), Root[ 19441 - 368096 # - 756020 #^2 + 260336 #^3 + 461424 #^4 - 4544 #^5 - 23360 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] (((4 + 5 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 ((6 (85 + 31 5^Rational[1, 2]))^Rational[1, 2] + 4 (-48 + 3^Rational[1, 2] - 30 5^Rational[1, 2] + 15^Rational[1, 2]))), Root[-2151239 - 4950268 # - 2850964 #^2 + 472256 #^3 + 552384 #^4 - 6912 #^5 - 24576 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (37 - 13 5^Rational[1, 2] + (150 - 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[7, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[ 1, 16] (((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2])) ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2] - 2 (-49 + 3^Rational[1, 2] - 29 5^Rational[1, 2] + 15^Rational[1, 2])), Root[-396479 - 1371736 # - 1099860 #^2 + 238336 #^3 + 358064 #^4 - 4544 #^5 - 20160 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, {Root[ 152722621 + 349563384 # + 222695504 #^2 + 23475648 #^3 - 9049696 #^4 - 441984 #^5 + 184576 #^6 - 12288 #^7 + 256 #^8& , 7, 0], Root[ 10321 - 275228 # - 2178540 #^2 - 210288 #^3 + 508464 #^4 + 7168 #^5 - 24640 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] (360 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (17 - 5^ Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (97 + 7 5^Rational[1, 2] + (1830 + 654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[5, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[25, 4] + Rational[5, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 29 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), (Rational[77, 4] + 8 5^Rational[1, 2] + Rational[1, 2] (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (24 + 14 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (47 + 5^Rational[1, 2] + (750 + 246 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 6 + 4 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 64] (392 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 135181 - 6464 # - 656796 #^2 - 221568 #^3 + 317184 #^4 + 7744 #^5 - 20224 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 64] (424 - 16 3^Rational[1, 2] + 232 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 5 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2])), Root[ 68041 + 414172 # - 505980 #^2 - 190848 #^3 + 275424 #^4 - 3392 #^5 - 21760 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (49 + 31 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[15, 2] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 32] ((50 - 10 5^Rational[1, 2])^Rational[1, 2] + 3 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 4 (49 + 3^Rational[1, 2] + 29 5^Rational[1, 2] + 15^Rational[1, 2]) + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + 2 15^Rational[1, 2])), Root[-80459 - 645704 # - 1002420 #^2 - 27136 #^3 + 359024 #^4 - 14656 #^5 - 20160 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 17 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[-1186799 + 37554308 # + 117848860 #^2 + 30868848 #^3 - 6365456 #^4 - 742208 #^5 + 192960 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[ 589321 - 237292 # - 1460624 #^2 - 31376 #^3 + 350304 #^4 - 10048 #^5 - 18176 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 64] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (1 - 4 3^Rational[1, 2] + 3 5^Rational[1, 2] + 4 15^Rational[1, 2]) + 2 (196 + 8 3^Rational[1, 2] + 116 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^ Rational[1, 2])), Root[-40199 - 672256 # - 522876 #^2 + 380928 #^3 + 259584 #^4 - 53824 #^5 - 20224 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (27 + 17 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[3384001 + 84410704 # + 112475844 #^2 + 36113888 #^3 - 3680656 #^4 - 1456384 #^5 + 246336 #^6 - 13568 #^7 + 256 #^8& , 8, 0], Root[ 141541 - 102412 # - 403980 #^2 + 296448 #^3 + 184224 #^4 - 69568 #^5 - 21760 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[2612461 + 7491790 # + 6452642 #^2 + 1599520 #^3 - 240336 #^4 - 69480 #^5 + 13488 #^6 - 800 #^7 + 16 #^8& , 8, 0], Root[-666599 - 2359672 # - 1745640 #^2 + 762288 #^3 + 432864 #^4 - 67648 #^5 - 24640 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, {Root[ 31027861 + 163898340 # + 200320748 #^2 + 35730400 #^3 - 8861136 #^4 - 699200 #^5 + 205632 #^6 - 12800 #^7 + 256 #^8& , 8, 0], Root[ 35521 - 128192 # - 718624 #^2 - 176816 #^3 + 416784 #^4 - 9408 #^5 - 20736 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[306575401 + 458664888 # + 213372160 #^2 + 17463408 #^3 - 8219776 #^4 - 471168 #^5 + 184640 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[-106259 - 750852 # - 831924 #^2 + 87104 #^3 + 276544 #^4 - 16128 #^5 - 18176 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 4] (29 + 17 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 17 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Root[302441641 + 461267724 # + 213835664 #^2 + 16996368 #^3 - 8169136 #^4 - 471744 #^5 + 184576 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[-44519 - 654852 # - 443980 #^2 + 361328 #^3 + 184944 #^4 - 53248 #^5 - 18240 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, {Rational[3, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[3, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (59 + 35 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (29 + 19 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}}, {{ 0, 5.3865332128413606`}, {0.30901699437494745`, 4.435476696546207}, {0.30901699437494745`, 6.337589729136514}, { 0.44890338239103666`, 2.688723237140821}, {1.118033988749895, 1.945578411663427}, 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86, 90, 94, 104, 111, 118, 112, 105, 95}, {99, 95, 105}, {77, 75, 76, 81, 91, 95, 98, 96, 92, 82}, {97, 92, 96}, { 83, 86, 91}, {71, 73, 79, 85, 90, 86, 80, 74, 72, 67}, {70, 72, 74}, {87, 94, 90}, {78, 79, 73}, {113, 111, 104}, {138, 136, 133, 124, 118, 111, 117, 123, 132, 135}, {127, 132, 123}, {121, 112, 118}, {137, 133, 136}, {114, 122, 126, 119, 106}, {122, 114, 115, 125}, {122, 125, 130}, {126, 122, 131, 134}, {126, 134, 129}, { 119, 126, 128, 120}, {119, 120, 108}, {106, 119, 107, 102}, {100, 106, 101}, {114, 106, 100, 105}, {114, 105, 112}, {44, 39, 50, 59, 54}, {39, 44, 33, 32}, {39, 32, 37}, {50, 39, 38, 46}, {50, 46, 57}, {59, 50, 58, 64}, {59, 64, 66}, {54, 59, 65, 61}, {53, 54, 60}, {44, 54, 53, 40}, {44, 40, 34}}]]}, "\"parabiaugmented truncated dodecahedron\""], Annotation[#, "parabiaugmented truncated dodecahedron", "Tooltip"]& ]], {1767.2727272727275`, -3345.5999999999995`}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Root[661 - 9920 # + 14908 #^2 + 12160 #^3 - 35456 #^4 + 20800 #^5 - 2048 #^6 - 1280 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[-239 - 1052 # + 6176 #^2 - 1616 #^3 - 15296 #^4 + 15872 #^5 - 3136 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[ 161461 + 92372 # - 196720 #^2 - 85168 #^3 + 73024 #^4 + 18688 #^5 - 9280 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 8 # - 44 #^2 - 176 #^3 + 864 #^4 - 448 #^5 - 896 #^6 + 256 #^7 + 256 #^8& , 5, 0], Root[ 1681 - 3444 # - 10416 #^2 - 1888 #^3 + 5404 #^4 + 1344 #^5 - 704 #^6 - 32 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] 3^Rational[1, 2], Root[-659 + 2372 # + 3316 #^2 - 14224 #^3 + 4384 #^4 + 9728 #^5 - 4736 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[61 - 376 # - 2220 #^2 - 464 #^3 + 4064 #^4 + 1216 #^5 - 1920 #^6 - 256 #^7 + 256 #^8& , 6, 0], Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (23 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[ 81 - 1620 # - 2592 #^2 + 6480 #^3 + 10944 #^4 - 3648 #^6 + 256 #^8& , 7, 0]}, { Rational[ 1, 2] (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Root[ 81 + 648 # - 2052 #^3 + 504 #^4 + 1152 #^5 - 360 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Root[-59 - 164 # + 360 #^2 + 1424 #^3 + 704 #^4 - 1216 #^5 - 960 #^6 + 256 #^7 + 256 #^8& , 7, 0], Root[ 61 + 444 # - 3776 #^2 - 9792 #^3 + 11264 #^4 + 22656 #^5 - 7744 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[11161 + 1372 # - 25004 #^2 - 4144 #^3 + 16464 #^4 + 2368 #^5 - 3776 #^6 - 256 #^7 + 256 #^8& , 6, 0], Root[ 1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0]}, { Rational[ 1, 4] (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[ 1 + 32 # - 160 #^2 - 928 #^3 + 2464 #^4 + 7168 #^5 - 3520 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[181 + 916 # - 516 #^2 - 3568 #^3 + 1904 #^4 + 2624 #^5 - 1344 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[ 61 - 2460 # - 5552 #^2 + 1200 #^3 + 6464 #^4 - 2368 #^6 + 256 #^8& , 8, 0]}, { Root[1 - 16 # - 60 #^2 + 256 #^3 + 944 #^4 + 256 #^5 - 960 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[-12659 + 35184 # - 176 #^2 - 49392 #^3 + 13664 #^4 + 16896 #^5 - 5824 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[3361 + 4488 # - 14480 #^2 - 17952 #^3 + 10304 #^4 + 8832 #^5 - 3520 #^6 - 768 #^7 + 256 #^8& , 7, 0], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[12601 + 13892 # - 23300 #^2 - 14768 #^3 + 13824 #^4 + 4928 #^5 - 3200 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[ 1 - 12 # - 24 #^2 + 44 #^3 + 64 #^4 - 48 #^5 - 56 #^6 + 16 #^7 + 16 #^8& , 7, 0]}, { Root[1 - 4 # - 56 #^2 + 112 #^3 + 864 #^4 + 704 #^5 - 704 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-419 + 2232 # + 720 #^2 - 7168 #^3 + 2464 #^4 + 4608 #^5 - 2240 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[61 + 4 # - 500 #^2 - 64 #^3 + 1344 #^4 + 256 #^5 - 1280 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 6 # - 6 #^2 - 28 #^3 + 19 #^4 + 24 #^5 - 14 #^6 - 2 #^7 + #^8& , 8, 0]}, { Root[1021 + 3736 # - 5296 #^2 - 8288 #^3 + 5664 #^4 + 4224 #^5 - 2304 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-59 + 6352 # - 8804 #^2 - 6784 #^3 + 9024 #^4 + 2368 #^5 - 2816 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 252 # + 20 #^2 - 1088 #^3 + 624 #^4 + 1408 #^5 - 960 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-179 - 940 # + 1908 #^2 + 7520 #^3 + 2544 #^4 - 6400 #^5 - 4288 #^6 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 1 + (33 + 12 5^Rational[1, 2] + 6 (50 + 22 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Root[1 - 28 # - 24 #^2 + 2496 #^3 + 7344 #^4 - 3712 #^5 - 6016 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[601 - 7484 # + 26784 #^2 - 30528 #^3 + 3744 #^4 + 10624 #^5 - 3904 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-59 - 660 # + 248 #^2 + 9600 #^3 + 6464 #^4 - 10560 #^5 - 6848 #^6 + 256 #^8& , 8, 0]}, { Root[3361 - 1548 # - 25732 #^2 - 10656 #^3 + 22400 #^4 + 8064 #^5 - 4352 #^6 - 768 #^7 + 256 #^8& , 7, 0], 0}, { Root[14281 - 8612 # - 37032 #^2 + 176 #^3 + 22880 #^4 + 3776 #^5 - 4032 #^6 - 512 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[14281 - 8612 # - 37032 #^2 + 176 #^3 + 22880 #^4 + 3776 #^5 - 4032 #^6 - 512 #^7 + 256 #^8& , 7, 0], Root[-3599 - 9792 # - 1440 #^2 + 12448 #^3 + 5344 #^4 - 4608 #^5 - 2240 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Root[-59 - 692 # - 2112 #^2 - 144 #^3 + 3600 #^4 + 1216 #^5 - 1792 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 61 - 512 # - 1044 #^2 + 3744 #^3 + 4224 #^4 - 4928 #^5 - 4096 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 3760 # - 4968 #^2 - 15920 #^3 + 20064 #^4 + 1600 #^5 - 4672 #^6 + 256 #^8& , 8, 0], Root[ 1 + 900 # + 6388 #^2 + 8160 #^3 - 9616 #^4 - 21120 #^5 - 8128 #^6 + 256 #^8& , 8, 0]}, { Root[-59 + 3760 # - 4968 #^2 - 15920 #^3 + 20064 #^4 + 1600 #^5 - 4672 #^6 + 256 #^8& , 8, 0], Root[ 961 - 7812 # + 20660 #^2 - 16352 #^3 - 8016 #^4 + 13312 #^5 - 960 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 52 # + 540 #^2 + 2192 #^3 + 3584 #^4 + 1088 #^5 - 1920 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 1 - 12 # + 40 #^2 - 12 #^3 - 136 #^4 + 192 #^5 - 40 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Root[1381 + 232 # - 2500 #^2 - 608 #^3 + 1284 #^4 + 288 #^5 - 240 #^6 - 32 #^7 + 16 #^8& , 8, 0], Root[ 661 - 2828 # - 5180 #^2 + 10032 #^3 + 4384 #^4 - 5632 #^5 - 1920 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[661 - 448 # - 3024 #^2 + 1216 #^3 + 4544 #^4 - 512 #^5 - 2496 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 24 # + 64 #^2 - 912 #^3 - 1696 #^4 + 5376 #^5 - 1984 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[1 - 8 # - 84 #^2 + 976 #^3 - 2976 #^4 + 2368 #^5 + 1664 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 61 - 396 # + 64 #^2 + 3888 #^3 - 8416 #^4 + 6336 #^5 - 1024 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[-599 + 3276 # - 1816 #^2 - 7328 #^3 + 6144 #^4 + 3904 #^5 - 3264 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 1260 #^2 + 272 #^3 + 5264 #^4 - 832 #^5 - 4800 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 52 # - 240 #^2 - 528 #^3 + 2064 #^4 + 448 #^5 - 2560 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-59 + 468 # + 1940 #^2 - 6672 #^3 + 1184 #^4 + 6912 #^5 - 3200 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[61 - 680 # - 1088 #^2 + 4560 #^3 + 5824 #^4 - 4480 #^5 - 4032 #^6 + 256 #^8& , 8, 0], Root[ 61 - 448 # - 1040 #^2 + 4912 #^3 + 3264 #^4 - 7552 #^5 - 6080 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[61 - 680 # - 1088 #^2 + 4560 #^3 + 5824 #^4 - 4480 #^5 - 4032 #^6 + 256 #^8& , 8, 0], Root[ 61 + 12232 # - 2624 #^2 - 46704 #^3 + 25024 #^4 + 15488 #^5 - 6336 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 272 # + 1320 #^2 - 1248 #^3 - 3936 #^4 + 3008 #^5 + 2240 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[ 241 - 1872 # + 4300 #^2 - 912 #^3 - 7696 #^4 + 7872 #^5 - 1600 #^6 - 768 #^7 + 256 #^8& , 6, 0]}, { Root[1681 - 4920 # - 5468 #^2 + 14640 #^3 + 11664 #^4 - 6720 #^5 - 5312 #^6 + 256 #^8& , 8, 0], Root[ 61 + 348 # - 1384 #^2 - 5536 #^3 + 13824 #^4 + 1472 #^5 - 6336 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 24 # - 960 #^2 + 3376 #^3 + 8464 #^4 - 1344 #^5 - 5120 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 16 # + 44 #^2 - 368 #^3 - 2496 #^4 - 5376 #^5 - 4224 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 32 # + 216 #^2 + 256 #^3 - 1696 #^4 - 5312 #^5 - 4416 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[-59 + 384 # + 44 #^2 - 2832 #^3 + 2864 #^4 + 2496 #^5 - 2624 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 8056 # + 16524 #^2 - 53488 #^3 + 20384 #^4 + 16064 #^5 - 8064 #^6 - 512 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (3 + 3^Rational[1, 2] + Root[61 - 222 # - 220 #^2 + 758 #^3 + 714 #^4 - 58 #^5 - 60 #^6 + 2 #^7 + #^8& , 8, 0])}, { Root[1 - 28 # - 384 #^2 - 784 #^3 + 1104 #^4 + 3008 #^5 - 256 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 361 + 2964 # + 404 #^2 - 9552 #^3 + 2144 #^4 + 5376 #^5 - 1664 #^6 - 768 #^7 + 256 #^8& , 6, 0]}, { Root[14101 + 6196 # - 36436 #^2 - 12848 #^3 + 30144 #^4 + 7104 #^5 - 8064 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-1019 - 3872 # + 4576 #^2 + 9264 #^3 - 10736 #^4 - 2368 #^5 + 6144 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[ 14101 + 6196 # - 36436 #^2 - 12848 #^3 + 30144 #^4 + 7104 #^5 - 8064 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[-5279 + 32928 # - 74880 #^2 + 71728 #^3 - 16496 #^4 - 19008 #^5 + 14080 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 968 # - 1620 #^2 + 5072 #^3 + 5984 #^4 - 4672 #^5 - 5760 #^6 - 512 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[-59 - 366 # - 680 #^2 - 234 #^3 + 314 #^4 + 126 #^5 - 40 #^6 - 6 #^7 + #^8& , 8, 0]}, { Root[241 - 968 # - 1620 #^2 + 5072 #^3 + 5984 #^4 - 4672 #^5 - 5760 #^6 - 512 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (5 + 3^Rational[1, 2] + Root[61 - 222 # - 220 #^2 + 758 #^3 + 714 #^4 - 58 #^5 - 60 #^6 + 2 #^7 + #^8& , 8, 0])}, { Root[1 + 32 # + 240 #^2 - 288 #^3 - 2496 #^4 + 3968 #^5 + 320 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[ 61 + 1368 # + 4640 #^2 - 13392 #^3 + 3104 #^4 + 6912 #^5 - 2240 #^6 - 768 #^7 + 256 #^8& , 7, 0]}, { Root[1 - 116 # - 1200 #^2 - 2144 #^3 + 2784 #^4 + 4096 #^5 - 1600 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 61 + 2236 # - 696 #^2 - 8128 #^3 + 5504 #^4 + 4544 #^5 - 3264 #^6 - 512 #^7 + 256 #^8& , 6, 0]}, { Root[121 + 1012 # + 636 #^2 - 5744 #^3 - 576 #^4 + 8128 #^5 - 2176 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 1 - 36 # + 364 #^2 - 732 #^3 + 104 #^4 + 576 #^5 - 184 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Root[121 + 1012 # + 636 #^2 - 5744 #^3 - 576 #^4 + 8128 #^5 - 2176 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 421 - 3576 # + 11672 #^2 - 18988 #^3 + 16800 #^4 - 8272 #^5 + 2232 #^6 - 304 #^7 + 16 #^8& , 8, 0]}, { Root[1 - 224 # + 1884 #^2 + 11792 #^3 + 11744 #^4 - 6976 #^5 - 8064 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 1 - 18 # + 50 #^2 + 152 #^3 - 636 #^4 + 368 #^5 + 120 #^6 - 112 #^7 + 16 #^8& , 8, 0]}, { Root[1 - 224 # + 1884 #^2 + 11792 #^3 + 11744 #^4 - 6976 #^5 - 8064 #^6 - 512 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (4 + 3^Rational[1, 2] + Root[61 - 222 # - 220 #^2 + 758 #^3 + 714 #^4 - 58 #^5 - 60 #^6 + 2 #^7 + #^8& , 8, 0])}, { Root[-179 + 536 # + 864 #^2 - 3408 #^3 + 144 #^4 + 4544 #^5 - 1024 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[ 61 + 1492 # - 3100 #^2 - 6368 #^3 + 6624 #^4 + 5568 #^5 - 3840 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[-419 + 1168 # + 2180 #^2 - 7232 #^3 - 1056 #^4 + 8832 #^5 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 241 - 4188 # + 22168 #^2 - 34656 #^3 + 9200 #^4 + 9984 #^5 - 3712 #^6 - 768 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 2] Root[-59 + 62 # + 855 #^2 - 1318 #^3 + 144 #^4 + 398 #^5 - 70 #^6 - 12 #^7 + #^8& , 8, 0], 1 + Root[61 - 444 # - 880 #^2 + 6064 #^3 + 11424 #^4 - 1856 #^5 - 3840 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[-59 + 62 # + 855 #^2 - 1318 #^3 + 144 #^4 + 398 #^5 - 70 #^6 - 12 #^7 + #^8& , 8, 0], Root[ 25 + 900 # - 800 #^2 - 18000 #^3 + 51680 #^4 - 48960 #^5 + 20480 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 100 # + 2208 #^2 + 13200 #^3 + 21984 #^4 + 6400 #^5 - 6208 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Root[ 81 + 324 # - 2376 #^2 - 4752 #^3 + 13824 #^4 + 6336 #^5 - 3264 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[1741 - 7720 # + 3692 #^2 + 24080 #^3 - 38496 #^4 + 16320 #^5 + 2688 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 1 - 18 # + 50 #^2 + 152 #^3 - 636 #^4 + 368 #^5 + 120 #^6 - 112 #^7 + 16 #^8& , 8, 0]}, { Root[1741 - 7720 # + 3692 #^2 + 24080 #^3 - 38496 #^4 + 16320 #^5 + 2688 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (4 + 3^Rational[1, 2] + Root[61 - 222 # - 220 #^2 + 758 #^3 + 714 #^4 - 58 #^5 - 60 #^6 + 2 #^7 + #^8& , 8, 0])}, { Root[-59 - 192 # + 2516 #^2 - 2496 #^3 - 10576 #^4 + 16512 #^5 + 64 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-4779 + 7128 # + 25380 #^2 - 54432 #^3 + 18864 #^4 + 12672 #^5 - 4800 #^6 - 768 #^7 + 256 #^8& , 7, 0]}, { Root[1262461 + 1065092 # - 814140 #^2 - 473888 #^3 + 148304 #^4 + 56128 #^5 - 10560 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[-479 - 1188 # + 8900 #^2 - 5728 #^3 - 10416 #^4 + 8768 #^5 + 960 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[22861 + 54004 # - 57780 #^2 - 76784 #^3 + 43584 #^4 + 24256 #^5 - 8320 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 61 + 480 # + 1232 #^2 + 980 #^3 - 336 #^4 - 640 #^5 - 72 #^6 + 80 #^7 + 16 #^8& , 8, 0]}, { Root[22861 + 54004 # - 57780 #^2 - 76784 #^3 + 43584 #^4 + 24256 #^5 - 8320 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Root[ 1 - 36 # + 364 #^2 - 732 #^3 + 104 #^4 + 576 #^5 - 184 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Root[592981 + 1468972 # + 40376 #^2 - 608144 #^3 - 22656 #^4 + 76608 #^5 - 2496 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 421 + 2028 # - 16192 #^2 + 34256 #^3 - 31200 #^4 + 10496 #^5 + 1728 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-7139 + 41360 # + 85772 #^2 - 86320 #^3 - 40416 #^4 + 39360 #^5 - 1152 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[661 + 2970 # - 7312 #^2 + 3190 #^3 + 954 #^4 - 410 #^5 - 48 #^6 + 10 #^7 + #^8& , 7, 0]}, { Root[-7139 + 41360 # + 85772 #^2 - 86320 #^3 - 40416 #^4 + 39360 #^5 - 1152 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[-59 - 366 # - 680 #^2 - 234 #^3 + 314 #^4 + 126 #^5 - 40 #^6 - 6 #^7 + #^8& , 8, 0]}, { Root[874501 + 952348 # - 395100 #^2 - 487392 #^3 + 80064 #^4 + 70912 #^5 - 10240 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 5701 - 25164 # + 37784 #^2 - 14848 #^3 - 14736 #^4 + 13184 #^5 - 384 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-190259 + 1585976 # + 74560 #^2 - 918096 #^3 + 112144 #^4 + 101824 #^5 - 11520 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 61 + 2704 # + 4484 #^2 - 7232 #^3 - 8256 #^4 + 8256 #^5 + 1536 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Root[661 - 76724 # + 106140 #^2 + 89744 #^3 - 130816 #^4 + 27584 #^5 + 9600 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 61 + 480 # + 1232 #^2 + 980 #^3 - 336 #^4 - 640 #^5 - 72 #^6 + 80 #^7 + 16 #^8& , 8, 0]}, { Root[661 - 76724 # + 106140 #^2 + 89744 #^3 - 130816 #^4 + 27584 #^5 + 9600 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 1 - 36 # + 364 #^2 - 732 #^3 + 104 #^4 + 576 #^5 - 184 #^6 - 48 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] Root[663661 + 546220 # - 28753 #^2 - 65150 #^3 + 1554 #^4 + 2310 #^5 - 102 #^6 - 20 #^7 + #^8& , 8, 0], Root[ 1 - 66 # + 850 #^2 + 1176 #^3 - 1396 #^4 - 864 #^5 + 200 #^6 + 144 #^7 + 16 #^8& , 7, 0]}, { Rational[1, 2] Root[663661 + 546220 # - 28753 #^2 - 65150 #^3 + 1554 #^4 + 2310 #^5 - 102 #^6 - 20 #^7 + #^8& , 8, 0], Root[ 1 - 18 # + 50 #^2 + 152 #^3 - 636 #^4 + 368 #^5 + 120 #^6 - 112 #^7 + 16 #^8& , 8, 0]}, { Root[-923999 + 1404060 # + 411032 #^2 - 966880 #^3 - 4416 #^4 + 130880 #^5 - 11712 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[-5519 + 9348 # + 14640 #^2 - 24832 #^3 - 6176 #^4 + 14592 #^5 - 320 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Root[150901 + 505808 # + 66216 #^2 - 557056 #^3 + 81504 #^4 + 84032 #^5 - 10816 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 661 - 10264 # + 27144 #^2 - 13008 #^3 - 16896 #^4 + 14144 #^5 - 64 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[153001 + 414074 # + 151839 #^2 - 46982 #^3 - 10756 #^4 + 2446 #^5 + 66 #^6 - 28 #^7 + #^8& , 8, 0], -1 + Root[61 - 444 # - 880 #^2 + 6064 #^3 + 11424 #^4 - 1856 #^5 - 3840 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[153001 + 414074 # + 151839 #^2 - 46982 #^3 - 10756 #^4 + 2446 #^5 + 66 #^6 - 28 #^7 + #^8& , 8, 0], 1 + Root[61 - 444 # - 880 #^2 + 6064 #^3 + 11424 #^4 - 1856 #^5 - 3840 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-18719 - 21984 # + 122220 #^2 - 21616 #^3 - 71456 #^4 + 22464 #^5 + 8320 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 241 + 976 # - 6896 #^2 + 5712 #^3 + 7504 #^4 - 5056 #^5 - 2304 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-18719 - 21984 # + 122220 #^2 - 21616 #^3 - 71456 #^4 + 22464 #^5 + 8320 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-59 - 816 # - 2160 #^2 + 6736 #^3 + 17104 #^4 + 4416 #^5 - 5120 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[-8999 + 186020 # + 206688 #^2 - 489360 #^3 - 31536 #^4 + 109760 #^5 - 11008 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 6121 - 40728 # + 80660 #^2 - 47728 #^3 - 15936 #^4 + 21248 #^5 - 1920 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[4441 + 19556 # + 9980 #^2 - 38896 #^3 - 24896 #^4 + 21184 #^5 + 7040 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 61 - 444 # - 880 #^2 + 6064 #^3 + 11424 #^4 - 1856 #^5 - 3840 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Root[-129599 - 433200 # + 1283408 #^2 - 441120 #^3 - 222976 #^4 + 94080 #^5 + 4672 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 14341 - 65668 # + 88380 #^2 - 22608 #^3 - 32496 #^4 + 19328 #^5 + 320 #^6 - 1792 #^7 + 256 #^8& , 7, 0]}, { Root[-410759 + 355800 # + 1423712 #^2 - 711120 #^3 - 188656 #^4 + 104640 #^5 + 3328 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[-659 - 39812 # + 55820 #^2 + 11728 #^3 - 47136 #^4 + 18432 #^5 + 1920 #^6 - 2048 #^7 + 256 #^8& , 7, 0]}, { Root[1052341 - 5351716 # + 4887860 #^2 - 845104 #^3 - 472656 #^4 + 143616 #^5 + 4800 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[-839 - 7716 # + 28880 #^2 - 21504 #^3 - 10336 #^4 + 13056 #^5 - 320 #^6 - 1536 #^7 + 256 #^8& , 5, 0]}, { Root[-149579 + 653648 # - 42864 #^2 - 590656 #^3 + 54144 #^4 + 108032 #^5 - 16576 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-3599 + 7196 # + 15564 #^2 - 36048 #^3 + 3024 #^4 + 17024 #^5 - 1984 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-928619 + 56864 # + 1645800 #^2 - 715184 #^3 - 262816 #^4 + 116416 #^5 + 4800 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[-2819 + 20456 # - 1320 #^2 - 33776 #^3 + 8864 #^4 + 11584 #^5 - 2880 #^6 - 1024 #^7 + 256 #^8& , 4, 0]}, { Root[-928619 + 56864 # + 1645800 #^2 - 715184 #^3 - 262816 #^4 + 116416 #^5 + 4800 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 3481 - 17936 # + 21624 #^2 + 11888 #^3 - 33376 #^4 + 13376 #^5 + 2496 #^6 - 2048 #^7 + 256 #^8& , 6, 0]}, { Root[-1538039 + 485908 # + 1338896 #^2 - 641936 #^3 - 163056 #^4 + 107712 #^5 - 1536 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 61 - 12264 # + 48164 #^2 - 41968 #^3 - 14016 #^4 + 18944 #^5 - 384 #^6 - 1792 #^7 + 256 #^8& , 7, 0]}, { Root[-2530259 + 1743436 # + 1327920 #^2 - 1006816 #^3 - 88096 #^4 + 114944 #^5 - 2880 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-2399 - 156 # + 40164 #^2 - 36112 #^3 - 19856 #^4 + 16896 #^5 + 1216 #^6 - 2048 #^7 + 256 #^8& , 7, 0]}, { Root[-105359 + 696020 # + 482588 #^2 - 929200 #^3 + 94464 #^4 + 129600 #^5 - 18048 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 3481 + 44132 # - 41280 #^2 - 66768 #^3 + 18144 #^4 + 22208 #^5 - 2560 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-1706039 + 252480 # + 1548728 #^2 - 444000 #^3 - 325216 #^4 + 135360 #^5 - 1088 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 241 - 22888 # + 72840 #^2 - 63888 #^3 - 7296 #^4 + 24128 #^5 - 1600 #^6 - 1792 #^7 + 256 #^8& , 7, 0]}, { Root[-214979 - 487112 # + 1840956 #^2 - 755056 #^3 - 284896 #^4 + 168512 #^5 - 7296 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-3359 + 5426 # + 3294 #^2 - 7368 #^3 + 324 #^4 + 1904 #^5 - 184 #^6 - 112 #^7 + 16 #^8& , 8, 0]}, { Root[-9539 - 19576 # + 504560 #^2 - 779824 #^3 - 131136 #^4 + 109056 #^5 + 2880 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[-419 + 3736 # - 3756 #^2 - 13248 #^3 + 15504 #^4 + 5824 #^5 - 3904 #^6 - 512 #^7 + 256 #^8& , 5, 0]}, { Root[-9539 - 19576 # + 504560 #^2 - 779824 #^3 - 131136 #^4 + 109056 #^5 + 2880 #^6 - 4096 #^7 + 256 #^8& , 8, 0], Root[ 11881 - 43600 # + 30132 #^2 + 28800 #^3 - 36336 #^4 + 4160 #^5 + 6848 #^6 - 2560 #^7 + 256 #^8& , 5, 0]}, { Root[-5129819 + 6140044 # + 1950272 #^2 - 2049488 #^3 - 59760 #^4 + 170688 #^5 - 8448 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 22021 - 79116 # + 67340 #^2 + 30016 #^3 - 53856 #^4 + 8896 #^5 + 7680 #^6 - 2816 #^7 + 256 #^8& , 7, 0]}, { Root[-251519 + 534436 # + 290120 #^2 - 737216 #^3 - 12096 #^4 + 103104 #^5 - 4800 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-31379 - 23340 # + 82352 #^2 + 1280 #^3 - 48096 #^4 + 12800 #^5 + 5568 #^6 - 2560 #^7 + 256 #^8& , 6, 0]}, { Root[-832199 + 1822816 # + 354860 #^2 - 893456 #^3 + 7104 #^4 + 113664 #^5 - 5760 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[ 181 + 3516 # + 7480 #^2 - 9216 #^3 - 11536 #^4 + 8064 #^5 + 3200 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Root[-102359 + 1805728 # + 993396 #^2 - 1178656 #^3 - 48496 #^4 + 137792 #^5 - 8256 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-179 - 11520 # + 34212 #^2 - 7520 #^3 - 38576 #^4 + 16320 #^5 + 4288 #^6 - 2560 #^7 + 256 #^8& , 7, 0]}, { Root[-740099 + 87840 # + 985772 #^2 - 313920 #^3 - 298336 #^4 + 144000 #^5 - 4352 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 1 - 32 # - 640 #^2 - 1952 #^3 + 264 #^4 + 1152 #^5 - 128 #^7 + 16 #^8& , 7, 0]}, { Root[-217739 - 103004 # + 794960 #^2 - 399536 #^3 - 238656 #^4 + 173184 #^5 - 10560 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-599 - 16016 # - 83256 #^2 - 76192 #^3 + 16064 #^4 + 26816 #^5 - 1344 #^6 - 2048 #^7 + 256 #^8& , 7, 0]}}, {{ 0, 3.240267456587094}, {0.20791169081775937`, 4.218415057320896}, {0.20791169081775937`, 4.427471983856199}, { 0.312440154085414, 5.42199387922448}, {0.8660254037844386, 2.7402674565870857`}, {0.9168565137017064, 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5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (-1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[1 - 32 # + 168 #^2 + 1456 #^3 - 2624 #^5 - 832 #^6 + 768 #^7 + 256 #^8& , 8, 0], Root[ 1 + 24 # - 680 #^2 + 2736 #^3 - 3616 #^4 + 576 #^5 + 2240 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-59 - 296 # + 92 #^2 + 1792 #^3 + 1200 #^4 - 2112 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 181 - 1368 # + 976 #^2 + 4176 #^3 - 6016 #^4 + 768 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (-1 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Root[ 1 - 6 # - 10 #^2 + 96 #^3 - 136 #^4 - 24 #^5 + 160 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (3 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-22259 + 478240 # - 1106488 #^2 + 161680 #^3 + 446464 #^4 - 262720 #^5 + 60608 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), 3 + (Rational[3, 2] (7 + 5^Rational[1, 2] + 3 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-238739 + 1171904 # - 1679896 #^2 + 703088 #^3 + 133504 #^4 - 177344 #^5 + 49856 #^6 - 5888 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 2 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[1060525 - 10687500 # - 2160700 #^2 + 5198400 #^3 - 755680 #^4 - 254400 #^5 + 79360 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Root[ 6301 - 1038 # - 29962 #^2 + 24384 #^3 - 1000 #^4 - 4776 #^5 + 1888 #^6 - 288 #^7 + 16 #^8& , 8, 0]}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-739259 - 3243836 # - 1013268 #^2 + 3898592 #^3 - 674800 #^4 - 214912 #^5 + 73152 #^6 - 7424 #^7 + 256 #^8& , 7, 0], Root[-39239 + 275208 # - 624920 #^2 + 487248 #^3 - 70816 #^4 - 63168 #^5 + 29120 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, {3 + ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[-3267479 - 7442944 # - 962448 #^2 + 3797008 #^3 - 282400 #^4 - 336128 #^5 + 86592 #^6 - 7936 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (36 - (50 - 10 5^Rational[1, 2])^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2] + 2 (6 (53 - 5 5^Rational[1, 2] + 2 (250 + 82 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 9 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 4 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (647 - 41 5^Rational[1, 2] + (30 (985 + 139 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (680 + 2 5^Rational[1, 2] + 30 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 0}, {4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (737 + 49 5^Rational[1, 2] + (38550 + 9570 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 5 + (Rational[1, 2] (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}}, {{0, 5.314726871570336}, { 0.17281636480318796`, 2.448701467785898}, {0.17281636480318796`, 3.448701467785898}, {0.5877852522924731, 4.505709877195389}, { 0.5877852522924731, 6.123743865945284}, {0.672816364803188, 1.5826760640014592`}, {0.672816364803188, 4.314726871570336}, { 0.672816364803188, 6.314726871570336}, {1.0388417685876268`, 2.948701467785898}, {1.172816364803188, 7.1807522753547754`}, { 1.5388417685876268`, 0.08267606400145922}, {1.5388417685876268`, 1.0826760640014592`}, {1.5388417685876268`, 2.0826760640014594`}, {1.5388417685876268`, 3.814726871570336}, { 1.5388417685876268`, 4.814726871570336}, {1.5388417685876268`, 5.814726871570336}, {1.7079723749464848`, 3.6918462932632927`}, { 2.038841768587627, 6.6807522753547754`}, {2.5169893693214327`, 2.2905877548192133`}, {2.538841768587627, 0.08267606400145922}, { 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108}, {107, 110, 114}, {114, 110, 117, 118}, {100, 103, 110, 107}, {100, 95, 103}, {95, 94, 102, 103}, {103, 102, 112, 116, 113}, {94, 99, 102}, {102, 99, 106, 109}, {36, 35, 40, 48, 43}, {99, 91, 96, 105, 106}}]]}, "\"parabigyrate rhombicosidodecahedron\""], Annotation[#, "parabigyrate rhombicosidodecahedron", "Tooltip"]& ]], {2552.727272727273, -3345.5999999999995`}, ImageScaled[{0.5, 0.5}], {359.99999999999955`, 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{0, Rational[7, 2] + 3^Rational[1, 2]}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, {( 2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[ 3, 2]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 1}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], 4 + 3^Rational[1, 2]}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { 1 + 3^Rational[1, 2], Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 1 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[1, 8] (35 + 12 3^Rational[1, 2] + 5^Rational[1, 2] + (15 - 6 5^Rational[1, 2])^ Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[241 - 4160 # - 26088 #^2 - 28240 #^3 + 9344 #^4 + 11840 #^5 - 2112 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 17 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-359 + 1856 # + 8124 #^2 - 18368 #^3 - 8656 #^4 + 11584 #^5 + 576 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 0}, {Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2}, {Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 2 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Root[-2699 - 15336 # - 28060 #^2 - 13824 #^3 + 11264 #^4 + 10176 #^5 - 1280 #^6 - 1536 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 8 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[7, 2] + 3^Rational[1, 2]}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Rational[ 1, 32] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] - ( 30 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (66 + 24 3^Rational[1, 2] - 2 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))}, { Rational[1, 2] ( 5 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[13, 4] + 3^Rational[1, 2] + Rational[-1, 4] 5^Rational[1, 2]}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[9, 2] + 3^Rational[1, 2]}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 4 + 3^Rational[1, 2]}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[12457681 + 32379232 # + 12890616 #^2 - 3016784 #^3 - 1199616 #^4 + 217408 #^5 + 19904 #^6 - 5376 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (97 + 17 5^Rational[1, 2] - (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Root[-213599 + 17889440 # + 15366908 #^2 - 136000 #^3 - 1643856 #^4 + 127680 #^5 + 40512 #^6 - 6400 #^7 + 256 #^8& , 7, 0], 3 + Rational[ 1, 4] (43 + 11 5^Rational[1, 2] - (6 (85 + 31 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[3, 2]}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[5, 2] + 3^Rational[1, 2]}, { Root[22048321 + 32720432 # + 10926600 #^2 - 2745248 #^3 - 1145296 #^4 + 185728 #^5 + 24960 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 12 + (30 (3 + 5^Rational[1, 2]))^Rational[1, 2])}, { Root[42522481 + 48286612 # + 11008748 #^2 - 3872096 #^3 - 1110240 #^4 + 189504 #^5 + 27648 #^6 - 5888 #^7 + 256 #^8& , 7, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]) + 2 (25 + 9 3^Rational[1, 2] - 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (5 + 3^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 1}, {Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Root[35973421 + 42110464 # + 10272132 #^2 - 3547328 #^3 - 1161840 #^4 + 173248 #^5 + 32192 #^6 - 6144 #^7 + 256 #^8& , 7, 0], Rational[1, 16] (50 + 16 3^Rational[1, 2] - 2 5^Rational[1, 2] + 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (1 + 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[22304101 + 31759888 # + 10212060 #^2 - 2571712 #^3 - 1096336 #^4 + 156992 #^5 + 29760 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 9 3^Rational[1, 2] + 15^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (2 + 3^Rational[1, 2])}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (6 + 3^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] - 5^Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[19745461 + 27997328 # + 9030516 #^2 - 2378176 #^3 - 1089216 #^4 + 135872 #^5 + 34304 #^6 - 6144 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (68 + 26 5^Rational[1, 2] + 2 (555 + 246 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2])}, { Root[2812801 + 13871728 # + 12359336 #^2 + 1215664 #^3 - 1331136 #^4 - 53568 #^5 + 64704 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (24 + 3 3^Rational[1, 2] - 15^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[-11225399 + 14461784 # + 18361732 #^2 + 950992 #^3 - 1790400 #^4 + 23168 #^5 + 61312 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[ 1, 16] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] (-1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]) - 2 (-25 - 3 3^Rational[1, 2] + 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Root[7049025 + 18289800 # + 14134500 #^2 + 1393200 #^3 - 1620720 #^4 - 37440 #^5 + 68160 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (46 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[20671081 + 26930368 # + 6702360 #^2 - 3041872 #^3 - 946816 #^4 + 168512 #^5 + 27840 #^6 - 5888 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (77 + 19 5^Rational[1, 2] + (6 (785 + 349 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (42 + 8 3^Rational[1, 2] - 10 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[6411025 + 19334700 # + 13592500 #^2 + 577200 #^3 - 1499920 #^4 - 34560 #^5 + 67520 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[8283901 + 18383888 # + 11436020 #^2 + 220448 #^3 - 1262976 #^4 - 5568 #^5 + 57600 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Root[3510121 + 21639892 # + 15704368 #^2 - 362656 #^3 - 1624800 #^4 + 66304 #^5 + 54208 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] - 2 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[885481 + 1400208 # + 443696 #^2 - 161376 #^3 - 63256 #^4 + 9792 #^5 + 1984 #^6 - 384 #^7 + 16 #^8& , 8, 0], Rational[1, 2] ( 6 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[5175661 + 13965808 # + 10269116 #^2 + 596704 #^3 - 1240656 #^4 - 36288 #^5 + 62784 #^6 - 7424 #^7 + 256 #^8& , 8, 0], 3 + Rational[ 1, 4] (23 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[4995961 + 13916048 # + 9292080 #^2 - 259392 #^3 - 1256736 #^4 + 27392 #^5 + 55040 #^6 - 7168 #^7 + 256 #^8& , 8, 0], 3 + ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (38 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[-6766475 + 8538600 # + 14049800 #^2 + 658800 #^3 - 1715680 #^4 + 12480 #^5 + 64960 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (-3 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[75148861 + 91060364 # + 26236484 #^2 - 4634752 #^3 - 2056416 #^4 + 200256 #^5 + 47616 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 14 + (32 - 10 5^Rational[1, 2] - 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-19124879 + 13205792 # + 16905908 #^2 - 541216 #^3 - 1763760 #^4 + 106944 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (54 + 8 3^Rational[1, 2] - 6 5^Rational[1, 2] - 4 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 1 - 2 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[16289701 + 38249788 # + 17808320 #^2 - 1779152 #^3 - 1689776 #^4 + 112832 #^5 + 51200 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 760321 - 2770508 # + 4124016 #^2 - 3282384 #^3 + 1534224 #^4 - 433472 #^5 + 72704 #^6 - 6656 #^7 + 256 #^8& , 4, 0]}, { Root[46339801 + 62400964 # + 20757544 #^2 - 3104992 #^3 - 1805376 #^4 + 150976 #^5 + 49216 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1321321 - 4395268 # + 5964180 #^2 - 4353088 #^3 + 1883664 #^4 - 498112 #^5 + 79040 #^6 - 6912 #^7 + 256 #^8& , 4, 0]}, { Root[7761301 + 21299724 # + 13454592 #^2 - 96688 #^3 - 1470560 #^4 + 22848 #^5 + 59392 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 6 3^Rational[1, 2] + 2 5^Rational[1, 2] - 2 15^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] ( 3 + 3^Rational[1, 2] + 5^Rational[1, 2] - 15^ Rational[1, 2]))}, { Root[12106981 + 22506792 # + 11064908 #^2 - 1088416 #^3 - 1389360 #^4 + 80384 #^5 + 51648 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 16] (50 + 8 3^Rational[1, 2] + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] (2 + 3^Rational[1, 2] + 2 5^Rational[1, 2] - 15^Rational[1, 2]))}}, {{0, 5.232050807568877}, { 0.17281636480318796`, 2.3660254037844384`}, { 0.17281636480318796`, 3.3660254037844384`}, {0.5877852522924731, 4.42303381319393}, {0.5877852522924731, 6.041067801943825}, { 0.672816364803188, 1.5}, {0.672816364803188, 4.232050807568877}, {0.672816364803188, 6.232050807568877}, { 1.172816364803188, 2.3660254037844384`}, {1.172816364803188, 3.3660254037844384`}, {1.172816364803188, 7.098076211353315}, { 1.5388417685876268`, 1}, {1.5388417685876268`, 4.732050807568877}, {1.5388417685876268`, 5.732050807568877}, { 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GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] (-1 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { 0, Rational[1, 4] (3 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-2 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (4 + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (-1 - 5^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (3 + 3 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-2 + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (4 + 2 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (-1 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (3 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(5 + 2 5^Rational[1, 2])^Rational[1, 2] + Rational[1, 8] (9 - 5^ Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Root[1 - 108 # + 736 #^2 + 336 #^3 - 5376 #^4 + 2688 #^5 + 1984 #^6 - 1536 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (-1 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[5, 4] + Rational[-1, 4] 5^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Rational[5, 4] + Rational[-1, 4] 5^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ 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0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] (1 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ((10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0], Root[-59 - 16 # + 3252 #^2 - 6368 #^3 - 1120 #^4 + 5248 #^5 - 768 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 0}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (17 - 5^Rational[1, 2] - (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-59 - 592 # - 1924 #^2 - 1696 #^3 + 2064 #^4 + 3072 #^5 - 576 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 68 # - 520 #^2 + 848 #^3 + 864 #^4 - 1728 #^5 - 960 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1 - 28 # - 24 #^2 + 656 #^3 - 1056 #^4 - 832 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (1 + 3^Rational[1, 2] + Root[1 + 6 # - 26 #^3 + 4 #^4 + 24 #^5 - 5 #^6 - 4 #^7 + #^8& , 8, 0])}, { Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0], Root[-239 - 868 # - 132 #^2 + 2224 #^3 + 1280 #^4 - 1856 #^5 - 1152 #^6 + 512 #^7 + 256 #^8& , 7, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[ 1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 1376 # + 612 #^2 + 5872 #^3 - 6240 #^4 - 3392 #^5 + 6272 #^6 - 2304 #^7 + 256 #^8& , 7, 0], Root[ 1 - 288 # - 1204 #^2 - 544 #^3 + 2304 #^4 + 1088 #^5 - 1536 #^6 - 256 #^7 + 256 #^8& , 6, 0]}, { 1 + Root[ 25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (1 + 3^Rational[1, 2] + Root[1 + 6 # - 26 #^3 + 4 #^4 + 24 #^5 - 5 #^6 - 4 #^7 + #^8& , 8, 0])}, { Root[181 + 3032 # - 5812 #^2 - 11296 #^3 + 36960 #^4 - 36096 #^5 + 16128 #^6 - 3328 #^7 + 256 #^8& , 7, 0], Root[-179 + 392 # + 1108 #^2 - 3216 #^3 + 640 #^4 + 2944 #^5 - 1152 #^6 - 768 #^7 + 256 #^8& , 8, 0]}, { Root[25 - 1000 # + 1200 #^2 + 6000 #^3 - 5760 #^4 - 6400 #^5 + 8000 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 61 + 404 # - 1440 #^2 - 1104 #^3 + 2784 #^4 + 896 #^5 - 1600 #^6 - 256 #^7 + 256 #^8& , 5, 0]}, { Rational[1, 2] Root[61 - 176 # - 36 #^2 + 358 #^3 - 126 #^4 - 164 #^5 + 101 #^6 - 18 #^7 + #^8& , 8, 0], Root[ 1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[1 - 86 # + 1695 #^2 - 3484 #^3 + 2909 #^4 - 1204 #^5 + 255 #^6 - 26 #^7 + #^8& , 8, 0], Rational[1, 2] (3^Rational[1, 2] + Root[1 + 6 # - 26 #^3 + 4 #^4 + 24 #^5 - 5 #^6 - 4 #^7 + #^8& , 8, 0])}, { Root[-59 + 740 # - 3132 #^2 + 4800 #^3 + 864 #^4 - 9280 #^5 + 8192 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 1 - 44 # + 284 #^2 - 368 #^3 - 576 #^4 + 1344 #^5 - 384 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[-59 - 3048 # - 7572 #^2 + 31744 #^3 - 3200 #^4 - 23616 #^5 + 14848 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Root[ 1 + 36 # + 452 #^2 + 2288 #^3 + 3840 #^4 - 448 #^5 - 2688 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[25 + 1200 # + 12500 #^2 + 6800 #^3 - 22320 #^4 + 2240 #^5 + 6720 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 1 + 4 # - 156 #^2 - 512 #^3 + 144 #^4 + 1216 #^5 - 64 #^6 - 768 #^7 + 256 #^8& , 5, 0]}, { Root[25 - 100 # - 600 #^2 + 2400 #^3 + 1920 #^4 - 9280 #^5 + 8000 #^6 - 2560 #^7 + 256 #^8& 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#^5 + 8832 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 61 + 4 # - 500 #^2 - 64 #^3 + 1344 #^4 + 256 #^5 - 1280 #^6 - 256 #^7 + 256 #^8& , 6, 0]}, { Root[1 + 128 # - 272 #^2 - 2544 #^3 + 11200 #^4 - 17024 #^5 + 11328 #^6 - 3072 #^7 + 256 #^8& , 8, 0], Root[ 1 - 508 # - 5224 #^2 - 2704 #^3 + 7104 #^4 + 1728 #^5 - 2496 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Root[1 - 24 # + 132 #^2 + 368 #^3 - 2720 #^4 - 1728 #^5 + 7552 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 1 - 36 # + 364 #^2 - 1152 #^3 + 224 #^4 + 2496 #^5 - 1024 #^6 - 768 #^7 + 256 #^8& , 7, 0]}, { Root[ 1 - 24 # + 132 #^2 + 368 #^3 - 2720 #^4 - 1728 #^5 + 7552 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-59 + 484 # - 740 #^2 - 1504 #^3 + 1824 #^4 + 1216 #^5 - 1280 #^6 - 256 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 1.3968022466674206`}, {0.10452846326765342`, 1.215753637450747}, {0.10452846326765342`, 2.3913241420356948`}, {0.6923137155601267, 0.4067366430758002}, { 0.6923137155601267, 3.200341136410642}, {0.8322001035762162, 3.3557007095955624`}, 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GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 8] ((1 + 2 3^Rational[1, 2]) (10 - 2 5^Rational[1, 2])^ Rational[1, 2] - (-4 + 3^Rational[1, 2]) (1 + 5^Rational[1, 2]))}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (2 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2] - (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (2 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2] - ( 10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (3 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0], Rational[ 1, 16] ((10 - 2 5^Rational[1, 2])^Rational[1, 2] (1 + 4 3^Rational[1, 2] + 5^Rational[1, 2]) + 2 (6 - 3^Rational[1, 2] + 6 5^Rational[1, 2] + 15^Rational[1, 2]))}, { Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (2 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (3 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 8] ((-1 + 2 3^Rational[1, 2]) (10 - 2 5^Rational[1, 2])^ Rational[1, 2] - (-2 + 3^Rational[1, 2]) (1 + 5^Rational[1, 2]))}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[1, 8] ( 2 (30 - 6 5^Rational[1, 2])^Rational[1, 2] - (1 + 5^Rational[1, 2]) (-2 + (10 - 2 5^Rational[1, 2])^ Rational[1, 2]))}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[1, 8] ( 2 (30 - 6 5^Rational[1, 2])^Rational[1, 2] + (1 + 5^Rational[1, 2]) ( 6 + (10 - 2 5^Rational[1, 2])^Rational[1, 2]))}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (4 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 25 + 400 # - 500 #^2 - 600 #^3 + 820 #^4 + 80 #^5 - 240 #^6 + 16 #^8& , 7, 0]}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (8 + 4 5^Rational[1, 2] + (50 - 10 5^Rational[1, 2])^Rational[1, 2] + 2 (30 - 6 5^Rational[1, 2])^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ((30 - 6 5^Rational[1, 2])^Rational[1, 2] + 2 (2 + 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0], Rational[ 1, 16] ((-2) 3^Rational[1, 2] + (2 5^Rational[1, 2]) (4 + 3^Rational[1, 2]) - (10 - 2 5^Rational[1, 2])^ Rational[1, 2] (1 - 4 3^Rational[1, 2] + 5^Rational[1, 2]))}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (4 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[601 - 4372 # + 2956 #^2 + 12384 #^3 - 14816 #^4 - 1088 #^5 + 6144 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (1 + 3 5^Rational[1, 2] + (150 - 66 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-14219 - 137716 # + 218332 #^2 - 33888 #^3 - 64160 #^4 + 23488 #^5 + 3072 #^6 - 2304 #^7 + 256 #^8& , 7, 0], Rational[1, 8] (7 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-479 - 716 # + 10272 #^2 + 6592 #^3 - 19200 #^4 + 3328 #^5 + 5312 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-479 - 716 # + 10272 #^2 + 6592 #^3 - 19200 #^4 + 3328 #^5 + 5312 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-1019 - 3872 # + 4576 #^2 + 9264 #^3 - 10736 #^4 - 2368 #^5 + 6144 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-3 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-1019 - 3872 # + 4576 #^2 + 9264 #^3 - 10736 #^4 - 2368 #^5 + 6144 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (5 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-43259 + 308 # + 69076 #^2 - 13776 #^3 - 33056 #^4 + 11392 #^5 + 4224 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (3 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-43259 + 308 # + 69076 #^2 - 13776 #^3 - 33056 #^4 + 11392 #^5 + 4224 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (11 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-15359 + 8144 # + 45072 #^2 - 24208 #^3 - 31200 #^4 + 15488 #^5 + 3392 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (2 + 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-359 + 28 # + 1696 #^2 - 396 #^3 - 1376 #^4 + 512 #^5 + 264 #^6 - 144 #^7 + 16 #^8& , 8, 0], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[-359 + 28 # + 1696 #^2 - 396 #^3 - 1376 #^4 + 512 #^5 + 264 #^6 - 144 #^7 + 16 #^8& , 8, 0], Rational[1, 8] (3 + 3 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-97499 + 65008 # + 118356 #^2 - 81296 #^3 - 34656 #^4 + 25792 #^5 + 1664 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (5 + 3 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-97499 + 65008 # + 118356 #^2 - 81296 #^3 - 34656 #^4 + 25792 #^5 + 1664 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (9 + 7 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-86519 + 99148 # + 97416 #^2 - 88736 #^3 - 31056 #^4 + 24832 #^5 + 1664 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-577799 + 612748 # + 256396 #^2 - 304416 #^3 - 26336 #^4 + 47552 #^5 - 1536 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (7 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-36899 + 2276 # + 73200 #^2 - 25216 #^3 - 36096 #^4 + 18944 #^5 + 2240 #^6 - 2304 #^7 + 256 #^8& , 8, 0], 0}, { Root[-36899 + 2276 # + 73200 #^2 - 25216 #^3 - 36096 #^4 + 18944 #^5 + 2240 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (-3 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-36899 + 2276 # + 73200 #^2 - 25216 #^3 - 36096 #^4 + 18944 #^5 + 2240 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-4079 + 796 # + 61740 #^2 - 46976 #^3 - 32256 #^4 + 24064 #^5 + 1280 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (1 + 3 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-4079 + 796 # + 61740 #^2 - 46976 #^3 - 32256 #^4 + 24064 #^5 + 1280 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (9 + 3 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-44879 + 63428 # + 102976 #^2 - 144576 #^3 - 24896 #^4 + 36352 #^5 - 576 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (2 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-48119 + 35216 # + 126220 #^2 - 102336 #^3 - 37136 #^4 + 36544 #^5 - 960 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[-48119 + 35216 # + 126220 #^2 - 102336 #^3 - 37136 #^4 + 36544 #^5 - 960 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 2 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-21659 + 10076 # + 222540 #^2 - 192736 #^3 - 26016 #^4 + 46784 #^5 - 2560 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (3 + 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-21659 + 10076 # + 222540 #^2 - 192736 #^3 - 26016 #^4 + 46784 #^5 - 2560 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (7 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-520019 + 533016 # + 269020 #^2 - 338256 #^3 - 16656 #^4 + 57024 #^5 - 4160 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (-1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-98759 + 143536 # + 261460 #^2 - 415056 #^3 + 10144 #^4 + 65984 #^5 - 5760 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (5 + 3 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Root[-219599 + 144176 # + 224800 #^2 - 166416 #^3 - 51056 #^4 + 51904 #^5 - 3840 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-1 + 3 5^Rational[1, 2] + 3 (30 - 6 5^Rational[1, 2])^Rational[1, 2])}}, {{ 0, 2.2293712665843493`}, {0.10452846326765342`, 2.048322657367676}, {0.10452846326765342`, 3.2238931619526223`}, {0.6923137155601267, 1.2393056629927286`}, {0.6923137155601267, 4.03291015632757}, { 0.8322001035762162, 4.18826972951249}, 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#^5 - 2560 #^6 + 256 #^8& , 8, 0], Root[-239 - 868 # - 132 #^2 + 2224 #^3 + 1280 #^4 - 1856 #^5 - 1152 #^6 + 512 #^7 + 256 #^8& , 7, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 9 + (35 + 2 5^Rational[1, 2] - 4 15^Rational[1, 2])^ Rational[1, 2]), Root[ 1 + 4 # - 180 #^2 + 496 #^3 + 384 #^4 - 2624 #^5 + 3200 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { 1 + Root[ 25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[1 + 2 # - 14 #^2 - 14 #^3 + 54 #^4 - 22 #^5 - 11 #^6 + 4 #^7 + #^8& , 6, 0]}, { Root[6481 - 156976 # + 465512 #^2 - 595888 #^3 + 411840 #^4 - 165312 #^5 + 38592 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[ 1 + 68 # - 520 #^2 + 848 #^3 + 864 #^4 - 1728 #^5 - 960 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Rational[1, 4] (7 - 5^Rational[1, 2] + Root[6400 + 25600 # + 22400 #^2 - 8000 #^3 - 2880 #^4 + 720 #^5 + 60 #^6 - 20 #^7 + #^8& , 8, 0]), Root[ 1 - 28 # - 24 #^2 + 656 #^3 - 1056 #^4 - 832 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[3, 2] + Root[25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[3, 2] + Root[25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[ 1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-21899 + 213404 # - 183348 #^2 - 129008 #^3 + 246800 #^4 - 136832 #^5 + 36672 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (17 - 5^Rational[1, 2] - (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[-21899 + 213404 # - 183348 #^2 - 129008 #^3 + 246800 #^4 - 136832 #^5 + 36672 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-59 - 592 # - 1924 #^2 - 1696 #^3 + 2064 #^4 + 3072 #^5 - 576 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (9 + 5^Rational[1, 2] + (50 + 22 5^Rational[1, 2])^Rational[1, 2]), Root[1 + 6 # - 26 #^3 + 4 #^4 + 24 #^5 - 5 #^6 - 4 #^7 + #^8& , 8, 0]}, { Root[-10739 + 41908 # - 22752 #^2 - 84544 #^3 + 142400 #^4 - 91264 #^5 + 28608 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[-10739 + 41908 # - 22752 #^2 - 84544 #^3 + 142400 #^4 - 91264 #^5 + 28608 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[5041 + 9088 # - 117952 #^2 + 92656 #^3 + 40800 #^4 - 67584 #^5 + 26688 #^6 - 4352 #^7 + 256 #^8& , 8, 0], Root[ 1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 9 + (65 + 28 5^Rational[1, 2] + 2 (30 (47 + 21 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (4 - 5^ Rational[1, 2] - (3 (5 - 2 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Root[5521 - 54076 # + 187152 #^2 - 309408 #^3 + 273600 #^4 - 134272 #^5 + 36032 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[5521 - 54076 # + 187152 #^2 - 309408 #^3 + 273600 #^4 - 134272 #^5 + 36032 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[241 + 17384 # - 15648 #^2 - 85008 #^3 + 160800 #^4 - 109312 #^5 + 34112 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[ 1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Root[241 + 17384 # - 15648 #^2 - 85008 #^3 + 160800 #^4 - 109312 #^5 + 34112 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ((10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[181 - 248 # - 417 #^2 + 664 #^3 + 15 #^4 - 266 #^5 + 113 #^6 - 18 #^7 + #^8& , 8, 0], Rational[1, 4] (1 + 15^Rational[1, 2] + (2 (4 + 15^Rational[1, 2]))^ Rational[1, 2])}}, {{0, 1.3968022466674206`}, { 0.10452846326765342`, 1.215753637450747}, {0.10452846326765342`, 2.3913241420356948`}, {0.6923137155601267, 0.4067366430758002}, { 0.6923137155601267, 3.200341136410642}, {0.8322001035762162, 3.3557007095955624`}, {0.9135454576426009, 1.8035388897432216`}, {1.5013307099350766`, 0.9945218953682734}, {1.5013307099350766`, 2.6125558841181693`}, {1.6058591732027274`, 0}, { 1.8103477043100213`, 0.04346537907312124}, {1.8103477043100213`, 3.563612400413322}, {2.4523872262302273`, 1.3035388897432216`}, { 2.4523872262302273`, 2.303538889743222}, {2.7614042206051748`, 0.3524823734480673}, {2.7614042206051748`, 3.2545954060383737`}, {2.9523872262302286`, 3.1695642935276602`}, {3.430534826964033, 1.0956271989254613`}, { 3.4523872262302318`, 1.3035388897432216`}, {3.4523872262302318`, 2.303538889743222}, {3.4742396254964216`, 2.5114505805609877`}, { 3.9523872262302286`, 0.4375134859587821}, {4.143370231856738, 0.3524823734480673}, {4.143370231855281, 3.2545954060383737`}, { 4.452387226230229, 1.3035388897432216`}, {4.452387226230229, 2.303538889743222}, {5.0944267481511805`, 0.04346537907312124}, { 5.0944267481511805`, 3.563612400413322}, {5.298915279257727, 3.6070777794864433`}, {5.403443742525424, 0.9945218953682734}, { 5.403443742525424, 2.6125558841181693`}, {5.99122899481777, 1.8035388897432216`}, {6.072574348884239, 0.2513770698908791}, { 6.212460736900358, 0.4067366430758002}, {6.212460736900358, 3.200341136410642}, {6.800245989192789, 1.215753637450747}, { 6.800245989192789, 2.3913241420356948`}, {6.9047744524604635`, 2.210275532819021}}], PolygonBox[{{13, 14, 9, 7, 8}, {14, 13, 19, 20}, {14, 20, 17}, {9, 14, 16, 12}, {9, 12, 6}, {7, 9, 5, 3}, {7, 3, 1}, {8, 7, 2, 4}, { 8, 4, 10}, {13, 8, 11, 15}, {13, 15, 18}, {26, 25, 30, 32, 31}, { 25, 26, 20, 19}, {25, 19, 22}, {30, 25, 23, 27}, {30, 27, 33}, { 32, 30, 34, 36}, {32, 36, 38}, {31, 32, 37, 35}, {31, 35, 29}, { 26, 31, 28, 24}, {26, 24, 21}}]]}, "\"pentagonal orthobicupola\""], Annotation[#, "pentagonal orthobicupola", "Tooltip"]& ]], {1374.5454545454545`, -3739.2}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 8] (13 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (7 - 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 6 + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (7 - 5^Rational[1, 2] - (6 (5 - 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (5 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (8 - 2 5^Rational[1, 2] + 2 (15 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (13 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (23 - 7 5^Rational[1, 2] + (750 - 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, {( Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (11 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (3 (9 + 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 2]}, { Rational[ 1, 4] (55 - 17 5^Rational[1, 2] + (4350 - 1830 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 + 2 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + Rational[1, 2] (11 + 5^Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] ((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + Rational[1, 2] (11 + 5^Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (15 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (3 (15 - 5^ Rational[1, 2] + (30 (5 - 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], 0}, { Rational[ 1, 4] (3 (15 - 5^ Rational[1, 2] + (30 (5 - 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], 1}, { Rational[ 1, 4] (3 (15 - 5^ Rational[1, 2] + (30 (5 - 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (53 + 11 5^Rational[1, 2] + (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (4 - 5^ Rational[1, 2] + (15 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (52 - 2 5^Rational[1, 2] + 6 (75 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] ( 3 (5 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (13 + 2 5^Rational[1, 2] + 2 (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (9 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 2] (13 + 2 5^Rational[1, 2] + 2 (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (13 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (34 + 11 5^Rational[1, 2] + (195 + 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (7 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (Rational[31, 2] + Rational[11, 2] 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (11 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (3 (21 + 5 5^Rational[1, 2] + (6 (85 + 31 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (8 + 2 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {((6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + Rational[1, 2] (11 + 5^Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (17 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (65 + 23 5^Rational[1, 2] + (30 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 5 + (15 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (65 + 23 5^Rational[1, 2] + (30 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (6 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (92 + 22 5^Rational[1, 2] + 6 (195 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (11 - 5^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (83 + 35 5^Rational[1, 2] + (6 (965 + 431 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (5 + 5^Rational[1, 2])}, { Rational[ 1, 4] (5 (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (7 + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (115 + 37 5^Rational[1, 2] + (30 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (6 - 5^ Rational[1, 2] + (15 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (23 + 10 5^Rational[1, 2] + 2 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (13 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (113 + 41 5^Rational[1, 2] + 11 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[ 1, 2] (Rational[3, 2] (18 + 7 5^Rational[1, 2] + (555 + 246 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (15 + 7 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (32 + Rational[23, 2] 5^Rational[1, 2] + Rational[1, 2] (3 (2245 + 982 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (13 + 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[35, 4] + Rational[13, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[975, 2] + Rational[435, 2] 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (17 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[133, 16] + Rational[59, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[17475, 32] + Rational[7815, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (8 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (74 + 31 5^Rational[1, 2] + (9915 + 4434 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (-(30 - 6 5^Rational[1, 2])^Rational[1, 2] + 3 (5 + 5^Rational[1, 2]))}, { Rational[ 1, 2] (Rational[1, 2] (74 + 31 5^Rational[1, 2] + (9915 + 4434 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (17 + 5 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (155 + 67 5^Rational[1, 2] + (30 (1385 + 619 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (5 + 5^Rational[1, 2])}, {(Rational[43, 4] + Rational[19, 4] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[1335, 2] + Rational[597, 2] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (11 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (167 + 71 5^Rational[1, 2] + 3 (6 (965 + 431 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] (4 + 5^Rational[1, 2])}, { Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (30 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 3 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (197 + 85 5^Rational[1, 2] + 3 (8310 + 3714 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[ 1, 4] (197 + 85 5^Rational[1, 2] + 3 (8310 + 3714 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[3, 4] (3 + 5^Rational[1, 2])}, { Rational[ 1, 4] (223 + 97 5^Rational[1, 2] + (84270 + 37686 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (6 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (55 + Rational[49, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (1525 + 682 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (19 + 7 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[119, 2] + Rational[53, 2] 5^Rational[1, 2] + (6 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (13 + 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[119, 2] + Rational[53, 2] 5^Rational[1, 2] + (6 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (19 + 5 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 2] (Rational[119, 2] + Rational[53, 2] 5^Rational[1, 2] + (6 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (27 + 5 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (257 + 113 5^Rational[1, 2] + 3 (30 (445 + 199 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] (3 + 5^Rational[1, 2])}, { Rational[ 1, 4] (257 + 113 5^Rational[1, 2] + 3 (30 (445 + 199 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 2] (5 + 5^Rational[1, 2])}, {(Rational[145, 8] + Rational[59, 8] 5^Rational[1, 2] + ( Rational[15, 2] (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (13 + 3 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {( Rational[3, 2] (12 + 5 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 8] (11 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(Rational[149, 8] + Rational[65, 8] 5^Rational[1, 2] + ( Rational[3, 2] (445 + 199 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (23 + 5 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (323 + 131 5^Rational[1, 2] + (30 (6305 + 2819 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] (4 + 5^Rational[1, 2])}, { Rational[ 1, 2] (80 + Rational[71, 2] 5^Rational[1, 2] + Rational[1, 2] (15 (3305 + 1478 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (21 + 5 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (347 + 149 5^Rational[1, 2] + (209310 + 93606 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 2 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[347, 16] + Rational[155, 16] 5^Rational[1, 2] + Rational[ 1, 2] (Rational[119775, 32] + Rational[53565, 32] 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (11 + 3 5^Rational[1, 2])}, {(23 + 10 5^Rational[1, 2] + 2 (3 (85 + 38 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] ( 5 (3 + 5^Rational[1, 2]) - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (403 + 163 5^Rational[1, 2] + (6 (46325 + 20639 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 3 5^Rational[1, 2])}}, {{ 0, 2.1691306063588582`}, {0.20791169081775937`, 3.147278207092664}, {0.41582338163551874`, 1.1691306063588582`}, {0.6146483338935596, 4.060823664735265}, { 0.8225600247113184, 2.0826760640014594`}, {0.9510565162951535, 2.4781476007338057`}, {1.1589682071129128`, 0.5}, { 1.4372083586048785`, 4.765312195842559}, {1.6091702292618328`, 3.9562952014676114`}, {1.8170819200795922`, 1.9781476007338057`}, {1.8170819200795922`, 2.9781476007338057`}, {2.0249936108973516`, 0}, { 2.0249936108973516`, 1}, {2.0249936108973516`, 3.9562952014676114`}, {2.3614017932989455`, 0.7555851487162573}, {2.431730253973152, 4.869840659110212}, { 2.7681384363747457`, 1.6691306063588582`}, {2.7681384363747457`, 3.287164595108753}, {3.1045466187763395`, 0.08645454235739913}, { 3.355923688667219, 2.4781476007338057`}, {3.4262521493414253`, 4.765312195842559}, {3.6341638401591845`, 3.787164595108753}, { 3.762660331743019, 1.5646021430912047`}, {3.762660331743019, 3.391693058376407}, {3.9705720225607783`, 0.5864545423573991}, { 4.099068514144614, 1.8090169943749475`}, {4.3504455840354925`, 4.200710052751354}, {4.713716848038173, 1.2555851487162573`}, { 4.757182227111293, 3.287164595108753}, {4.965093917929051, 2.3090169943749475`}, {5.008559297002171, 4.3405964407674436`}, { 5.3718305610048525`, 1.3954715367323467`}, {5.623207630895731, 3.787164595108753}, {5.751704122479566, 5.009727047126302}, { 5.959615813297325, 2.204488531107294}, {5.959615813297325, 4.031579446392495}, {6.088112304881159, 1.8090169943749475`}, { 6.296023995698919, 0.8308693936411418}, {6.366352456373126, 3.118033988749895}, {6.617729526264005, 5.509727047126302}, { 6.954137708665598, 2.3090169943749475`}, {6.954137708665598, 3.9270509831248424`}, {7.290545891067192, 0.7263409303734882}, { 7.360874351741399, 4.8405964407674436`}, {7.697282534142993, 1.6398863880160892`}, {7.697282534142993, 4.596181589483701}, { 7.697282534142993, 5.596181589483701}, {7.905194224960752, 2.618033988749895}, {7.905194224960752, 3.618033988749895}, { 8.113105915778512, 1.6398863880160892`}, {8.285067786435466, 0.8308693936411418}, {8.563307937927432, 5.096181589483701}, { 8.771219628745191, 3.118033988749895}, {8.899716120329025, 3.5135055254822416`}, {9.107627811146784, 1.5353579247484357`}, { 9.306452763404826, 4.427050983124842}, {9.514364454222585, 2.4489033823910367`}, {9.722276145040345, 3.4270509831248424`}}], PolygonBox[{{20, 18, 11, 10, 17}, {20, 26, 30, 29, 24}, {20, 24, 18}, {24, 29, 27}, {18, 22, 21, 16, 14}, {18, 14, 11}, {14, 16, 8}, {11, 9, 4, 2, 6}, {11, 6, 10}, {6, 2, 1}, {10, 5, 3, 7, 13}, {10, 13, 17}, {13, 7, 12}, {17, 15, 19, 25, 23}, {17, 23, 20}, {23, 25, 28}, {39, 41, 48, 49, 42}, {39, 33, 29, 30, 35}, { 39, 35, 41}, {35, 30, 32}, {41, 37, 38, 43, 45}, {41, 45, 48}, { 45, 43, 51}, {48, 50, 55, 57, 53}, {48, 53, 49}, {53, 57, 58}, { 49, 54, 56, 52, 46}, {49, 46, 42}, {46, 52, 47}, {42, 44, 40, 34, 36}, {42, 36, 39}, {36, 34, 31}}]]}, "\"pentagonal orthobirotunda\""], Annotation[#, "pentagonal orthobirotunda", "Tooltip"]& ]], {1767.2727272727275`, -3739.2}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] (1 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ((10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[1 - 36 # - 48 #^2 + 512 #^3 + 640 #^4 - 1152 #^5 - 1088 #^6 + 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^Rational[1, 2] + Root[256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Root[25 + 100 # - 500 #^2 - 1200 #^3 + 2080 #^4 + 1280 #^5 - 1920 #^6 + 256 #^8& , 6, 0], Root[-59 - 16 # + 3252 #^2 - 6368 #^3 - 1120 #^4 + 5248 #^5 - 768 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Root[1 + 36 # - 48 #^2 - 512 #^3 + 640 #^4 + 1152 #^5 - 1088 #^6 - 256 #^7 + 256 #^8& , 7, 0], Rational[1, 4] (1 + 5^Rational[1, 2] + Root[ 256 + 768 # - 832 #^3 + 64 #^4 + 192 #^5 - 20 #^6 - 8 #^7 + #^8& , 8, 0])}, { Rational[ 1, 2] (5 (2 + 3^Rational[1, 2]) - (5 (7 + 4 3^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 0}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (17 - 5^Rational[1, 2] - (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[181 + 84 # - 1348 #^2 + 112 #^3 + 2640 #^4 - 512 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-59 - 592 # - 1924 #^2 - 1696 #^3 + 2064 #^4 + 3072 #^5 - 576 #^6 - 1024 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 184 # - 2148 #^2 - 512 #^3 + 3440 #^4 + 832 #^5 - 1728 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 68 # - 520 #^2 + 848 #^3 + 864 #^4 - 1728 #^5 - 960 #^6 + 512 #^7 + 256 #^8& , 6, 0]}, { Root[-179 - 296 # + 2952 #^2 + 8112 #^3 + 3840 #^4 - 3392 #^5 - 2368 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 1 - 28 # - 24 #^2 + 656 #^3 - 1056 #^4 - 832 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[61 + 92 # - 832 #^2 + 584 #^3 + 600 #^4 - 336 #^5 - 192 #^6 + 32 #^7 + 16 #^8& , 8, 0], Root[ 1 - 56 # + 180 #^2 + 16 #^3 - 396 #^4 + 256 #^5 + 80 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { Root[25 + 400 # + 1400 #^2 - 2000 #^3 - 2880 #^4 + 2880 #^5 + 960 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] (1 + 3^Rational[1, 2] + Root[1 + 6 # - 26 #^3 + 4 #^4 + 24 #^5 - 5 #^6 - 4 #^7 + #^8& , 8, 0])}, { Root[-3539 + 15928 # - 9312 #^2 - 14944 #^3 + 10400 #^4 + 4736 #^5 - 3072 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 61 - 728 # + 2256 #^2 + 736 #^3 - 9696 #^4 + 9088 #^5 - 256 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[25 - 200 # - 300 #^2 + 1600 #^3 + 1920 #^4 - 2240 #^5 - 2560 #^6 + 256 #^8& , 8, 0], Root[-239 - 868 # - 132 #^2 + 2224 #^3 + 1280 #^4 - 1856 #^5 - 1152 #^6 + 512 #^7 + 256 #^8& , 7, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[-1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Root[181 - 496 # - 1668 #^2 + 5312 #^3 + 240 #^4 - 8512 #^5 + 7232 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[1 + 12 # - 208 #^3 + 64 #^4 + 768 #^5 - 320 #^6 - 512 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 3 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Root[ 1 - 8 # - 84 #^2 + 976 #^3 - 2976 #^4 + 2368 #^5 + 1664 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-719 + 676 # + 1272 #^2 - 1112 #^3 - 600 #^4 + 592 #^5 + 32 #^6 - 96 #^7 + 16 #^8& , 8, 0], Root[ 1 - 56 # + 180 #^2 + 16 #^3 - 396 #^4 + 256 #^5 + 80 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { Root[-1259 + 4232 # + 1548 #^2 - 11776 #^3 + 4080 #^4 + 6464 #^5 - 2752 #^6 - 768 #^7 + 256 #^8& , 8, 0], Root[-59 - 464 # + 1372 #^2 + 4368 #^3 - 15920 #^4 + 13952 #^5 - 1728 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] ( 5 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Root[ 61 + 104 # - 1620 #^2 + 3536 #^3 - 2016 #^4 - 1984 #^5 + 3200 #^6 - 1536 #^7 + 256 #^8& , 7, 0]}, { Root[181 - 368 # - 2412 #^2 + 8384 #^3 - 7360 #^4 - 1216 #^5 + 4608 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Root[ 1 + 4 # - 180 #^2 + 496 #^3 + 384 #^4 - 2624 #^5 + 3200 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-1499 - 5752 # + 15288 #^2 + 976 #^3 - 17920 #^4 + 8896 #^5 + 1728 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[-179 - 316 # + 1440 #^2 + 656 #^3 - 3456 #^4 + 896 #^5 + 2240 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-14579 - 12488 # + 49448 #^2 - 9056 #^3 - 27600 #^4 + 11904 #^5 + 2688 #^6 - 2048 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[-5975 + 12400 # + 6600 #^2 - 20400 #^3 + 960 #^4 + 9280 #^5 - 1600 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Root[ 1 + 4 # - 320 #^2 + 2256 #^3 - 5696 #^4 + 4736 #^5 + 960 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-22859 + 102824 # - 25708 #^2 - 71488 #^3 + 23040 #^4 + 15168 #^5 - 4608 #^6 - 1024 #^7 + 256 #^8& , 8, 0], Root[-359 - 648 # + 4156 #^2 + 336 #^3 - 12576 #^4 + 11328 #^5 - 896 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[3721 - 9104 # - 21268 #^2 + 50368 #^3 - 24720 #^4 - 7488 #^5 + 9792 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-2459 + 3424 # + 23820 #^2 - 37424 #^3 - 7536 #^4 + 21376 #^5 - 3520 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[3121 - 51952 # + 10728 #^2 + 64256 #^3 - 37200 #^4 - 8704 #^5 + 11648 #^6 - 3072 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 5^Rational[1, 2])}, { Root[-8219 - 6936 # + 26492 #^2 + 1632 #^3 - 21520 #^4 + 5568 #^5 + 4672 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 1 - 16 # - 20 #^2 + 336 #^3 - 176 #^4 - 1664 #^5 + 2880 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-8219 - 6936 # + 26492 #^2 + 1632 #^3 - 21520 #^4 + 5568 #^5 + 4672 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-6599 + 3904 # + 17260 #^2 - 14064 #^3 - 10736 #^4 + 12416 #^5 - 960 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[241 - 20848 # - 9192 #^2 + 41424 #^3 - 6720 #^4 - 22336 #^5 + 14528 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Root[ 1 + 4 # - 320 #^2 + 2256 #^3 - 5696 #^4 + 4736 #^5 + 960 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[1525 - 3400 # - 11800 #^2 + 41600 #^3 - 39120 #^4 + 7680 #^5 + 5760 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 61 - 928 # + 2136 #^2 + 5216 #^3 - 18576 #^4 + 15488 #^5 - 2176 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-9839 - 6464 # + 33432 #^2 + 9968 #^3 - 32320 #^4 + 3392 #^5 + 7872 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 61 - 28 # - 944 #^2 + 2256 #^3 - 896 #^4 - 2432 #^5 + 3264 #^6 - 1536 #^7 + 256 #^8& , 7, 0]}, { Root[-9839 - 6464 # + 33432 #^2 + 9968 #^3 - 32320 #^4 + 3392 #^5 + 7872 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-179 - 316 # + 1440 #^2 + 656 #^3 - 3456 #^4 + 896 #^5 + 2240 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-164975 + 50600 # + 168900 #^2 - 60800 #^3 - 52480 #^4 + 22720 #^5 + 3840 #^6 - 2560 #^7 + 256 #^8& , 8, 0], Root[ 1 + 4 # - 180 #^2 + 496 #^3 + 384 #^4 - 2624 #^5 + 3200 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-1475 - 17000 # - 24900 #^2 + 56800 #^3 + 2160 #^4 - 36800 #^5 + 19520 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 1 + 32 # - 564 #^2 + 2576 #^3 - 3696 #^4 + 128 #^5 + 2624 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[61 - 592 # + 408 #^2 + 1616 #^3 - 1800 #^4 - 64 #^5 + 608 #^6 - 192 #^7 + 16 #^8& , 8, 0], Root[ 1 - 56 # + 180 #^2 + 16 #^3 - 396 #^4 + 256 #^5 + 80 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { Root[61 - 592 # + 408 #^2 + 1616 #^3 - 1800 #^4 - 64 #^5 + 608 #^6 - 192 #^7 + 16 #^8& , 8, 0], Root[ 61 + 272 # + 36 #^2 - 784 #^3 - 156 #^4 + 608 #^5 - 16 #^6 - 96 #^7 + 16 #^8& , 8, 0]}, { Root[-26699 + 4936 # + 102072 #^2 - 27312 #^3 - 58560 #^4 + 21952 #^5 + 5312 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-59 + 356 # + 3832 #^2 - 7152 #^3 - 8480 #^4 + 14272 #^5 - 1728 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-164999 - 63072 # + 270068 #^2 - 29184 #^3 - 93760 #^4 + 25536 #^5 + 7168 #^6 - 3072 #^7 + 256 #^8& , 8, 0], Root[ 61 + 104 # - 1620 #^2 + 3536 #^3 - 2016 #^4 - 1984 #^5 + 3200 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-1019 - 2936 # + 15912 #^2 + 14592 #^3 - 27600 #^4 - 8192 #^5 + 13952 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (3 + 5^Rational[1, 2] + 2 (5 + 2 5^Rational[1, 2])^Rational[1, 2])}, { Root[-1019 - 2936 # + 15912 #^2 + 14592 #^3 - 27600 #^4 - 8192 #^5 + 13952 #^6 - 3584 #^7 + 256 #^8& , 8, 0], Root[-6299 + 7424 # + 20760 #^2 - 25504 #^3 - 7056 #^4 + 12416 #^5 - 640 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-79739 - 5368 # + 138968 #^2 - 19216 #^3 - 68160 #^4 + 16704 #^5 + 9408 #^6 - 3328 #^7 + 256 #^8& , 8, 0], Root[-179 + 692 # + 2536 #^2 - 3504 #^3 - 4256 #^4 + 4288 #^5 + 1344 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 1.3968022466674206`}, {0.10452846326765342`, 1.215753637450747}, {0.10452846326765342`, 2.3913241420356948`}, {0.6923137155601267, 0.4067366430758002}, { 0.6923137155601267, 3.200341136410642}, {0.8322001035762162, 3.3557007095955624`}, {0.9135454576426009, 1.8035388897432216`}, {1.5013307099350766`, 0.9945218953682734}, {1.5013307099350766`, 2.6125558841181693`}, {1.6058591732027274`, 0}, { 1.8103477043100213`, 0.04346537907312124}, {1.8103477043100213`, 3.563612400413322}, {2.4523872262302273`, 1.3035388897432216`}, { 2.4523872262302273`, 2.303538889743222}, {2.7614042206051748`, 0.3524823734480673}, {2.7614042206051748`, 3.2545954060383737`}, {2.865932683872828, 4.249117301406648}, { 2.9523872262302286`, 3.1695642935276602`}, {3.3659326838728285`, 5.115142705191086}, {3.430534826964033, 1.0956271989254613`}, { 3.4523872262302318`, 1.3035388897432216`}, {3.4523872262302318`, 2.303538889743222}, {3.6215178325890856`, 3.912709119005051}, { 3.8659326838728276`, 4.249117301406648}, {4.035063290231687, 5.858287530668479}, {4.1215178325890856`, 1.560394064265859}, { 4.430534826964035, 2.5114505805609877`}, {4.535063290231685, 3.505972475929254}, {4.674949678247777, 2.175042398159386}, { 4.844080284606635, 4.457028992224409}, {4.948608747874287, 5.451550887592679}, {5.035063290231695, 6.274110912303999}, { 5.174949678247778, 1.3090169943749475`}, {5.3440802846066315`, 2.91818722363678}, {5.3440802846066315`, 5.323054396008845}, { 5.84408028460662, 4.457028992224409}, {6.013210890965494, 6.066199221486239}, {6.153097278981576, 1.5169286851927355`}, { 6.153097278981576, 3.505972475929254}, {6.257625742249237, 2.5114505805609877`}, {6.653097278981587, 2.6399470721448197`}, { 6.822227885340438, 4.249117301406648}, {6.822227885340438, 4.664940683042169}, {6.9267563486080945`, 5.659462578410439}, { 7.06664273662418, 1.9236653282684961`}, {7.631244879715389, 2.8478587629625745`}, {7.631244879715389, 4.836902553699122}, { 7.735773342983037, 3.8423806583308466`}}], PolygonBox[{{9, 7, 8, 13, 14}, {7, 9, 5, 3}, {7, 3, 1}, {8, 7, 2, 4}, {8, 4, 10}, {13, 8, 11, 15}, {13, 15, 20}, {14, 13, 21, 22}, {14, 22, 18}, {9, 14, 16, 12}, {9, 12, 6}, {28, 34, 39, 36, 30}, {28, 23, 18, 22, 27}, {28, 27, 34}, {27, 22, 26}, {34, 29, 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2])^Rational[1, 2], Rational[1, 8] (1 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 4] (175 + 47 5^Rational[1, 2] - (5550 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (1 + 5^Rational[1, 2])}, { Rational[ 1, 4] (287 + 103 5^Rational[1, 2] + (6 (325 + 31 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (1 + 5^Rational[1, 2])}, { Rational[ 1, 4] (3 (101 + 45 5^Rational[1, 2] + (6 (445 + 199 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (1 + 5^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (223 + 95 5^Rational[1, 2] + (17070 + 7626 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] 5^Rational[1, 2]}, { Rational[ 1, 4] (157 + 53 5^Rational[1, 2] + (1110 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] (3 + 5^Rational[1, 2])}, {(Rational[65, 8] + Rational[29, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (3 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (217 + 89 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] (1 + 5^Rational[1, 2])}, { Rational[ 1, 4] (373 + 157 5^Rational[1, 2] + (30 (965 + 431 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] (1 + 5^Rational[1, 2])}, { 0, Rational[1, 8] (1 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, {(5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 3 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[ 1, 4] (223 + 95 5^Rational[1, 2] + (17070 + 7626 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] (2 + 5^Rational[1, 2])}, { 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3.588426864917}, {6.589283721676, 2.53697320726}, { 6.597324399516, 0.5450708081200002}, {6.6831089242360004`, 1.54138452142}, {7.4378054071460005`, 3.0661338154699997`}, { 7.450090469726001, 0.022777758670000203`}, {7.523589931876001, 4.062447528771}, {7.531630609716, 2.07054512963}, {7.535874994446, 1.01909147197}, {7.617415134436, 3.0668588429400003`}, { 8.372111617346, 4.5916081369763}, {8.384396679916, 1.5482520801800002`}, {8.465936819916, 3.596019451141}, { 8.470181204646, 2.54456579348}, {8.478221882486, 0.5526633943399997}, {8.564006407206, 1.5489771076499999`}, { 9.318702890115999, 3.07372640169}, {9.330987952686, 0.03037034488999968}, {9.412528092686, 2.07813771585}, { 9.416772477416, 1.0266840581999999`}, {10.265294162885999`, 1.5558446664}}, PolygonBox[{{4, 1, 3, 6}, {3, 7, 10, 6}, {3, 2, 5, 7}, {10, 7, 9, 13}, {9, 14, 17, 13}, {9, 8, 11, 14}, {16, 12, 15, 18}, {15, 19, 22, 18}, {15, 13, 17, 19}, {22, 19, 21, 25}, {21, 26, 29, 25}, { 21, 20, 23, 26}, {28, 24, 27, 30}, {27, 31, 34, 30}, {27, 25, 29, 31}, {34, 31, 33, 37}, {33, 38, 41, 37}, {33, 32, 35, 38}, {40, 36, 39, 42}, {39, 43, 46, 42}, {39, 37, 41, 43}, {46, 43, 45, 49}, {45, 50, 53, 49}, {45, 44, 47, 50}, {52, 48, 51, 54}, {51, 55, 58, 54}, {51, 49, 53, 55}, {58, 55, 57, 60}, {57, 61, 62, 60}, {57, 56, 59, 61}}]]}, "\"rhombic triacontahedron\""], Annotation[#, "rhombic triacontahedron", "Tooltip"]& ]], {3338.1818181818185`, -4132.799999999999}, ImageScaled[{0.5, 0.5}], {360., 359.99999999999955`}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (-1 - 3^ Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (-1 - 3^ Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (-3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (-3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 2] (-3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (1 - 3^ Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (1 - 3^ Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (1 - 3^ Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 2 + (62 + 22 5^Rational[1, 2] - 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 1 + (23 + 8 5^Rational[1, 2] - 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 1 + 3^Rational[1, 2], Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (1 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (1 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (2 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (2 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (3 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (3 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (3 + 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (55 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-22259 + 478240 # - 1106488 #^2 + 161680 #^3 + 446464 #^4 - 262720 #^5 + 60608 #^6 - 6400 #^7 + 256 #^8& , 8, 0]}, { 1 + 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { 1 + 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 1 + 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (3 + 2 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (3 + 2 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (3 + 2 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[3, 4] ( 2 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), 3 + (Rational[3, 2] (7 + 5^Rational[1, 2] + 3 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { 2 + 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 2 + 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 2 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 6 + (73 + 25 5^Rational[1, 2] + (8310 + 3714 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[-238739 + 1171904 # - 1679896 #^2 + 703088 #^3 + 133504 #^4 - 177344 #^5 + 49856 #^6 - 5888 #^7 + 256 #^8& , 8, 0]}, {Rational[1, 2] (3 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (3 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 8 + (202 - 2 5^Rational[1, 2] + 16 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (4 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (4 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (4 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 3 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (4 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (4 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (4 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 4 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (5 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (5 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (6 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (7 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (7 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (7 + 5 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (6 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (6 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (7 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (7 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (7 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 14 + (350 + 22 5^Rational[1, 2] + 20 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 6 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (647 - 41 5^Rational[1, 2] + (30 (985 + 139 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 7 + (95 + 8 5^Rational[1, 2] + 20 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 (1 + 3^Rational[1, 2]), Rational[1, 4] ( 9 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (7 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (7 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (680 + 2 5^Rational[1, 2] + 30 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 0}, {4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (8 - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (10 + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (8 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (9 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 7 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 13 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 4 + Rational[ 1, 4] (737 + 49 5^Rational[1, 2] + (38550 + 9570 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (8 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] (8 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (8 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] (9 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 7 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 8 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 11 + (123 + 6 5^Rational[1, 2] + 36 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (2 - 2 3^Rational[1, 2] - 5^ Rational[ 1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 4] (4 - 2 3^Rational[1, 2] + 5^Rational[1, 2] + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + 4 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { 5 + 4 3^Rational[1, 2] + Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Rational[1, 2] ( 9 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (9 + 9 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (10 + 9 3^Rational[1, 2] + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] ( 5 + (63 + 6 5^Rational[1, 2] + 24 (5 + 2 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}}, {{0, 5.314726871570336}, { 0.17281636480318818`, 2.448701467785898}, {0.17281636480318818`, 3.448701467785898}, {0.5877852522924731, 4.505709877195389}, { 0.5877852522924731, 6.123743865945284}, {0.6728163648031882, 1.5826760640014592`}, {0.6728163648031882, 4.314726871570336}, { 0.6728163648031882, 6.314726871570336}, {1.1728163648031882`, 2.448701467785898}, {1.1728163648031882`, 3.448701467785898}, { 1.1728163648031882`, 7.1807522753547754`}, {1.5388417685876268`, 1.0826760640014592`}, {1.5388417685876268`, 4.814726871570336}, { 1.5388417685876268`, 5.814726871570336}, {2.038841768587627, 1.9487014677858978`}, {2.038841768587627, 3.948701467785898}, { 2.038841768587627, 6.6807522753547754`}, {2.123872881098342, 2.1396844734109504`}, {2.123872881098342, 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{21, 26, 27}, {27, 26, 35, 36}, {36, 35, 40}, {26, 30, 35}}]]}, "\"snub cube\""], Annotation[#, "snub cube", "Tooltip"]& ]], {1374.5454545454545`, -4526.4}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{1, 0}, {3, 0}, { Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[7, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[9, 2], Rational[1, 2] 3^Rational[1, 2]}, { 0, 3^Rational[1, 2]}, {1, 3^Rational[1, 2]}, { 2, 3^Rational[1, 2]}, {3, 3^Rational[1, 2]}, { 4, 3^Rational[1, 2]}, { Rational[3, 2], Rational[3, 2] 3^Rational[1, 2]}, { Rational[7, 2], Rational[3, 2] 3^Rational[1, 2]}}, {{1, 0}, {3, 0}, {0.5, 0.8660254037844386}, {1.5, 0.8660254037844386}, {2.5, 0.8660254037844386}, {3.5, 0.8660254037844386}, {4.5, 0.8660254037844386}, {0, 1.7320508075688772`}, { 1, 1.7320508075688772`}, {2, 1.7320508075688772`}, { 3, 1.7320508075688772`}, {4, 1.7320508075688772`}, {1.5, 2.598076211353316}, {3.5, 2.598076211353316}}], PolygonBox[{{12, 6, 7}, {11, 6, 12}, {14, 11, 12}, {2, 6, 5}, {11, 5, 6}, {10, 5, 11}, {10, 4, 5}, {9, 4, 10}, {13, 9, 10}, {1, 4, 3}, {9, 3, 4}, {8, 3, 9}}]]}, "\"snub disphenoid\""], Annotation[#, "snub disphenoid", "Tooltip"]& ]], {1767.2727272727275`, -4526.4}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 8] (61 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[15, 2]}, { Rational[1, 8] ( 3^Rational[1, 2] (-1 + 5^Rational[1, 2]) + ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 31 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, {( Rational[9, 8] + Rational[3, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[1, 8] (59 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ( 3^Rational[1, 2] (3 + 5^Rational[1, 2]) + ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 29 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ( 3^Rational[1, 2] (3 + 5^Rational[1, 2]) + ( 2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] ( 33 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 4] ( 23 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 4] ( 27 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 4] ( 31 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 4] ( 35 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 8] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 4] ( 39 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[3, 2] 3^Rational[1, 2], Rational[1, 8] (65 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (-(1110 - 66 5^Rational[1, 2])^Rational[1, 2] + 19 (7 + 5^Rational[1, 2]))^Rational[1, 2], 8}, { Rational[ 1, 4] (97 + 17 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 21 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (97 + 17 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 25 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (97 + 17 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 33 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (97 + 17 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 37 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] ( 6 3^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (73 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[81, 8] + Rational[21, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (63 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 15 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 19 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 23 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 27 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 31 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 35 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[5, 2] 3^Rational[1, 2], Rational[1, 8] (49 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (143 + 25 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 9 + Rational[1, 2] (15 + 6 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (337 + 31 5^Rational[1, 2] - (3030 - 354 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 6}, { Rational[1, 4] ((2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 3^Rational[1, 2] (7 + 5^Rational[1, 2])), Rational[1, 8] (71 - 5^ Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 13 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 17 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 25 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 29 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 33 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 37 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 41 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] ( 10 3^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (57 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[1, 4] 3^Rational[1, 2]) (11 + 5^Rational[1, 2]), Rational[1, 8] (47 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 15 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 19 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 23 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 27 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 35 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 39 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[7, 2] 3^Rational[1, 2], Rational[1, 8] (33 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (347 + 37 5^Rational[1, 2] + (20190 + 8934 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 7 + Rational[1, 2] (15 + 6 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (637 + 43 5^Rational[1, 2] - (5910 - 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 4}, { Rational[ 1, 2] (97 + 17 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (55 - 5^ Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 9 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 17 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 21 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 25 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 29 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 33 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (553 + 41 5^Rational[1, 2] + (6 (985 + 251 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 37 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 4] ( 14 3^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 8] (41 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[1, 4] 3^Rational[1, 2]) (15 + 5^Rational[1, 2]), Rational[1, 8] (31 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 15 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 19 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 27 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (727 + 47 5^Rational[1, 2] + (7710 + 1914 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 31 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[9, 2] 3^Rational[1, 2], Rational[1, 8] (17 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (647 + 49 5^Rational[1, 2] + (6 (6085 + 2689 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 5 + Rational[1, 2] (15 + 6 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 4] (1033 + 55 5^Rational[1, 2] - (9750 - 1506 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], 2}, { Rational[ 1, 2] (175 + 23 5^Rational[1, 2] + (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (39 - 5^ Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 9 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 13 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 17 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 21 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 25 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (925 + 53 5^Rational[1, 2] + (30 (325 + 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 29 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (491 + 5^Rational[1, 2] + 18 (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]))^ Rational[1, 2], Rational[1, 8] (25 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[549, 8] + Rational[57, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (15 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 7 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 19 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1147 + 59 5^Rational[1, 2] + (6 (2005 + 479 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 23 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[11, 2] 3^Rational[1, 2], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (1043 + 61 5^Rational[1, 2] + (6 (9605 + 4241 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] ( 6 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1525 + 67 5^Rational[1, 2] - (30 (485 - 79 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], 0}, { Rational[ 1, 2] (277 + 29 5^Rational[1, 2] + (3030 + 834 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (23 - 5^ Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 9 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 13 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 17 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1393 + 65 5^Rational[1, 2] + (6 (2425 + 571 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 21 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (Rational[1, 2] (731 + 5^Rational[1, 2] + 22 (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]))^ Rational[1, 2], Rational[1, 8] (9 + 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, {(Rational[801, 8] + Rational[69, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1663 + 71 5^Rational[1, 2] + (6 (2885 + 671 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1663 + 71 5^Rational[1, 2] + (6 (2885 + 671 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1663 + 71 5^Rational[1, 2] + (6 (2885 + 671 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 11 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1663 + 71 5^Rational[1, 2] + (6 (2885 + 671 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 15 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1535 + 73 5^Rational[1, 2] + (83550 + 36870 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Rational[1, 2] ( 2 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 2] (403 + 35 5^Rational[1, 2] + (6 (725 + 191 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 8] (7 - 5^ Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[ 1, 4] (1957 + 77 5^Rational[1, 2] + (6 (3385 + 779 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[ 1, 4] (-3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1957 + 77 5^Rational[1, 2] + (6 (3385 + 779 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1957 + 77 5^Rational[1, 2] + (6 (3385 + 779 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 5 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1957 + 77 5^Rational[1, 2] + (6 (3385 + 779 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 9 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (1957 + 77 5^Rational[1, 2] + (6 (3385 + 779 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 13 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Rational[ 1, 4] (2275 + 83 5^Rational[1, 2] + (30 (785 + 179 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2], Rational[1, 4] ( 3 + (15 + 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3.0223231489593343`}, {7.984335490096565, 0.008472846073665373}, { 8.815630957982934, 4.530240318501829}, {8.819204463730236, 1.516390015600648}, {8.841963343289576, 3.5305870758669142`}, { 8.843166211623029, 2.5161028917196666`}, {8.865925091182365, 4.53029995197909}, {8.869498596929668, 1.5164496490865258`}, { 9.704367570546106, 3.0243668186272976`}}, PolygonBox[{{5, 7, 9}, {5, 9, 1}, {5, 1, 3}, {17, 19, 21}, {17, 21, 13}, {17, 13, 15}, {29, 31, 33}, {29, 33, 25}, {29, 25, 27}, {41, 43, 45}, {41, 45, 37}, {41, 37, 39}, {53, 55, 57}, {53, 57, 49}, {53, 49, 51}, {10, 8, 6}, {10, 6, 14}, {10, 14, 12}, {22, 20, 18}, {22, 18, 26}, {22, 26, 24}, {34, 32, 30}, {34, 30, 38}, {34, 38, 36}, {46, 44, 42}, {46, 42, 50}, {46, 50, 48}, {58, 56, 54}, {58, 54, 62}, {58, 62, 60}, {4, 2, 1}, {4, 1, 9}, {4, 9, 6}, {11, 13, 14}, {11, 14, 6}, {11, 6, 9}, {16, 14, 13}, {16, 13, 21}, {16, 21, 18}, {23, 25, 26}, {23, 26, 18}, {23, 18, 21}, {28, 26, 25}, {28, 25, 33}, {28, 33, 30}, {35, 37, 38}, {35, 38, 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5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 0, Rational[3, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2]}, { 1, Rational[3, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (5 + 2 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (14 + 5^Rational[1, 2] + (75 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (97 - 7 5^Rational[1, 2] - (1830 - 654 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (11 + 3^Rational[1, 2] + 5 5^Rational[1, 2] + 15^Rational[1, 2] - 2 (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-59 + 104 # + 2180 #^2 - 5584 #^3 + 2784 #^4 + 2496 #^5 - 1920 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (11 + 5 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (23 + 7 5^Rational[1, 2] + (750 + 330 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (68 - 2 5^Rational[1, 2] + 2 (195 - 6 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (12 + 3^Rational[1, 2] + 6 5^Rational[1, 2] + 15^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[181 + 812 # - 3084 #^2 - 2864 #^3 + 5264 #^4 + 2368 #^5 - 2496 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2], Rational[ 1, 2] (Rational[51, 2] + Rational[-9, 2] 5^Rational[1, 2] + 3 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (3 + (15 + 6 5^Rational[1, 2])^Rational[1, 2]), ( 8 + Rational[-5, 8] 5^Rational[1, 2] + Rational[1, 8] (375 - 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (10 + 3^Rational[1, 2] + 4 5^Rational[1, 2] + 15^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[-179 + 3652 # - 3704 #^2 - 14224 #^3 + 11904 #^4 + 4288 #^5 - 3776 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 4] (5 + 2 5^Rational[1, 2] + (75 + 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (26 + 7 5^Rational[1, 2] + (795 + 354 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (5 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (103 - 5^ Rational[1, 2] + (6 (565 + 239 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (7 + 5^Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (103 - 5^ Rational[1, 2] + (6 (565 + 239 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (11 + 5 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (5 (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (4 + 5^Rational[1, 2] + (75 + 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (46 + 5 5^Rational[1, 2] + (1635 + 726 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (5 - 5^ Rational[1, 2] + (30 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (173 - 11 5^Rational[1, 2] + (6 (905 + 379 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 3 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (95 + 23 5^Rational[1, 2] + (9150 + 3930 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (7 - 3^Rational[1, 2] + 5^Rational[1, 2] - 15^ Rational[1, 2] - 2 (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[108781 - 23636 # - 150380 #^2 + 10736 #^3 + 59424 #^4 + 2176 #^5 - 7040 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (8 - 3^Rational[1, 2] + 2 5^Rational[1, 2] - 15^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[61 - 9568 # - 45904 #^2 + 7616 #^3 + 38784 #^4 + 768 #^5 - 6336 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (7 + 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (145 + 17 5^Rational[1, 2] + (30 (565 + 239 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (11 + 5 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (145 + 17 5^Rational[1, 2] + (30 (565 + 239 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (6 - 3^Rational[1, 2] - 15^ Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^Rational[1, 2]), Root[161281 - 63568 # - 394764 #^2 + 6016 #^3 + 118064 #^4 + 3328 #^5 - 10176 #^6 - 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (5 + 3 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (15 (11 + 3 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (13 + 3 5^Rational[1, 2] + (6 (85 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (15 (11 + 3 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}}, {{5.59240311112776, 0}, { 4.614255510393955, 0.20791169081775937`}, {2.19937934281628, 0.5744652010277582}, {3.5961815894837006`, 0.7956969431102324}, { 6.09240311112776, 0.8660254037844386}, {3.112924800458881, 0.9812018441035542}, {4.509727047126302, 1.2024335861860327`}, { 2.3039078060839335`, 1.5689870963960313`}, {5.423272504768902, 1.6091702292618328`}, {0, 1.7633557568774194`}, { 1, 1.7633557568774194`}, 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{2.598076211353316, 1}, { 2.598076211353316, 3}, {2.598076211353316, 4}, { 3.4641016151377544`, 0.5}, {3.4641016151377544`, 1.5}, { 3.4641016151377544`, 2.5}, {3.4641016151377544`, 3.5}, { 3.4641016151377544`, 4.5}, {4.330127018922193, 0}, { 4.330127018922193, 1}, {4.330127018922193, 3}, { 4.464101615137754, 1.5}, {4.464101615137754, 2.5}, { 5.330127018922193, 1}, {5.330127018922193, 3}, { 6.196152422706632, 1.5}, {6.196152422706632, 2.5}}], PolygonBox[{{8, 7, 12, 16, 17, 13}, {24, 23, 25, 27, 28, 26}, {12, 7, 5, 9}, {17, 16, 23, 24}, {8, 13, 10, 6}, {12, 15, 16}, {12, 11, 15}, {16, 15, 21}, {21, 15, 20}, {17, 18, 13}, {17, 22, 18}, {13, 18, 14}, {14, 18, 19}, {8, 3, 7}, {8, 4, 3}, {7, 3, 2}, {2, 3, 1}}]]}, "\"triaugmented hexagonal prism\""], Annotation[#, "triaugmented hexagonal prism", "Tooltip"]& ]], {196.36363636363637`, -5313.6}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{0, 3^Rational[1, 2]}, { Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { 1, 3^Rational[1, 2]}, { Rational[3, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 2], Rational[3, 2] 3^Rational[1, 2]}, {2, 0}, { 2, 3^Rational[1, 2]}, { Rational[5, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 2], Rational[3, 2] 3^Rational[1, 2]}, {3, 0}, { 3, 3^Rational[1, 2]}, {3, 2 3^Rational[1, 2]}, { Rational[7, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[7, 2], Rational[3, 2] 3^Rational[1, 2]}, {4, 0}, { Rational[9, 2], Rational[1, 2] 3^Rational[1, 2]}}, {{ 0, 1.7320508075688772`}, {0.5, 0.8660254037844386}, { 1, 1.7320508075688772`}, {1.5, 0.8660254037844386}, {1.5, 2.598076211353316}, {2, 0}, {2, 1.7320508075688772`}, {2.5, 0.8660254037844386}, {2.5, 2.598076211353316}, {3, 0}, { 3, 1.7320508075688772`}, {3, 3.4641016151377544`}, {3.5, 0.8660254037844386}, {3.5, 2.598076211353316}, {4, 0}, {4.5, 0.8660254037844386}}], PolygonBox[{{13, 15, 16}, {12, 9, 14}, {9, 11, 14}, {9, 7, 11}, {5, 7, 9}, {1, 2, 3}, {3, 2, 4}, {3, 4, 7}, {7, 4, 8}, {4, 6, 8}, {7, 8, 11}, {11, 8, 13}, {8, 10, 13}, {13, 10, 15}}]]}, "\"triaugmented triangular prism\""], Annotation[#, "triaugmented triangular prism", "Tooltip"]& ]], {589.0909090909091, -5313.6}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (-1 + 5 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (5 (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (97 + 31 5^Rational[1, 2] + (6 (425 + 181 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), Rational[ 1, 4] (317 + 139 5^Rational[1, 2] + 5 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 7 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (277 + 107 5^Rational[1, 2] + (8070 + 3534 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { 1 + Rational[3, 2] 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] (53 + 11 5^Rational[1, 2] - (390 - 114 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), 0}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (227 + 101 5^Rational[1, 2] + (6990 + 3126 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (187 + 77 5^Rational[1, 2] + (6 (925 + 409 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (287 + 121 5^Rational[1, 2] + (8670 + 3846 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[ 1, 4] (487 + 217 5^Rational[1, 2] + (15150 + 6774 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (218 + 94 5^Rational[1, 2] + 8 (6 (65 + 29 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (20 + 3^Rational[1, 2] + 12 5^Rational[1, 2] - 15^ Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[1, 8] (-1 + 5^Rational[1, 2] + 2 (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + ( 6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] + (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (15 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (86 + 25 5^Rational[1, 2] + (195 - 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (21 + 3^Rational[1, 2] + 11 5^Rational[1, 2] - 15^ Rational[ 1, 2] + (1 + 3^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Root[ 32761 + 116564 # - 709468 #^2 + 266672 #^3 + 217360 #^4 - 26432 #^5 - 15808 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (80 + 31 5^Rational[1, 2] + (2175 + 930 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (44 + 19 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[ 1, 4] (67 + 29 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Root[-3073199 + 152000 # + 3755008 #^2 + 234640 #^3 - 603456 #^4 + 39680 #^5 + 27712 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 91921 - 147392 # - 189184 #^2 + 163024 #^3 + 90384 #^4 - 28608 #^5 - 13056 #^6 + 256 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (19 + 3^Rational[1, 2] + 13 5^Rational[1, 2] - 15^ Rational[ 1, 2] + (1 + 3^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 8] ((1 + 3^Rational[1, 2]) (-1 + 5^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]) + 2 (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, { Root[761041 + 2548440 # + 1304248 #^2 - 543120 #^3 - 256896 #^4 + 70080 #^5 + 10432 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + ( 2 (86 + 25 5^Rational[1, 2] + (195 - 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (7 + 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), Rational[ 1, 4] (47 + 17 5^Rational[1, 2] + (6 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 32] (76 + 16 3^Rational[1, 2] + 52 5^Rational[1, 2] + 2 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + (1 + 4 3^Rational[1, 2] - 5^ Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^Rational[1, 2]), Rational[ 1, 4] (-2 + ( 2 (80 + 31 5^Rational[1, 2] + (2175 + 930 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[-10559 + 28570 # + 192162 #^2 + 18320 #^3 - 36496 #^4 + 2360 #^5 + 1728 #^6 - 320 #^7 + 16 #^8& , 8, 0], Root[ 85801 - 152392 # - 118200 #^2 + 157488 #^3 + 62304 #^4 - 40768 #^5 - 13120 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Rational[7, 2] + 2 5^Rational[1, 2], Rational[ 1, 4] (17 + 7 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 64] ((50 - 10 5^Rational[1, 2])^Rational[1, 2] + 9 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + ( 2 (3 + 4 3^Rational[1, 2])) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] + 8 (19 + 2 3^Rational[1, 2] + 13 5^Rational[1, 2])), Root[-27479 - 144348 # - 78112 #^2 + 123344 #^3 + 61200 #^4 - 28096 #^5 - 10752 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[6481 + 46134 # + 52514 #^2 + 1248 #^3 - 14176 #^4 + 216 #^5 + 1456 #^6 - 288 #^7 + 16 #^8& , 8, 0], Root[ 85801 - 152392 # - 118200 #^2 + 157488 #^3 + 62304 #^4 - 40768 #^5 - 13120 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[-252479 - 402952 # + 935720 #^2 + 827888 #^3 - 298496 #^4 - 87488 #^5 + 44480 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + ( 2 (86 + 25 5^Rational[1, 2] + (195 - 66 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[-479879 - 501920 # + 759208 #^2 + 502720 #^3 - 328016 #^4 - 16640 #^5 + 30592 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + ( 3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, { Rational[ 1, 64] ((50 - 10 5^Rational[1, 2])^ Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + ( 2 (3 + 4 3^Rational[1, 2])) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2] + 8 (19 + 3 3^Rational[1, 2] + 13 5^Rational[1, 2] + 15^Rational[1, 2])), Root[-7139 + 109868 # - 214592 #^2 + 65616 #^3 + 79840 #^4 - 24704 #^5 - 9792 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 8] (29 + 15 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 2] (Rational[5, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]}, { Root[932941 + 2960260 # + 2158752 #^2 - 147760 #^3 - 410416 #^4 + 23360 #^5 + 27648 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[-32399 - 83992 # + 55200 #^2 + 204048 #^3 + 48384 #^4 - 35968 #^5 - 11200 #^6 + 512 #^7 + 256 #^8& , 8, 0]}, { Root[-152339 - 318120 # + 793772 #^2 + 344080 #^3 - 268656 #^4 - 22400 #^5 + 30528 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 1 + 7092 # - 32300 #^2 + 23952 #^3 + 35904 #^4 - 17472 #^5 - 7040 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-1188059 - 155604 # + 5822540 #^2 - 543136 #^3 - 714336 #^4 + 112064 #^5 + 19200 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-10919 + 80036 # - 178776 #^2 + 75872 #^3 + 118944 #^4 - 35776 #^5 - 13504 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[1231441 + 2981660 # + 1961392 #^2 - 174560 #^3 - 395616 #^4 + 24320 #^5 + 27328 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[-18059 + 119552 # - 232560 #^2 + 107792 #^3 + 70224 #^4 - 29632 #^5 - 10240 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[439141 + 2773904 # + 2124844 #^2 - 513792 #^3 - 392816 #^4 + 71296 #^5 + 17856 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[-239 - 2488 # - 980 #^2 + 10752 #^3 + 5824 #^4 - 11072 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[439141 + 2773904 # + 2124844 #^2 - 513792 #^3 - 392816 #^4 + 71296 #^5 + 17856 #^6 - 4608 #^7 + 256 #^8& , 8, 0], Root[ 27961 + 51032 # - 250100 #^2 + 80832 #^3 + 120064 #^4 - 26432 #^5 - 11520 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { 17.448586971874736`, 8.102347534420836}, {17.383984821874737`, 7.903522582162797}, {17.13956997187474, 9.053404050715987}, { Root[3198721 + 8882580 # + 4473432 #^2 - 1167760 #^3 - 626336 #^4 + 108480 #^5 + 21568 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 3060 #^2 + 8992 #^3 + 1824 #^4 - 8192 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[3198721 + 8882580 # + 4473432 #^2 - 1167760 #^3 - 626336 #^4 + 108480 #^5 + 21568 #^6 - 5120 #^7 + 256 #^8& , 8, 0], Root[ 4441 - 26648 # - 100500 #^2 + 82912 #^3 + 169824 #^4 - 31232 #^5 - 14080 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { 16.97724818187474, 6.9899771245201965`}, {16.872719721874738`, 6.808928515303517}, { Root[-20399 + 3875776 # + 5173660 #^2 + 290544 #^3 - 793136 #^4 + 15104 #^5 + 41280 #^6 - 6144 #^7 + 256 #^8& , 8, 0], Root[ 181 + 8596 # - 21276 #^2 + 7312 #^3 + 12864 #^4 - 5696 #^5 - 2944 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {16.470439711874736`, 8.310259225238596}, {16.396425151874737`, 9.722534657074846}, { 16.227294541874738`, 9.845415235381887}, { Root[-750539 - 687116 # + 3572104 #^2 + 1797488 #^3 - 648096 #^4 - 142784 #^5 + 64576 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 3060 #^2 + 8992 #^3 + 1824 #^4 - 8192 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-750539 - 687116 # + 3572104 #^2 + 1797488 #^3 - 648096 #^4 - 142784 #^5 + 64576 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Root[ 4441 - 26648 # - 100500 #^2 + 82912 #^3 + 169824 #^4 - 31232 #^5 - 14080 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { 16.063702721874737`, 7.3967137675959975`}, {15.959174261874736`, 6.402191872227717}, { Root[8734501 + 21494796 # + 14262240 #^2 + 803024 #^3 - 1414496 #^4 - 37056 #^5 + 64000 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[-70859 + 572928 # - 881372 #^2 + 147696 #^3 + 213360 #^4 - 34944 #^5 - 14912 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {15.727294541874738`, 8.979389831597448}, { Root[1983661 + 19304320 # + 23396188 #^2 + 5202400 #^3 - 1999376 #^4 - 244160 #^5 + 100672 #^6 - 8960 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + ( 2 (46 + 5 5^Rational[1, 2] + (435 - 186 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[-21976839 - 9790632 # + 30756780 #^2 + 6028128 #^3 - 2941776 #^4 - 42048 #^5 + 83520 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Rational[ 1, 2] (-1 + (28 + 10 5^Rational[1, 2] - 2 (75 + 30 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2])}, { Root[-1024319 + 3399600 # + 8869852 #^2 + 2320800 #^3 - 1138096 #^4 - 128640 #^5 + 72128 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Root[-239 - 2488 # - 980 #^2 + 10752 #^3 + 5824 #^4 - 11072 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[-1024319 + 3399600 # + 8869852 #^2 + 2320800 #^3 - 1138096 #^4 - 128640 #^5 + 72128 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Root[ 27961 + 51032 # - 250100 #^2 + 80832 #^3 + 120064 #^4 - 26432 #^5 - 11520 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { 15.227294541874738`, 9.845415235381887}, { Root[-1589999 + 26295876 # + 34363700 #^2 - 330416 #^3 - 2618496 #^4 + 157504 #^5 + 55680 #^6 - 7424 #^7 + 256 #^8& , 8, 0], Root[ 4201 - 11312 # - 50072 #^2 + 27696 #^3 + 36160 #^4 - 11584 #^5 - 5952 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {15.069180831874736`, 7.501242230863647}, { Root[54753661 + 101524848 # + 48240940 #^2 - 368832 #^3 - 3198096 #^4 + 69312 #^5 + 78400 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + ( 2 (76 + 13 5^Rational[1, 2] + (1095 - 474 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2])}, { Root[14353141 + 35423784 # + 19650924 #^2 - 1013552 #^3 - 1792496 #^4 + 95616 #^5 + 53056 #^6 - 7168 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-3 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, {14.964652361874737`, 6.506720335495377}, { Root[-34503479 - 10685508 # + 32488528 #^2 + 4788624 #^3 - 2837920 #^4 - 33216 #^5 + 82688 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[-7139 + 46420 # - 101012 #^2 + 68960 #^3 + 22224 #^4 - 24320 #^5 - 4928 #^6 + 1280 #^7 + 256 #^8& , 7, 0]}, { 14.861269141874736`, 8.479389831597448}, { Root[573421 + 38537368 # + 35266016 #^2 + 3423904 #^3 - 2842976 #^4 - 55168 #^5 + 88064 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-2 + (103 + 25 5^Rational[1, 2] - (1230 - 426 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2])}, {14.361269136874736`, 9.345415235381887}, { Root[72724261 + 110482124 # + 45747424 #^2 - 1084272 #^3 - 3019616 #^4 + 60736 #^5 + 78336 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[-43859 + 354592 # - 524460 #^2 + 69232 #^3 + 116784 #^4 - 17792 #^5 - 9280 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {14.192140327674736`, 9.222534657074846}, { Root[44798161 + 80354200 # + 34213672 #^2 - 2670240 #^3 - 2531456 #^4 + 155840 #^5 + 59328 #^6 - 7680 #^7 + 256 #^8& , 8, 0], Root[ 25681 - 10088 # - 72380 #^2 + 46032 #^3 + 30784 #^4 - 15232 #^5 - 5760 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {14.155635369874737`, 7.094505587787847}, { Root[-54556475 + 13794600 # + 56122800 #^2 + 4814000 #^3 - 3905840 #^4 + 16320 #^5 + 90880 #^6 - 8960 #^7 + 256 #^8& , 8, 0], Root[ 21841 - 5900 # - 108772 #^2 + 84880 #^3 + 25744 #^4 - 21760 #^5 - 4288 #^6 + 1280 #^7 + 256 #^8& , 5, 0]}, {14.091033226874739`, 7.293330540045886}, { Root[-8604059 + 37815024 # + 34937772 #^2 + 2399392 #^3 - 2754800 #^4 - 45312 #^5 + 87232 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Root[-17579 + 99700 # - 165008 #^2 + 66800 #^3 + 36384 #^4 - 19520 #^5 - 4352 #^6 + 1280 #^7 + 256 #^8& , 7, 0]}, { Root[10145581 + 31241352 # + 22006288 #^2 + 1429584 #^3 - 2058160 #^4 - 71616 #^5 + 82688 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[ 21841 - 5900 # - 108772 #^2 + 84880 #^3 + 25744 #^4 - 21760 #^5 - 4288 #^6 + 1280 #^7 + 256 #^8& , 5, 0]}, {13.883121535874736`, 8.271478140779697}, { Root[13346161 + 45440296 # + 34287820 #^2 + 2616704 #^3 - 2663856 #^4 - 64256 #^5 + 88000 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Root[-16139 + 99016 # - 150836 #^2 + 22272 #^3 + 50944 #^4 - 10816 #^5 - 6144 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[13346161 + 45440296 # + 34287820 #^2 + 2616704 #^3 - 2663856 #^4 - 64256 #^5 + 88000 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Root[-129539 - 502552 # - 463572 #^2 + 231296 #^3 + 322560 #^4 - 53824 #^5 - 20992 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {13.464652363874738`, 8.045562104082997}, { 13.260163832874738`, 9.991140515746427}, { Root[-1292159 + 14409384 # + 26535624 #^2 + 7544288 #^3 - 2134016 #^4 - 375744 #^5 + 120256 #^6 - 9728 #^7 + 256 #^8& , 8, 0], Root[ 25681 - 10088 # - 72380 #^2 + 46032 #^3 + 30784 #^4 - 15232 #^5 - 5760 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {13.155635369874737`, 7.094505587787847}, {13.155635369874737`, 8.996618620378158}, { Root[14346481 + 41887288 # + 30487496 #^2 + 1757824 #^3 - 2613776 #^4 - 37888 #^5 + 86144 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Root[-1259 - 36964 # - 71780 #^2 + 80784 #^3 + 19504 #^4 - 21056 #^5 - 2880 #^6 + 1536 #^7 + 256 #^8& , 6, 0]}, { Root[17199621 + 33797088 # + 19507500 #^2 + 677808 #^3 - 1919376 #^4 - 65088 #^5 + 81600 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[ 36661 - 71112 # - 34064 #^2 + 90144 #^3 + 11424 #^4 - 21888 #^5 - 2816 #^6 + 1536 #^7 + 256 #^8& , 5, 0]}, { Root[-20634359 + 30428176 # + 35372560 #^2 + 2846624 #^3 - 2852256 #^4 - 27776 #^5 + 86080 #^6 - 8704 #^7 + 256 #^8& , 8, 0], Root[ 1201 - 14076 # - 59676 #^2 + 83888 #^3 + 5344 #^4 - 23424 #^5 - 1664 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Root[8924581 + 49849320 # + 50752172 #^2 + 9150320 #^3 - 3331056 #^4 - 350080 #^5 + 130368 #^6 - 10240 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-3 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}, {12.346618381874737`, 6.506720335495377}, {12.346618381874737`, 9.584403872670627}, { Root[-27537119 - 1409076 # + 26945484 #^2 + 8247008 #^3 - 2420816 #^4 - 333504 #^5 + 118336 #^6 - 9728 #^7 + 256 #^8& , 8, 0], Root[ 9661 - 38292 # + 19020 #^2 + 57248 #^3 - 24416 #^4 - 26688 #^5 - 1280 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Root[18930721 + 46206236 # + 35206900 #^2 + 6298224 #^3 - 2379776 #^4 - 370496 #^5 + 124800 #^6 - 9984 #^7 + 256 #^8& , 8, 0], Root[ 4201 - 11312 # - 50072 #^2 + 27696 #^3 + 36160 #^4 - 11584 #^5 - 5952 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[48043741 + 77476520 # + 35927708 #^2 - 99280 #^3 - 2822096 #^4 - 19520 #^5 + 89792 #^6 - 8960 #^7 + 256 #^8& , 8, 0], Root[-1979 - 20872 # - 39464 #^2 + 57984 #^3 + 18544 #^4 - 21248 #^5 - 3456 #^6 + 1536 #^7 + 256 #^8& , 6, 0]}, { Root[128328481 + 217733024 # + 96410524 #^2 + 220768 #^3 - 5125296 #^4 + 58496 #^5 + 104896 #^6 - 9728 #^7 + 256 #^8& , 8, 0], Root[-239 - 2488 # - 980 #^2 + 10752 #^3 + 5824 #^4 - 11072 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[128328481 + 217733024 # + 96410524 #^2 + 220768 #^3 - 5125296 #^4 + 58496 #^5 + 104896 #^6 - 9728 #^7 + 256 #^8& , 8, 0], Root[ 27961 + 51032 # - 250100 #^2 + 80832 #^3 + 120064 #^4 - 26432 #^5 - 11520 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[18226081 + 59149308 # + 40948960 #^2 - 1528992 #^3 - 3263616 #^4 + 156672 #^5 + 72640 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[ 39901 - 63512 # - 44964 #^2 + 78064 #^3 + 7584 #^4 - 20288 #^5 - 2176 #^6 + 1536 #^7 + 256 #^8& , 7, 0]}, { Root[-42987239 + 52458284 # + 48531064 #^2 - 633312 #^3 - 3491216 #^4 + 165376 #^5 + 72576 #^6 - 8448 #^7 + 256 #^8& , 8, 0], Root[ 24721 - 52712 # - 24220 #^2 + 81088 #^3 - 2256 #^4 - 21888 #^5 - 960 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-21266039 - 21086384 # + 11478064 #^2 + 11937312 #^3 - 1099616 #^4 - 741376 #^5 + 154176 #^6 - 10752 #^7 + 256 #^8& , 8, 0], Root[ 1201 - 14076 # - 59676 #^2 + 83888 #^3 + 5344 #^4 - 23424 #^5 - 1664 #^6 + 1792 #^7 + 256 #^8& , 8, 0]}, { Root[7960501 + 72191716 # + 73494880 #^2 + 6540144 #^3 - 4682336 #^4 - 87616 #^5 + 115200 #^6 - 9984 #^7 + 256 #^8& , 8, 0], Root[-70859 + 572928 # - 881372 #^2 + 147696 #^3 + 213360 #^4 - 34944 #^5 - 14912 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {11.346618381874737`, 6.506720335495377}, { 11.346618381874737`, 9.584403872670627}, { Root[297812581 + 412104220 # + 150222952 #^2 - 2894320 #^3 - 6792096 #^4 + 145600 #^5 + 113728 #^6 - 10240 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 3060 #^2 + 8992 #^3 + 1824 #^4 - 8192 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[297812581 + 412104220 # + 150222952 #^2 - 2894320 #^3 - 6792096 #^4 + 145600 #^5 + 113728 #^6 - 10240 #^7 + 256 #^8& , 8, 0], Root[ 4441 - 26648 # - 100500 #^2 + 82912 #^3 + 169824 #^4 - 31232 #^5 - 14080 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[129250801 + 263129616 # + 144307740 #^2 + 10746704 #^3 - 6683696 #^4 - 251136 #^5 + 151360 #^6 - 11264 #^7 + 256 #^8& , 8, 0], Root[ 181 + 8596 # - 21276 #^2 + 7312 #^3 + 12864 #^4 - 5696 #^5 - 2944 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, {10.537601381874737`, 7.094505587787847}, {10.537601381874737`, 8.996618620378158}, { Root[32012161 + 130115644 # + 118625464 #^2 + 23082768 #^3 - 5437856 #^4 - 766144 #^5 + 192576 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[ 1 - 8 # - 3060 #^2 + 8992 #^3 + 1824 #^4 - 8192 #^5 - 2560 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[32012161 + 130115644 # + 118625464 #^2 + 23082768 #^3 - 5437856 #^4 - 766144 #^5 + 192576 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Root[ 4441 - 26648 # - 100500 #^2 + 82912 #^3 + 169824 #^4 - 31232 #^5 - 14080 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { 10.228575641874738`, 8.045562104082997}, {17.996231811874736`, 6.550185714546207}, { Root[116424661 + 292367040 # + 196265132 #^2 + 26928640 #^3 - 7821936 #^4 - 725120 #^5 + 205248 #^6 - 12800 #^7 + 256 #^8& , 8, 0], Root[-239 - 2488 # - 980 #^2 + 10752 #^3 + 5824 #^4 - 11072 #^5 - 3840 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[116424661 + 292367040 # + 196265132 #^2 + 26928640 #^3 - 7821936 #^4 - 725120 #^5 + 205248 #^6 - 12800 #^7 + 256 #^8& , 8, 0], Root[ 27961 + 51032 # - 250100 #^2 + 80832 #^3 + 120064 #^4 - 26432 #^5 - 11520 #^6 + 768 #^7 + 256 #^8& , 8, 0]}, { Root[675739261 + 901248824 # + 335067244 #^2 + 7441968 #^3 - 11586416 #^4 - 78464 #^5 + 173376 #^6 - 12288 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-3 - 5^ Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 2 (3 (39 + 17 5^Rational[1, 2] + (6 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2])}}, {{ 0, 5.3865332128413606`}, {0.30901699437494745`, 4.435476696546207}, {0.30901699437494745`, 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256 #^8& , 6, 0]}, { Rational[ 1, 4] (-2 + (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]), Root[ 1741 - 5732 # - 704 #^2 + 19344 #^3 - 18656 #^4 - 448 #^5 + 6144 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Rational[ 1, 2] (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Root[-2879 + 3840 # + 16752 #^2 - 8480 #^3 - 22496 #^4 + 5760 #^5 + 6208 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[-239 + 240 # + 1812 #^2 - 80 #^3 - 3776 #^4 - 1920 #^5 + 1408 #^6 + 1280 #^7 + 256 #^8& , 8, 0], Root[ 421 - 424 # - 15300 #^2 + 37424 #^3 - 26256 #^4 + 704 #^5 + 6080 #^6 - 2304 #^7 + 256 #^8& , 6, 0]}, { Root[-59 - 164 # + 360 #^2 + 1424 #^3 + 704 #^4 - 1216 #^5 - 960 #^6 + 256 #^7 + 256 #^8& , 7, 0], Root[ 121 + 440 # - 4392 #^2 - 18560 #^3 - 14416 #^4 + 10240 #^5 + 4992 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[ 1, 4] (13 + 5 5^Rational[1, 2] + (150 + 66 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2], Root[ 1 + 16 # + 40 #^2 - 156 #^3 - 536 #^4 - 16 #^5 + 360 #^6 - 144 #^7 + 16 #^8& , 8, 0]}, { Root[61 - 516 # + 720 #^2 + 2336 #^3 - 2336 #^4 - 4224 #^5 - 320 #^6 + 1024 #^7 + 256 #^8& , 8, 0], Root[-1499 - 5132 # + 11556 #^2 + 14704 #^3 - 25056 #^4 + 3712 #^5 + 5504 #^6 - 2304 #^7 + 256 #^8& , 5, 0]}, { Root[1 - 16 # - 60 #^2 + 256 #^3 + 944 #^4 + 256 #^5 - 960 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 1 - 10 # + 8 #^2 + 50 #^3 - 66 #^4 + 27 #^6 - 10 #^7 + #^8& , 8, 0]}, {Root[ 61 + 4 # - 500 #^2 - 64 #^3 + 1344 #^4 + 256 #^5 - 1280 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 61 - 352 # - 144 #^2 + 2864 #^3 - 2016 #^4 - 5248 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[-239 - 940 # - 332 #^2 + 2400 #^3 + 2224 #^4 - 1280 #^5 - 1728 #^6 + 256 #^8& , 8, 0], Root[ 661 - 6784 # + 15324 #^2 - 5408 #^3 - 11776 #^4 + 7744 #^5 + 1536 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[121 + 660 # + 12 #^2 - 6080 #^3 - 13376 #^4 - 9600 #^5 - 512 #^6 + 1280 #^7 + 256 #^8& , 8, 0], Root[ 241 - 1504 # - 560 #^2 + 10224 #^3 - 8096 #^4 - 4736 #^5 + 6720 #^6 - 2304 #^7 + 256 #^8& , 5, 0]}, { Root[25 - 1900 # - 2400 #^2 + 4400 #^3 + 5520 #^4 - 1600 #^5 - 2560 #^6 + 256 #^8& , 8, 0], Root[-1259 - 7316 # + 24444 #^2 - 11232 #^3 - 15696 #^4 + 10816 #^5 + 1856 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Root[-2879 + 11060 # - 9632 #^2 - 8640 #^3 + 13024 #^4 + 640 #^5 - 3648 #^6 + 256 #^8& , 8, 0], Root[ 61 + 356 # + 84 #^2 - 1968 #^3 - 1056 #^4 + 3584 #^5 + 896 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 1060 # - 908 #^2 + 7200 #^3 + 7264 #^4 - 2240 #^5 - 3072 #^6 + 256 #^8& , 8, 0], Root[ 1 + 24 # + 80 #^2 - 624 #^3 - 1216 #^4 + 1536 #^5 + 1600 #^6 - 1536 #^7 + 256 #^8& , 8, 0]}, { Root[-419 - 6212 # - 19820 #^2 + 21488 #^3 + 15984 #^4 - 7808 #^5 - 4160 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[ 1 - 24 # + 164 #^2 - 208 #^3 - 1056 #^4 + 2624 #^5 - 384 #^6 - 1792 #^7 + 256 #^8& , 8, 0]}, { Root[-419 - 6212 # - 19820 #^2 + 21488 #^3 + 15984 #^4 - 7808 #^5 - 4160 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[-1619 + 4080 # + 7252 #^2 - 39120 #^3 + 60704 #^4 - 47040 #^5 + 19328 #^6 - 3840 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 20 # + 112 #^2 - 1376 #^4 - 3200 #^5 - 2112 #^6 + 256 #^8& , 8, 0], Root[ 121 - 44 # - 1500 #^2 + 2224 #^3 + 2784 #^4 - 8576 #^5 + 7040 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[1 - 1416 # + 4460 #^2 + 7936 #^3 - 11376 #^4 - 15104 #^5 - 2880 #^6 + 1024 #^7 + 256 #^8& , 8, 0], Root[ 1 + 8 # - 44 #^2 - 156 #^3 + 664 #^4 - 848 #^5 + 504 #^6 - 144 #^7 + 16 #^8& , 5, 0]}, { Root[61 - 760 # - 2492 #^2 + 7680 #^3 + 6544 #^4 - 4160 #^5 - 3648 #^6 + 256 #^8& , 8, 0], Root[-239 - 1064 # + 2700 #^2 + 3424 #^3 - 6816 #^4 - 896 #^5 + 5120 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 416 # - 380 #^2 + 2096 #^3 + 3264 #^4 - 1664 #^5 - 3200 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 1 + 8 # - 164 #^2 - 336 #^3 + 4144 #^4 - 8768 #^5 + 7104 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Root[181 + 1400 # + 3652 #^2 + 2880 #^3 - 2816 #^4 - 6080 #^5 - 3072 #^6 + 256 #^8& , 8, 0], Root[ 1 + 80 # - 108 #^2 - 2160 #^3 + 8784 #^4 - 13120 #^5 + 8768 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[541 + 1680 # - 8888 #^2 + 1920 #^3 + 12224 #^4 - 2880 #^5 - 4672 #^6 + 256 #^8& , 8, 0], Root[-59 + 1196 # - 3680 #^2 + 2064 #^3 + 6304 #^4 - 11456 #^5 + 7680 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Root[181 - 3392 # + 2440 #^2 + 12848 #^3 - 2976 #^4 - 12608 #^5 - 4160 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[-59 + 896 # - 4580 #^2 + 10464 #^3 - 10496 #^4 + 1984 #^5 + 3840 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[181 - 3392 # + 2440 #^2 + 12848 #^3 - 2976 #^4 - 12608 #^5 - 4160 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[ 1 + 64 # - 356 #^2 - 832 #^3 + 8064 #^4 - 16064 #^5 + 11776 #^6 - 3328 #^7 + 256 #^8& , 8, 0]}, { Root[-719 + 264 # + 14720 #^2 + 17536 #^3 - 16416 #^4 - 22784 #^5 - 4800 #^6 + 1024 #^7 + 256 #^8& , 8, 0], Root[-59 - 100 # + 688 #^2 + 400 #^3 - 2016 #^4 + 320 #^5 + 1792 #^6 - 1280 #^7 + 256 #^8& , 5, 0]}, { Root[1 + 64 # - 1160 #^2 + 3536 #^3 + 3264 #^4 - 4544 #^5 - 4160 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 61 - 120 # - 1492 #^2 + 2000 #^3 + 5184 #^4 - 12160 #^5 + 8832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 368 # + 1280 #^2 - 3952 #^3 - 15936 #^4 - 16128 #^5 - 4800 #^6 + 512 #^7 + 256 #^8& , 8, 0], Root[-59 + 864 # - 3460 #^2 + 5056 #^3 - 96 #^4 - 7424 #^5 + 7680 #^6 - 2816 #^7 + 256 #^8& , 8, 0]}, { Root[181 - 852 # - 3364 #^2 + 13024 #^3 + 1824 #^4 - 12608 #^5 - 5376 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-179 - 1972 # + 4236 #^2 + 5504 #^3 - 12336 #^4 + 2432 #^5 + 4544 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[421 - 1744 # - 4436 #^2 + 8272 #^3 + 13584 #^4 - 256 #^5 - 4544 #^6 - 512 #^7 + 256 #^8& , 8, 0], Root[ 1 - 16 # - 128 #^2 + 1392 #^3 + 400 #^4 - 7232 #^5 + 6912 #^6 - 2304 #^7 + 256 #^8& , 8, 0]}, { Root[241 + 780 # - 12788 #^2 + 7200 #^3 + 19184 #^4 - 4800 #^5 - 6592 #^6 + 256 #^8& , 8, 0], Root[ 1 - 10 # + 22 #^2 + 40 #^3 - 156 #^4 + 80 #^5 + 88 #^6 - 80 #^7 + 16 #^8& , 7, 0]}, { Root[61 + 1896 # + 4220 #^2 - 2816 #^3 - 15696 #^4 - 15296 #^5 - 4800 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-59 + 740 # - 3132 #^2 + 4800 #^3 + 864 #^4 - 9280 #^5 + 8192 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[121 + 3036 # + 21000 #^2 + 45344 #^3 + 21424 #^4 - 13056 #^5 - 7040 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[-59 + 436 # - 540 #^2 - 3056 #^3 + 10704 #^4 - 13376 #^5 + 8000 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Root[601 + 5984 # - 27300 #^2 + 11056 #^3 + 28784 #^4 - 2624 #^5 - 6720 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 8641 + 16952 # - 90244 #^2 + 66896 #^3 + 31104 #^4 - 54912 #^5 + 23424 #^6 - 4096 #^7 + 256 #^8& , 8, 0]}, { Root[-179 + 2584 # - 5216 #^2 - 12432 #^3 + 27664 #^4 + 7616 #^5 - 6144 #^6 - 768 #^7 + 256 #^8& , 8, 0], Root[-359 - 752 # + 2496 #^2 + 3904 #^3 - 6336 #^4 - 3968 #^5 + 6464 #^6 - 2304 #^7 + 256 #^8& , 7, 0]}, { Rational[1, 2] Root[-3599 - 4258 # + 1255 #^2 + 2842 #^3 + 549 #^4 - 292 #^5 - 95 #^6 - 2 #^7 + #^8& , 8, 0], Root[ 421 + 2372 # - 11300 #^2 + 6672 #^3 + 16864 #^4 - 25472 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[421 + 4464 # + 14940 #^2 + 17536 #^3 + 1264 #^4 - 10944 #^5 - 6080 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 48661 - 121532 # + 10556 #^2 + 132304 #^3 - 70176 #^4 - 12288 #^5 + 15744 #^6 - 3584 #^7 + 256 #^8& , 7, 0]}, { Root[421 + 4464 # + 14940 #^2 + 17536 #^3 + 1264 #^4 - 10944 #^5 - 6080 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[-4799 + 15828 # + 19580 #^2 - 124752 #^3 + 168224 #^4 - 102528 #^5 + 31360 #^6 - 4608 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[14221 - 3888 # - 9465 #^2 + 1742 #^3 + 1879 #^4 - 162 #^5 - 125 #^6 - 2 #^7 + #^8& , 8, 0], 1 + Root[8641 + 16952 # - 90244 #^2 + 66896 #^3 + 31104 #^4 - 54912 #^5 + 23424 #^6 - 4096 #^7 + 256 #^8& , 8, 0]}, { Root[361 + 3876 # + 8000 #^2 - 5696 #^3 - 27456 #^4 - 23936 #^5 - 6720 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 661 + 19132 # - 62700 #^2 + 63232 #^3 - 11616 #^4 - 18752 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[361 + 3876 # + 8000 #^2 - 5696 #^3 - 27456 #^4 - 23936 #^5 - 6720 #^6 + 256 #^7 + 256 #^8& , 8, 0], Root[ 541 + 1292 # - 18300 #^2 + 25472 #^3 + 864 #^4 - 20032 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Root[8821 + 25340 # - 14408 #^2 - 40160 #^3 + 15264 #^4 + 15680 #^5 - 5312 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[-10559 - 40042 # + 112095 #^2 - 96742 #^3 + 38994 #^4 - 8128 #^5 + 890 #^6 - 48 #^7 + #^8& , 8, 0]}, { Root[-59 - 276 # + 1920 #^2 + 4096 #^3 - 8576 #^4 - 17664 #^5 - 8000 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[-43439 + 158752 # - 223940 #^2 + 142992 #^3 - 23936 #^4 - 20992 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 6, 0]}, { Root[-59 - 276 # + 1920 #^2 + 4096 #^3 - 8576 #^4 - 17664 #^5 - 8000 #^6 - 256 #^7 + 256 #^8& , 8, 0], Root[ 3481 - 20768 # + 7500 #^2 + 41872 #^3 - 35136 #^4 - 4352 #^5 + 10880 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Root[-59 - 276 # + 1920 #^2 + 4096 #^3 - 8576 #^4 - 17664 #^5 - 8000 #^6 - 256 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[8641 + 16952 # - 90244 #^2 + 66896 #^3 + 31104 #^4 - 54912 #^5 + 23424 #^6 - 4096 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 1100 # - 2228 #^2 - 3920 #^3 + 7824 #^4 + 3200 #^5 - 5312 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Rational[1, 2] Root[-3539 + 14270 # - 13077 #^2 - 5870 #^3 + 10094 #^4 - 3740 #^5 + 582 #^6 - 40 #^7 + #^8& , 8, 0]}, { Root[-359 - 1684 # + 7360 #^2 - 1536 #^3 - 13376 #^4 + 10624 #^5 + 960 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-43439 + 158752 # - 223940 #^2 + 142992 #^3 - 23936 #^4 - 20992 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 6, 0]}, { Root[-359 - 1684 # + 7360 #^2 - 1536 #^3 - 13376 #^4 + 10624 #^5 + 960 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 3481 - 20768 # + 7500 #^2 + 41872 #^3 - 35136 #^4 - 4352 #^5 + 10880 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Root[-359 - 1684 # + 7360 #^2 - 1536 #^3 - 13376 #^4 + 10624 #^5 + 960 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Rational[1, 2] + Root[8641 + 16952 # - 90244 #^2 + 66896 #^3 + 31104 #^4 - 54912 #^5 + 23424 #^6 - 4096 #^7 + 256 #^8& , 8, 0]}, { Root[1741 + 20120 # - 39928 #^2 - 14800 #^3 + 34624 #^4 + 5440 #^5 - 8512 #^6 - 1280 #^7 + 256 #^8& , 8, 0], Root[-1979 - 10840 # + 15468 #^2 + 16080 #^3 - 25536 #^4 + 3200 #^5 + 6272 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[-59 + 296 # + 480 #^2 - 2896 #^3 - 1056 #^4 + 5504 #^5 + 320 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-21419 + 100860 # - 184932 #^2 + 166000 #^3 - 69536 #^4 + 3840 #^5 + 7552 #^6 - 2560 #^7 + 256 #^8& , 4, 0]}, { Root[961 + 744 # - 29876 #^2 + 29088 #^3 + 44784 #^4 - 10944 #^5 - 12224 #^6 - 768 #^7 + 256 #^8& , 8, 0], Root[-59 + 740 # - 3132 #^2 + 4800 #^3 + 864 #^4 - 9280 #^5 + 8192 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[3361 - 21156 # + 31920 #^2 + 5216 #^3 - 37376 #^4 + 16896 #^5 + 3520 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 661 + 19132 # - 62700 #^2 + 63232 #^3 - 11616 #^4 - 18752 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[3361 - 21156 # + 31920 #^2 + 5216 #^3 - 37376 #^4 + 16896 #^5 + 3520 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[ 541 + 1292 # - 18300 #^2 + 25472 #^3 + 864 #^4 - 20032 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[-4799 + 17598 # + 8695 #^2 - 11262 #^3 - 91 #^4 + 972 #^5 - 55 #^6 - 18 #^7 + #^8& , 8, 0], Root[ 421 + 2372 # - 11300 #^2 + 6672 #^3 + 16864 #^4 - 25472 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[-7559 + 28816 # - 3496 #^2 - 59408 #^3 + 30784 #^4 + 19904 #^5 - 7744 #^6 - 1792 #^7 + 256 #^8& , 8, 0], Root[-839 - 28360 # + 58548 #^2 - 5760 #^3 - 40896 #^4 + 15680 #^5 + 4352 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[1 + 64 # - 9424 #^3 - 8416 #^4 + 10496 #^5 + 2880 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-179 + 7340 # - 39612 #^2 + 67360 #^3 - 42976 #^4 + 3520 #^5 + 6912 #^6 - 2560 #^7 + 256 #^8& , 6, 0]}, { Root[200701 - 748284 # + 939400 #^2 - 410496 #^3 - 38176 #^4 + 66624 #^5 - 7360 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 121 - 3388 # - 420 #^2 + 16112 #^3 - 7776 #^4 - 11392 #^5 + 10880 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] Root[-3539 - 28158 # + 31796 #^2 - 764 #^3 - 5076 #^4 + 868 #^5 + 99 #^6 - 26 #^7 + #^8& , 8, 0], Root[-43439 + 158752 # - 223940 #^2 + 142992 #^3 - 23936 #^4 - 20992 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 6, 0]}, { Root[-14219 - 20176 # + 100940 #^2 - 56224 #^3 - 39056 #^4 + 31936 #^5 + 320 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-59 + 740 # - 3132 #^2 + 4800 #^3 + 864 #^4 - 9280 #^5 + 8192 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[81 - 5184 # + 87480 #^2 - 143856 #^3 + 19584 #^4 + 39744 #^5 - 6720 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[ 61 - 120 # - 1492 #^2 + 2000 #^3 + 5184 #^4 - 12160 #^5 + 8832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[81 - 5184 # + 87480 #^2 - 143856 #^3 + 19584 #^4 + 39744 #^5 - 6720 #^6 - 2304 #^7 + 256 #^8& , 8, 0], Root[-1979 - 10840 # + 15468 #^2 + 16080 #^3 - 25536 #^4 + 3200 #^5 + 6272 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Rational[1, 2] (3 + 5^Rational[1, 2] + Root[-59 + 550 # - 557 #^2 - 490 #^3 + 489 #^4 + 100 #^5 - 83 #^6 - 10 #^7 + #^8& , 8, 0]), Root[ 421 + 2372 # - 11300 #^2 + 6672 #^3 + 16864 #^4 - 25472 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[603961 - 1938396 # + 2031960 #^2 - 682144 #^3 - 119456 #^4 + 98496 #^5 - 6080 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-1619 - 2048 # + 13860 #^2 + 7072 #^3 - 29376 #^4 + 2368 #^5 + 8960 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}, { Root[-45179 + 26420 # + 405952 #^2 - 78720 #^3 - 156416 #^4 + 44800 #^5 + 9408 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Root[ 661 + 19132 # - 62700 #^2 + 63232 #^3 - 11616 #^4 - 18752 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[-24659 - 222220 # + 563692 #^2 - 159840 #^3 - 156416 #^4 + 52480 #^5 + 8448 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (1 + 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2])}, { Root[-26459 + 6104 # + 277160 #^2 - 330544 #^3 - 6656 #^4 + 66496 #^5 - 5440 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[-26459 + 6104 # + 277160 #^2 - 330544 #^3 - 6656 #^4 + 66496 #^5 - 5440 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[-26459 + 6104 # + 277160 #^2 - 330544 #^3 - 6656 #^4 + 66496 #^5 - 5440 #^6 - 2816 #^7 + 256 #^8& , 8, 0], Root[-839 - 28360 # + 58548 #^2 - 5760 #^3 - 40896 #^4 + 15680 #^5 + 4352 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[373381 - 1198280 # + 1111428 #^2 - 118880 #^3 - 218256 #^4 + 64000 #^5 + 7232 #^6 - 3840 #^7 + 256 #^8& , 8, 0], 0}, { Root[78541 - 494160 # + 676732 #^2 - 144000 #^3 - 179856 #^4 + 66240 #^5 + 6208 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[499621 - 1169864 # + 548600 #^2 + 356944 #^3 - 304256 #^4 + 25664 #^5 + 21440 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 1 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[499621 - 1169864 # + 548600 #^2 + 356944 #^3 - 304256 #^4 + 25664 #^5 + 21440 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 5 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[499621 - 1169864 # + 548600 #^2 + 356944 #^3 - 304256 #^4 + 25664 #^5 + 21440 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-839 - 28360 # + 58548 #^2 - 5760 #^3 - 40896 #^4 + 15680 #^5 + 4352 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[15025 - 199900 # + 444100 #^2 - 111600 #^3 - 131360 #^4 + 52480 #^5 + 5760 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (-1 - 5^ Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[17041 - 469080 # + 704368 #^2 - 184560 #^3 - 141216 #^4 + 61440 #^5 + 4672 #^6 - 3840 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-1 + (15 + 6 5^Rational[1, 2])^Rational[1, 2])}, { Root[644221 - 2209656 # + 1460920 #^2 + 477936 #^3 - 490176 #^4 + 40896 #^5 + 26560 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[ 61 - 120 # - 1492 #^2 + 2000 #^3 + 5184 #^4 - 12160 #^5 + 8832 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[644221 - 2209656 # + 1460920 #^2 + 477936 #^3 - 490176 #^4 + 40896 #^5 + 26560 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[-1979 - 10840 # + 15468 #^2 + 16080 #^3 - 25536 #^4 + 3200 #^5 + 6272 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[440101 - 1223372 # + 699596 #^2 + 230944 #^3 - 259376 #^4 + 25472 #^5 + 19904 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[ 1, 4] (-1 + ( 3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[914881 - 2161764 # + 1382220 #^2 + 157264 #^3 - 387056 #^4 + 71424 #^5 + 16960 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-59 - 272 # + 1796 #^2 - 416 #^3 - 5696 #^4 + 5312 #^5 - 256 #^6 - 1024 #^7 + 256 #^8& , 7, 0]}, { Root[914881 - 2161764 # + 1382220 #^2 + 157264 #^3 - 387056 #^4 + 71424 #^5 + 16960 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-179 - 1552 # + 1220 #^2 + 4928 #^3 - 4736 #^4 - 3008 #^5 + 5120 #^6 - 2048 #^7 + 256 #^8& , 8, 0]}, { Root[-358499 + 424976 # + 3147340 #^2 - 787936 #^3 - 501776 #^4 + 131264 #^5 + 13120 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[-59 + 740 # - 3132 #^2 + 4800 #^3 + 864 #^4 - 9280 #^5 + 8192 #^6 - 2560 #^7 + 256 #^8& , 8, 0]}, { Root[17161 - 115804 # + 214220 #^2 - 20896 #^3 - 154416 #^4 + 50304 #^5 + 16320 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Rational[1, 4] ( 3 + (3 (9 + 2 5^Rational[1, 2] + 4 (5 + 2 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2])}, { Root[2243641 - 4699916 # + 2649580 #^2 + 297456 #^3 - 598256 #^4 + 91136 #^5 + 22080 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Root[ 421 + 2372 # - 11300 #^2 + 6672 #^3 + 16864 #^4 - 25472 #^5 + 13440 #^6 - 3072 #^7 + 256 #^8& , 7, 0]}, { Root[487381 - 3332964 # + 4398560 #^2 - 1084576 #^3 - 515136 #^4 + 172544 #^5 + 8640 #^6 - 4864 #^7 + 256 #^8& , 8, 0], Root[ 541 + 1292 # - 18300 #^2 + 25472 #^3 + 864 #^4 - 20032 #^5 + 12800 #^6 - 3072 #^7 + 256 #^8& , 8, 0]}}, {{ 0, 3.742545380580133}, {0.20791169081775937`, 4.720692981313809}, {0.20791169081775937`, 4.929749907849121}, { 0.312440154085414, 5.9242718032173975`}, 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{8.433285740814693, 5.938599752668678}, {8.570014476812013, 1.3796109627406248`}, { 8.742302735189641, 4.9875432363735195`}, {8.79124621889449, 2.7764132094082785`}, {8.79124621889449, 4.678526241998571}, { 9.100263213269434, 3.7274697257034415`}, {9.242302735189641, 6.526385004961149}, {9.379031471186961, 1.9673962150333308`}, { 9.463534477272116, 6.7476167470436295`}, {9.600263213269438, 2.1886279571144347`}, {9.742302735189643, 4.9875432363735195`}, { 10.05131972956459, 4.036486720078393}, {10.05131972956459, 5.938599752668678}, {10.100263213269436`, 3.7274697257034415`}, { 10.272551471647066`, 7.335401999336103}, {10.409280207644382`, 2.7764132094082785`}, {10.617191898462142`, 0.9135454576426009}, {10.860336723939536`, 2.448701467785898}, { 10.860336723939536`, 3.448701467785898}, {10.860336723939536`, 6.526385004961149}, {11.023928541537941`, 0}, { 11.360336723939538`, 1.5826760640014592`}, {11.860336723939534`, 2.448701467785898}, {11.860336723939534`, 3.448701467785898}, { 11.860336723939534`, 6.526385004961149}, {12.018450436906216`, 0.10452846326765342`}, {12.226362127723974`, 1.0826760640014592`}, {12.669353718314486`, 4.036486720078393}, { 12.669353718314486`, 5.938599752668678}, {12.726362127723972`, 1.9487014677858978`}, {12.811393240234688`, 2.1396844734109526`}, {12.811393240234688`, 3.7577184621608413`}, {12.978370712689431`, 4.9875432363735195`}, {13.399178492527163`, 2.948701467785898}, { 13.620410234609642`, 3.7274697257034415`}, {13.929427228984583`, 4.678526241998571}}], PolygonBox[{{4, 3, 7, 9}, {9, 7, 12}, {7, 10, 13, 12}, {2, 1, 5, 10, 7}, {24, 21, 13, 10, 6, 8, 11, 15, 22, 26}, {19, 17, 23, 27}, {27, 23, 32}, {23, 25, 35, 32}, {16, 14, 18, 25, 23}, {25, 30, 35}, {35, 30, 39, 44}, {21, 24, 30, 25}, {24, 26, 36, 38, 33}, {26, 22, 29, 34}, {45, 42, 48, 49}, {49, 48, 52}, {48, 47, 51, 52}, {41, 37, 40, 47, 48}, {58, 57, 51, 47, 44, 39, 43, 46, 50, 56}, {67, 61, 65, 72}, {72, 65, 63, 64, 71, 76, 80, 85, 81, 77}, {59, 53, 55, 63, 65}, {57, 58, 64, 63}, {58, 56, 62, 68, 66}, {56, 50, 54, 60}, {85, 80, 87, 88}, {71, 70, 75, 76}, {76, 75, 83, 86, 84}, {70, 74, 75}, {75, 74, 79, 82}, {20, 19, 27, 31, 28}, {74, 69, 73, 78, 79}}]]}, "\"tridiminished rhombicosidodecahedron\""], Annotation[#, "tridiminished rhombicosidodecahedron", "Tooltip"]& ]], {1767.2727272727275`, -5313.6}, ImageScaled[{0.5, 0.5}], {360.0000000000002, 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{ 0, Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[ 1, 2] (-1 + ( 2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { Rational[1, 2] (Rational[1, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[1, 2] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, {( 2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (5 + 5^Rational[1, 2])}, {(2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (9 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, {( 2 + Rational[1, 2] 5^Rational[1, 2] + Rational[-1, 2] (3 (5 + 2 5^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2], Rational[1, 4] (17 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (-1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 1 + (2 (4 + 5^Rational[1, 2] - (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (3 + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (7 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[1 - 32 # + 168 #^2 + 1456 #^3 - 2624 #^5 - 832 #^6 + 768 #^7 + 256 #^8& , 8, 0], Rational[1, 32] ( 4 (5 (7 + 4 3^Rational[1, 2]))^Rational[1, 2] + (50 - 10 5^Rational[1, 2])^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + 2 (28 + 6 3^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]))}, { Rational[1, 2] (1 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[-59 - 296 # + 92 #^2 + 1792 #^3 + 1200 #^4 - 2112 #^5 - 1728 #^6 + 256 #^7 + 256 #^8& , 8, 0], Rational[1, 32] (56 + 4 3^Rational[1, 2] + 8 5^Rational[1, 2] - 4 15^Rational[1, 2] - 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (3 + 5^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (3 + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (2 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[ 1, 4] (-1 + (35 + 20 3^Rational[1, 2] + 2 (5 (97 + 56 3^Rational[1, 2]))^Rational[1, 2])^ Rational[1, 2]), Rational[1, 32] ( 2 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + (3 + 5^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 8 (7 + 3^Rational[1, 2] + 5^Rational[1, 2]))}, { 1 + 3^Rational[1, 2], Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] (3 + (5 + 2 5^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), 3 + 3^Rational[1, 2]}, { Rational[1, 4] ( 4 + (58 - 2 5^Rational[1, 2] + 8 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 2] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 1 + (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (9 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2]))^Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 2 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (17 + 2 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 6 + (62 + 22 5^Rational[1, 2] + 4 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2] + 5^Rational[1, 2])}, { 1 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (23 + 8 5^Rational[1, 2] + 4 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[750361 - 11524 # - 2045436 #^2 + 1309632 #^3 - 85536 #^4 - 135616 #^5 + 45056 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Rational[1, 4] (13 + 5 3^Rational[1, 2] + 5^Rational[1, 2] - (5 + 2 5^Rational[1, 2])^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (13 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (13 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 3 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (21 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[-72479 + 675004 # - 1542900 #^2 + 942496 #^3 - 61296 #^4 - 114944 #^5 + 40640 #^6 - 5376 #^7 + 256 #^8& , 7, 0], Rational[1, 32] (104 + 44 3^Rational[1, 2] + 4 (5 (7 + 4 3^Rational[1, 2]))^Rational[1, 2] - (50 - 10 5^Rational[1, 2])^Rational[1, 2] - (10 - 2 5^Rational[1, 2])^ Rational[1, 2] - 2 (2 (5 + 5^Rational[1, 2]))^Rational[1, 2])}, { 2 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (5 + 5^Rational[1, 2])}, { Root[24481 - 19136 # - 1152736 #^2 + 625168 #^3 + 158304 #^4 - 184704 #^5 + 50496 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 8] (26 + 9 3^Rational[1, 2] + 2 5^Rational[1, 2] - 15^Rational[1, 2] - (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (13 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + ( 2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (13 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (21 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 4 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (3 + 5^Rational[1, 2])}, { 3 + (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (3 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[3, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 10 + (2 (79 + 11 5^Rational[1, 2] + 6 (150 + 66 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), 5 + (8 + Rational[3, 2] 15^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (47 + 8 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (19 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { 3 (1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 5^Rational[1, 2])}, { 3 (1 + 3^Rational[1, 2]), Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 0}, {3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 2] (1 + 5^Rational[1, 2])}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { 3 + Rational[ 1, 4] (442 - 2 5^Rational[1, 2] + 24 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 2] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 3 + ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (5 + 5^Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (9 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 3 + (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (17 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 5 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 7 + (2 (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (3 + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 6 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[29456881 + 36182272 # + 7902456 #^2 - 3638864 #^3 - 871296 #^4 + 194368 #^5 + 19904 #^6 - 5376 #^7 + 256 #^8& , 8, 0], Rational[1, 32] ( 4 (5 (7 + 4 3^Rational[1, 2]))^Rational[1, 2] + (50 - 10 5^Rational[1, 2])^Rational[1, 2] + (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + 2 (28 + 6 3^Rational[1, 2] + (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2]))}, { Rational[1, 2] ( 7 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[21877201 + 32072848 # + 10523900 #^2 - 2560832 #^3 - 1096656 #^4 + 155712 #^5 + 29760 #^6 - 5888 #^7 + 256 #^8& , 8, 0], Rational[1, 32] (56 + 4 3^Rational[1, 2] + 8 5^Rational[1, 2] - 4 15^Rational[1, 2] - 2 (10 - 2 5^Rational[1, 2])^ Rational[1, 2] + (3 + 5^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^ Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (-1 + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (3 + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Root[31303021 + 34381832 # + 7051620 #^2 - 3295488 #^3 - 867456 #^4 + 171968 #^5 + 24320 #^6 - 5632 #^7 + 256 #^8& , 8, 0], Rational[1, 32] ( 2 (10 - 2 5^Rational[1, 2])^Rational[1, 2] + (3 + 5^Rational[1, 2]) (2 (5 + 5^Rational[1, 2]))^Rational[1, 2] + 8 (7 + 3^Rational[1, 2] + 5^Rational[1, 2]))}, { 4 (1 + 3^Rational[1, 2]), Rational[1, 4] (13 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (113 + 2 5^Rational[1, 2] + 12 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], 3 + 3^Rational[1, 2]}, { 4 + Rational[ 1, 4] (778 - 2 5^Rational[1, 2] + 32 (30 - 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 2] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (9 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 4 + (Rational[1, 2] (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (17 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (5 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (76 + 5^Rational[1, 2] + 7 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (17 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 8 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (11 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (15 + 6 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (3 + 3^Rational[1, 2])}, { Rational[1, 4] ( 18 + (22 (29 + 5^Rational[1, 2]) + 28 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]), Rational[1, 2] (4 + 3^Rational[1, 2] + 5^Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (11 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { 5 + Rational[ 1, 2] (197 + 2 5^Rational[1, 2] + 16 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2], Rational[1, 4] (15 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (167 + 8 5^Rational[1, 2] + 28 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]), Rational[1, 4] (7 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { Rational[1, 2] ( 9 + (2 (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]), Rational[1, 4] (9 + 2 3^Rational[1, 2] + 5^Rational[1, 2])}, { 5 + (Rational[1, 2] (124 + 5^Rational[1, 2] + 9 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^Rational[1, 2], Rational[1, 4] (9 + 4 3^Rational[1, 2] + 5^Rational[1, 2])}}, {{ 0, 5.541067801943825}, {0.17281636480318796`, 2.675042398159386}, {0.17281636480318796`, 3.675042398159386}, { 0.5877852522924731, 4.732050807568877}, {0.5877852522924731, 6.350084796318772}, {0.672816364803188, 1.8090169943749475`}, { 0.672816364803188, 4.541067801943825}, {0.672816364803188, 6.541067801943825}, {1.0388417685876268`, 3.175042398159386}, { 1.172816364803188, 7.4070932057282635`}, {1.5388417685876268`, 0.30901699437494745`}, {1.5388417685876268`, 1.3090169943749475`}, {1.5388417685876268`, 2.3090169943749475`}, {1.5388417685876268`, 4.041067801943825}, { 1.5388417685876268`, 5.041067801943825}, {1.5388417685876268`, 6.041067801943825}, {1.7079723749464848`, 3.9181872236367803`}, { 2.038841768587627, 6.9070932057282635`}, {2.5169893693214327`, 2.5169286851927066`}, {2.538841768587627, 0.30901699437494745`}, {2.538841768587627, 1.3090169943749475`}, {2.538841768587627, 2.3090169943749475`}, { 2.538841768587627, 4.041067801943825}, {2.538841768587627, 5.041067801943825}, {2.538841768587627, 6.041067801943825}, { 2.6215178325890856`, 3.51145058056098}, {2.732050807568877, 5.541067801943825}, {3.038841768587627, 3.175042398159386}, { 3.3198360598613506`, 4.732050807568877}, {3.3198360598613506`, 6.350084796318772}, {3.4048671723720654`, 4.541067801943825}, { 3.9048671723720654`, 2.675042398159386}, {3.9048671723720654`, 3.675042398159386}, {4.270892576156504, 5.041067801943825}, { 4.270892576156504, 6.041067801943825}, {4.770892576156504, 4.175042398159386}, {4.855923688667219, 2.3660254037844384`}, { 4.855923688667219, 3.9840593925343333`}, {5.136917979940943, 5.541067801943825}, {5.443708940959692, 3.175042398159386}, { 5.554241915971256, 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3.9840593925343333`}, { 13.467044998863136`, 5.041067801943825}, {13.467044998863136`, 6.041067801943825}, {13.639861363666324`, 3.175042398159386}, { 13.833070402647575`, 3.675042398159386}, {14.333070402647575`, 4.541067801943825}}], PolygonBox[{{10, 8, 16, 18}, {18, 16, 25}, {16, 15, 24, 25}, {5, 1, 4, 15, 16}, {7, 14, 15}, {15, 14, 23, 24}, {3, 9, 14, 7}, {3, 2, 9}, {2, 6, 13, 9}, {9, 13, 19, 26, 17}, {6, 12, 13}, {13, 12, 21, 22}, {56, 47, 46, 55}, {35, 34, 39}, {34, 36, 44, 39}, {30, 27, 29, 34, 35}, {36, 43, 44}, {44, 43, 52, 53}, {31, 33, 36, 34}, {24, 23, 31}, {23, 28, 33, 31}, {33, 32, 37, 40, 38}, {28, 32, 33}, {21, 12, 11, 20}, {46, 45, 54, 55}, {55, 54, 61}, {54, 58, 67, 61}, {48, 41, 50, 58, 54}, {58, 66, 67}, {66, 60, 73, 79}, {53, 60, 66, 58}, {53, 52, 60}, {43, 42, 51, 52}, {52, 51, 62, 68, 63}, {42, 49, 51}, {51, 49, 57, 59}, {82, 80, 88, 90}, { 90, 88, 97}, {88, 87, 96, 97}, {77, 71, 76, 87, 88}, {79, 86, 87}, {87, 86, 95, 96}, {73, 81, 86, 79}, {73, 72, 81}, {72, 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2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 4 + 7 2^Rational[-1, 2], 1 + 2^Rational[1, 2]}, { 4 + 7 2^Rational[-1, 2], 2 (1 + 2^Rational[1, 2])}, { 4 (1 + 2^Rational[1, 2]), 1 + 3 2^Rational[-1, 2]}, { 4 (1 + 2^Rational[1, 2]), 2 + 3 2^Rational[-1, 2]}, { Rational[1, 4] (16 + 15 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (4 + 5 2^Rational[1, 2] - 6^Rational[1, 2])}, { Rational[1, 4] (16 + 15 2^Rational[1, 2] + 6^Rational[1, 2]), Rational[1, 4] (8 + 7 2^Rational[1, 2] + 6^Rational[1, 2])}}, {{ 0, 3.1213203435596424`}, {0, 4.121320343559642}, { 0.7071067811865475, 2.414213562373095}, {0.7071067811865475, 4.82842712474619}, {1.7071067811865475`, 2.414213562373095}, { 1.7071067811865475`, 4.82842712474619}, {2.155394517270574, 2.155394517270574}, {2.155394517270574, 5.087246169848711}, { 2.414213562373095, 0.7071067811865475}, {2.414213562373095, 1.7071067811865475`}, {2.414213562373095, 3.1213203435596424`}, { 2.414213562373095, 4.121320343559642}, {2.414213562373095, 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(25 + 13 5^Rational[1, 2]), (Rational[25, 8] + Rational[5, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 13 5^Rational[1, 2]), (Rational[25, 8] + Rational[5, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 9 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 11 5^Rational[1, 2]), Rational[1, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 19 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (107 + 37 5^Rational[1, 2] - (6 (485 + 209 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 21 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (107 + 37 5^Rational[1, 2] - (6 (485 + 209 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 5 + 2 5^Rational[1, 2], Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 3 (2 + 5^Rational[1, 2]), Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 7 5^Rational[1, 2]), Rational[1, 2] (25 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] (2 + 5^Rational[1, 2]), (5 + 2 5^Rational[1, 2])^ Rational[1, 2]}, { 6 + Rational[5, 2] 5^Rational[1, 2], (5 + 2 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[5, 4] (3 + 5^Rational[1, 2]), (Rational[65, 8] + Rational[19, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 9 5^Rational[1, 2]), (Rational[65, 8] + Rational[19, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 11 5^Rational[1, 2]), (Rational[65, 8] + Rational[19, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 15 5^Rational[1, 2]), (Rational[65, 8] + Rational[19, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[3, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 5 + 2 5^Rational[1, 2], Rational[3, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 3 (2 + 5^Rational[1, 2]), Rational[3, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (15 + 7 5^Rational[1, 2]), Rational[3, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), (Rational[125, 8] + Rational[41, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 7 5^Rational[1, 2]), (Rational[125, 8] + Rational[41, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 13 5^Rational[1, 2]), (Rational[125, 8] + Rational[41, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 13 5^Rational[1, 2]), (Rational[125, 8] + Rational[41, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (39 + 17 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (217 + 89 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 23 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (217 + 89 5^Rational[1, 2] + (6 (185 + 59 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), (Rational[125, 8] + Rational[55, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 9 5^Rational[1, 2]), (Rational[125, 8] + Rational[55, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 11 5^Rational[1, 2]), (Rational[125, 8] + Rational[55, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 11 5^Rational[1, 2]), (Rational[125, 8] + Rational[55, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (59 + 27 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (217 + 79 5^Rational[1, 2] + (30 (205 + 89 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (377 + 167 5^Rational[1, 2] - (6 (1945 + 869 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], 2 (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] (2 + 5^Rational[1, 2]), 2 (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[5, 2] 5^Rational[1, 2], 2 (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[15, 2] + 3 5^Rational[1, 2], 2 (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 15 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (367 + 151 5^Rational[1, 2] - (30 (65 + 19 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5^Rational[1, 2], Rational[1, 2] (85 + 38 5^Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[1, 2] (85 + 38 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[1, 2] (85 + 38 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[1, 2] (85 + 38 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (11 + 5 5^Rational[1, 2]), (Rational[83, 4] + 8 5^Rational[1, 2] + 2 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 11 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 9 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 13 5^Rational[1, 2]), (Rational[205, 8] + Rational[89, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { 1 + Rational[3, 2] 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] (2 + 5^Rational[1, 2]), (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { 6 + Rational[5, 2] 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[15, 2] + 3 5^Rational[1, 2], (Rational[65, 2] + Rational[29, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (7 + 5 5^Rational[1, 2]), Rational[ 1, 4] ((-2) 3^Rational[1, 2] + (650 + 290 5^Rational[1, 2])^ Rational[1, 2])}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[1, 4] (610 + 262 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (19 + 9 5^Rational[1, 2]), Rational[1, 4] (610 + 262 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (25 + 11 5^Rational[1, 2]), Rational[1, 4] (610 + 262 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (29 + 11 5^Rational[1, 2]), Rational[1, 4] (610 + 262 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (29 + 15 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (587 + 259 5^Rational[1, 2] + (6 (445 + 199 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 3 5^Rational[1, 2]), (Rational[325, 8] + Rational[145, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), (Rational[325, 8] + Rational[145, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), (Rational[325, 8] + Rational[145, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (15 + 7 5^Rational[1, 2]), (Rational[325, 8] + Rational[145, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (49 + 21 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (3 (189 + 83 5^Rational[1, 2] + (30 (65 + 29 5^Rational[1, 2]))^ Rational[1, 2]))^Rational[1, 2]}, { Rational[-1, 8] + Rational[3, 8] 5^Rational[1, 2] + Rational[-1, 4] (Rational[3, 2] (5 - 5^Rational[1, 2]))^ Rational[1, 2], Rational[ 1, 4] (847 + 377 5^Rational[1, 2] - (6 (4405 + 1969 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 5^Rational[1, 2], Rational[1, 2] (185 + 82 5^Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], Rational[1, 2] (185 + 82 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), Rational[1, 2] (185 + 82 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 3 5^Rational[1, 2]), Rational[1, 2] (185 + 82 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 7 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (817 + 361 5^Rational[1, 2] - 5 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 8] (19 + 13 5^Rational[1, 2] + (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (817 + 361 5^Rational[1, 2] - 5 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], (50 + 22 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], (50 + 22 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], (50 + 22 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[1, 4] (890 + 398 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[1, 4] (890 + 398 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[1, 4] (890 + 398 5^Rational[1, 2])^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[1, 4] (890 + 398 5^Rational[1, 2])^Rational[1, 2]}, { 0, (Rational[265, 4] + Rational[59, 2] 5^Rational[1, 2])^ Rational[1, 2]}, { 1 + 5^Rational[1, 2], (Rational[265, 4] + Rational[59, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), (Rational[265, 4] + Rational[59, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (7 + 5 5^Rational[1, 2]), (Rational[265, 4] + Rational[59, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), Rational[3, 4] (130 + 58 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), Rational[3, 4] (130 + 58 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (-1 + 5^Rational[1, 2]), Rational[5, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), Rational[5, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), Rational[5, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[3, 4] (5 + 3 5^Rational[1, 2]), Rational[5, 4] (50 + 22 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 9 5^Rational[1, 2] - (30 - 6 5^Rational[1, 2])^Rational[1, 2]), Rational[ 1, 4] (1117 + 499 5^Rational[1, 2] + (30 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (19 + 11 5^Rational[1, 2] + (30 - 6 5^Rational[1, 2])^ Rational[1, 2]), Rational[ 1, 4] (1117 + 499 5^Rational[1, 2] + (30 (1165 + 521 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { 1 + 5^Rational[1, 2], (Rational[325, 4] + Rational[71, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), (Rational[325, 4] + Rational[71, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] 5^Rational[1, 2], (85 + 38 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 2] (2 + 5^Rational[1, 2]), (85 + 38 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 2] + 2 5^Rational[1, 2], (85 + 38 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[7, 2] + 2 5^Rational[1, 2], (85 + 38 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[1, 4] (5 + 3 5^Rational[1, 2]), (Rational[745, 8] + Rational[331, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 7 5^Rational[1, 2]), (Rational[745, 8] + Rational[331, 8] 5^Rational[1, 2])^Rational[1, 2]}, { 3 + 2 5^Rational[1, 2], (Rational[343, 4] + 38 5^Rational[1, 2] + (3 (85 + 38 5^Rational[1, 2]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 8] (9 + 7 5^Rational[1, 2] - (6 (5 + 5^Rational[1, 2]))^ Rational[1, 2]), Rational[ 1, 4] (1597 + 709 5^Rational[1, 2] + 7 (150 + 66 5^Rational[1, 2])^Rational[1, 2])^ Rational[1, 2]}, { 1 + 5^Rational[1, 2], (Rational[425, 4] + Rational[95, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 2] (5 + 3 5^Rational[1, 2]), (Rational[425, 4] + Rational[95, 2] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[5, 4] (1 + 5^Rational[1, 2]), (Rational[925, 8] + Rational[409, 8] 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (9 + 5 5^Rational[1, 2]), (Rational[925, 8] + Rational[409, 8] 5^Rational[1, 2])^Rational[1, 2]}}, {{ 10.590169943749475`, 0}, {11.590169943749475`, 0}, { 9.781152949374526, 0.5877852522924731}, {12.399186938124423`, 0.5877852522924731}, {13.377334538858229`, 0.7956969431102324}, { 8.163118960624633, 1.2606016170956613`}, {9.47213595499958, 1.5388417685876268`}, {12.70820393249937, 1.5388417685876268`}, { 7.663118960624632, 2.1266270208801}, {8.663118960624633, 2.1266270208801}, {13.517220926874316`, 2.1266270208801}, { 14.517220926874316`, 2.1266270208801}, {9.781152949374526, 2.48989828488278}, {12.399186938124423`, 2.48989828488278}, { 9.676624486106874, 2.6709468940994534`}, {12.503715401392075`, 2.6709468940994534`}, {6.854101966249685, 2.714412273172573}, { 9.47213595499958, 2.714412273172573}, {12.70820393249937, 2.714412273172573}, {15.326237921249264`, 2.714412273172573}, { 10.590169943749475`, 3.0776835371752536`}, {11.590169943749475`, 3.0776835371752536`}, {6.545084971874737, 3.6654687894677265`}, { 9.781152949374526, 3.6654687894677265`}, {12.399186938124423`, 3.6654687894677265`}, {15.635254915624213`, 3.6654687894677265`}, {6.854101966249685, 4.61652530576288}, { 9.47213595499958, 4.61652530576288}, {12.70820393249937, 4.61652530576288}, {15.326237921249264`, 4.61652530576288}, { 7.663118960624632, 5.2043105580553535`}, {8.663118960624633, 5.2043105580553535`}, {13.517220926874316`, 5.2043105580553535`}, {14.517220926874316`, 5.2043105580553535`}, {8.80300534864072, 5.359670131240274}, { 13.377334538858229`, 5.359670131240274}, {8.781152949374526, 5.567581822058034}, {9.781152949374526, 5.567581822058034}, { 12.399186938124423`, 5.567581822058034}, {13.399186938124423`, 5.567581822058034}, {15.430766384516918`, 5.611047201131154}, { 4.14961343514239, 6.111901695277386}, {7.97213595499958, 6.155367074350507}, {10.590169943749475`, 6.155367074350507}, { 11.590169943749475`, 6.155367074350507}, {14.20820393249937, 6.155367074350507}, {6.993988354265774, 6.363278765168267}, { 2.23606797749979, 6.518638338353187}, {3.23606797749979, 6.518638338353187}, {5.854101966249685, 6.518638338353187}, { 6.854101966249685, 6.518638338353187}, {11.090169943749475`, 7.0213924781349455`}, {1.4270509831248424`, 7.106423590645661}, { 4.045084971874737, 7.106423590645661}, {5.045084971874737, 7.106423590645661}, {7.663118960624632, 7.106423590645661}, { 10.899186938124423`, 7.106423590645661}, {11.281152949374526`, 7.106423590645661}, {14.517220926874316`, 7.106423590645661}, { 1.118033988749895, 8.057480106940814}, {4.354101966249685, 8.057480106940814}, {4.73606797749979, 8.057480106940814}, { 7.97213595499958, 8.057480106940814}, {10.590169943749475`, 8.057480106940814}, {11.590169943749475`, 8.057480106940814}, { 14.20820393249937, 8.057480106940814}, {4.545084971874737, 8.142511219451528}, {8.781152949374526, 8.645265359233287}, { 9.781152949374526, 8.645265359233287}, {12.399186938124423`, 8.645265359233287}, {13.399186938124423`, 8.645265359233287}, { 8.641266561358439, 8.800624932418208}, {1.4270509831248424`, 9.008536623235967}, {4.045084971874737, 9.008536623235967}, { 5.045084971874737, 9.008536623235967}, {7.663118960624632, 9.008536623235967}, {11.48564148048182, 9.052002002309088}, { 0.20448853110729404`, 9.552856496455322}, {2.23606797749979, 9.59632187552844}, {3.23606797749979, 9.59632187552844}, { 5.854101966249685, 9.59632187552844}, {6.854101966249685, 9.59632187552844}, {2.257920376765984, 9.8042335663462}, { 6.83224956698349, 9.8042335663462}, {1.118033988749895, 9.95959313953112}, {2.118033988749895, 9.95959313953112}, { 6.97213595499958, 9.95959313953112}, {7.97213595499958, 9.95959313953112}, {0.30901699437494745`, 10.547378391823594`}, { 2.9270509831248424`, 10.547378391823594`}, {6.163118960624632, 10.547378391823594`}, {8.781152949374526, 10.547378391823594`}, { 0, 11.498434908118748`}, {3.23606797749979, 11.498434908118748`}, {5.854101966249685, 11.498434908118748`}, { 9.090169943749475, 11.498434908118748`}, {4.045084971874737, 12.08622016041122}, {5.045084971874737, 12.08622016041122}, { 0.30901699437494745`, 12.449491424413901`}, {2.9270509831248424`, 12.449491424413901`}, {6.163118960624632, 12.449491424413901`}, {8.781152949374526, 12.449491424413901`}, { 3.1315395142321365`, 12.492956803487022`}, {5.9586304295173385`, 12.492956803487022`}, {3.23606797749979, 12.674005412703695`}, { 5.854101966249685, 12.674005412703695`}, {1.118033988749895, 13.037276676706375`}, {2.118033988749895, 13.037276676706375`}, { 6.97213595499958, 13.037276676706375`}, {7.97213595499958, 13.037276676706375`}, {2.9270509831248424`, 13.625061928998846`}, {6.163118960624632, 13.625061928998846`}, { 7.47213595499958, 13.903302080490812`}, {2.257920376765984, 14.368206754476242`}, {3.23606797749979, 14.576118445294}, { 5.854101966249685, 14.576118445294}, {4.045084971874737, 15.163903697586475`}, {5.045084971874737, 15.163903697586475`}}], PolygonBox[{{74, 75, 81, 91, 95, 98, 97, 94, 90, 80}, {75, 74, 67}, {48, 49, 54, 61, 74, 80, 79, 73, 60, 53}, {54, 49, 42}, {80, 90, 83}, {93, 89, 85, 86, 90, 94, 100, 108, 107, 99}, {85, 89, 78}, {94, 97, 103}, {117, 115, 111, 105, 97, 98, 106, 112, 116, 118}, {111, 115, 114}, {98, 95, 104}, {102, 110, 109, 101, 95, 91, 87, 88, 92, 96}, {109, 110, 113}, {91, 81, 84}, {56, 63, 76, 82, 81, 75, 62, 55, 50, 51}, {76, 63, 72}, {24, 21, 22, 25, 29, 39, 45, 44, 38, 28}, {21, 24, 15}, {17, 9, 10, 18, 24, 28, 32, 31, 27, 23}, {10, 9, 6}, {28, 38, 35}, {63, 56, 43, 37, 38, 44, 57, 64, 69, 68}, {43, 56, 47}, {44, 45, 52}, {71, 70, 65, 58, 45, 39, 40, 46, 59, 66}, {65, 70, 77}, {39, 29, 36}, {26, 30, 34, 33, 29, 25, 19, 11, 12, 20}, {34, 30, 41}, {25, 22, 16}, {2, 4, 8, 14, 22, 21, 13, 7, 3, 1}, {8, 4, 5}}]]}, "\"truncated dodecahedron\""], Annotation[#, "truncated dodecahedron", "Tooltip"]& ]], {2945.4545454545455`, -5313.6}, ImageScaled[{0.5, 0.5}], {360., 360.}], InsetBox[ GraphicsBox[ TagBox[ TooltipBox[ {RGBColor[1, 1, 0.85], EdgeForm[GrayLevel[0]], GraphicsComplexBox[ NCache[{{Rational[5, 2], 0}, { Rational[1, 4] (9 - 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (11 + 5^Rational[1, 2]), Rational[1, 4] (10 - 2 5^Rational[1, 2])^Rational[1, 2]}, { 2, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 3, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 5, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 6, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 8, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 9, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 11, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 12, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 14, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { 15, Rational[1, 2] (5 + 2 5^Rational[1, 2])^Rational[1, 2]}, { Rational[ 3, 2], (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 7, 2], (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 9, 2], (Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 13, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 15, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 19, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 21, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 25, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 27, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 31, 2], ( Rational[1, 2] (4 + 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, {1, Rational[3, 2] 3^Rational[1, 2]}, { 4, Rational[3, 2] 3^Rational[1, 2]}, { 7, Rational[3, 2] 3^Rational[1, 2]}, { 10, Rational[3, 2] 3^Rational[1, 2]}, { 13, Rational[3, 2] 3^Rational[1, 2]}, { Rational[1, 4] (3 - 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (5 + 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (15 - 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (17 + 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (27 - 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (29 + 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (39 - 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (41 + 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (51 - 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (53 + 5^Rational[1, 2]), Rational[ 1, 2] (Rational[1, 2] (59 - 5^Rational[1, 2] + 6 (30 - 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { 2, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 3, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 5, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 6, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 8, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 9, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 11, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 12, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 14, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { 15, (Rational[17, 4] + Rational[1, 2] 5^Rational[1, 2] + (15 + 6 5^Rational[1, 2])^ Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 2], (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 3, 2], (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 7, 2], (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 9, 2], (Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 13, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 15, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 19, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 21, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 25, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 27, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 31, 2], ( Rational[1, 2] (16 + 5^Rational[1, 2] + 3 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { 0, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 2, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 3, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 5, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 6, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 8, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 9, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 11, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 12, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 14, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { 15, Rational[ 1, 2] (53 + 2 5^Rational[1, 2] + 8 (15 + 6 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[ 1, 2], (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 3, 2], (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 7, 2], (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 9, 2], (Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 13, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 15, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 19, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 21, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 25, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[ 27, 2], ( Rational[1, 2] (40 + 5^Rational[1, 2] + 5 (15 + 6 5^Rational[1, 2])^Rational[1, 2]))^ Rational[1, 2]}, { Rational[1, 4] (9 - 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (11 + 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (21 - 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (23 + 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (33 - 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (35 + 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (45 - 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (47 + 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (57 - 5^Rational[1, 2]), ( Rational[11, 8] (11 + 5^Rational[1, 2]) + (150 + 66 5^Rational[1, 2])^Rational[1, 2])^Rational[1, 2]}, { Rational[1, 4] (59 + 5^Rational[1, 2]), ( Rational[11, 8] (11 + 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