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Polyhedral compound From Wikipedia, the free encyclopedia
This uniform polyhedron compound is a composition of 2 icosahedra. It has octahedral symmetry Oh. As a holosnub, it is represented by Schläfli symbol β{3,4} and Coxeter diagram .
Compound of two icosahedra | |
---|---|
Type | Uniform compound |
Index | UC46 |
Schläfli symbols | β{3,4} βr{3,3} |
Coxeter diagrams | |
Polyhedra | 2 icosahedra |
Faces | 16+24 triangles |
Edges | 60 |
Vertices | 24 |
Symmetry group | octahedral (Oh) |
Subgroup restricting to one constituent | pyritohedral (Th) |
The triangles in this compound decompose into two orbits under action of the symmetry group: 16 of the triangles lie in coplanar pairs in octahedral planes, while the other 24 lie in unique planes.
It shares the same vertex arrangement as a nonuniform truncated octahedron, having irregular hexagons alternating with long and short edges.
Nonuniform and uniform truncated octahedra. The first shares its vertex arrangement with this compound. |
The icosahedron, as a uniform snub tetrahedron, is similar to these snub-pair compounds: compound of two snub cubes and compound of two snub dodecahedra.
Together with its convex hull, it represents the icosahedron-first projection of the nonuniform snub tetrahedral antiprism.
Cartesian coordinates for the vertices of this compound are all the permutations of
where τ = (1+√5)/2 is the golden ratio (sometimes written φ).
The dual compound has two dodecahedra as pyritohedra in dual positions:
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