Polyhedra in OpenSCAD

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form :   Count = 15
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Name Groups #Vertices Vertex orders #Faces Face orders #Edges Conway
Cube  Hexahedron dmccooeyPlatonicisohedronSpace-fillingisotoxal 8 8{3} 6 6{4} 12 C, jY3
Deltoidal Hexecontahedron  dmccooeyCatalanisohedron 62 30{4}+20{3}+12{5} 60 60{4} 120 oD
Deltoidal Icositetrahedron  dmccooeyCatalanisohedron 26 18{4}+8{3} 24 24{4} 48 oO
Disdyakis Dodecahedron  Hexakis Octahedron dmccooeyCatalanisohedron 26 6{8}+12{4}+8{6} 48 48{3} 72 mC, mO
Disdyakis Triacontahedron  Hexakis Icosahedron dmccooeyCatalanisohedron 62 30{4}+20{6}+12{10} 120 120{3} 180 mD
Dodecahedron  Goldberg(0,1) dmccooeyGoldbergPlatonicisohedronisotoxal 20 20{3} 12 12{5} 30 D, gY3
Icosahedron  dmccooeyPlatonicisohedrondeltahedronGeodesic Icosahedraisotoxal 12 12{5} 20 20{3} 30 I, sY3, k5aY5
Octahedron  Square Dipyramid dmccooeyPlatonicisohedrondeltahedronisotoxal 6 6{4} 8 8{3} 12 O, aY3
Pentakis Dodecahedron  dmccooeyCatalanisohedronGeodesic Icosahedra 32 20{6}+12{5} 60 60{3} 90 kD
Rhombic Dodecahedron  dmccooeyCatalanisohedron 14 6{4}+8{3} 12 12{4} 24 jC
Rhombic Triacontahedron  dmccooeyCatalanisohedron 32 12{5}+20{3} 30 30{4} 60 gD
Tetrahedron  dmccooeyPlatonicisohedrondeltahedronisotoxal 4 4{3} 4 4{3} 6 T, Y3
Tetrakis Hexahedron  tetrahexahedron dmccooeyCatalanisohedron 14 6{4}+8{6} 24 24{3} 36 kC
Triakis Icosahedron  dmccooeyCatalanisohedron 32 12{10}+20{3} 60 60{3} 90 kI
Triakis Octahedron  Small Triakis Octahedron, trisoctahedron dmccooeyCatalanisohedron 14 6{8}+8{3} 24 24{3} 36 kO