Polyhedra in OpenSCAD

Group IndexFull ListCreate from Conway FormulaConway operatorsAbout


group : Greater Self-Dual   Count = 10
Search


Name Groups #Vertices Vertex orders #Faces Face orders #Edges Conway
Self-Dual Icosioctahedron #1 (canonical)  dmccooeyGreater Self-Dual 28 12 of 4,12 of 3,4 of 6 28 4 of 6,12 of 4,12 of 3 54
Self-Dual Icosioctahedron #2 (canonical)  dmccooeyGreater Self-Dual 28 12 of 5,16 of 3 28 12 of 5,16 of 3 54
Self-Dual Icosioctahedron #3 (canonical)  dmccooeyGreater Self-Dual 28 12 of 5,16 of 3 28 12 of 5,16 of 3 54
Self-Dual Icosioctahedron #4 (canonical)  dmccooeyGreater Self-Dual 28 24 of 4,4 of 3 28 24 of 4,4 of 3 54
Self-Dual Tetracontahedron #1 (canonical)  dmccooeyGreater Self-Dual 40 12 of 4,24 of 3,4 of 9 40 4 of 9,12 of 4,24 of 3 78
Self-Dual Tetracontahedron #2 (canonical)  dmccooeyGreater Self-Dual 40 12 of 5,24 of 3,4 of 6 40 4 of 6,12 of 5,24 of 3 78
Self-Dual Tetracontahedron #3 (canonical)  dmccooeyGreater Self-Dual 40 12 of 6,28 of 3 40 12 of 6,28 of 3 78
Self-Dual Tetracontahedron #4 (canonical)  dmccooeyGreater Self-Dual 40 12 of 4,16 of 3,12 of 5 40 12 of 5,12 of 4,16 of 3 78
Self-Dual Tetracontahedron #5 (canonical)  dmccooeyGreater Self-Dual 40 12 of 4,12 of 5,16 of 3 40 12 of 5,12 of 4,16 of 3 78
Self-Dual Tetracontahedron #6 (canonical)  dmccooeyGreater Self-Dual 40 12 of 5,16 of 3,12 of 4 40 12 of 5,12 of 4,16 of 3 78