Compound of twelve pentagonal antiprisms with rotational freedom

Compound of twelve pentagonal antiprisms with rotational freedom
Compound of twelve pentagonal antiprisms with rotational freedom
UC26-12 pentagonal antiprisms.png
Type Uniform compound
Index UC26
Polyhedra 12 pentagonal antiprisms
Faces 120 triangles, 24 pentagons
Edges 240
Vertices 120
Symmetry group icosahedral (Ih)
Subgroup restricting to one constituent 10-fold improper rotation (S10)

This uniform polyhedron compound is a symmetric arrangement of 12 pentagonal antiprisms. It can be constructed by inscribing one pair of pentagonal antiprisms within an icosahedron, in each of the six possible ways, and then rotating each by an equal and opposite angle θ.

When θ is 36 degrees, the antiprisms coincide in pairs to yield (two superimposed copies of) the compound of six pentagonal antiprisms (without rotational freedom).

This compound shares its vertices with the compound of twelve pentagrammic crossed antiprisms with rotational freedom.

Cartesian coordinates

Cartesian coordinates for the vertices of this compound are all the cyclic permutations of

(±(2τ−1−(2τ+4)cosθ), ±2(√(5τ+10))sinθ, ±(τ+2+(4τ−2)cosθ))
(±(2τ−1−(2τ−1)cosθ−τ(√(5τ+10))sinθ), ±(−5τcosθ+τ−1(√(5τ+10))sinθ),
±(τ+2+(3−τ)cosθ+(√(5τ+10))sinθ))
(±(2τ−1+(1+3τ)cosθ−(√(5τ+10))sinθ), ±(−5cosθ−τ(√(5τ+10))sinθ),
±(τ+2−(τ+2)cosθ+τ−1(√(5τ+10))sinθ))
(±(2τ−1+(1+3τ)cosθ+(√(5τ+10))sinθ), ±(5cosθ−τ(√(5τ+10))sinθ),
±(τ+2−(τ+2)cosθ−τ−1(√(5τ+10))sinθ))
(±(2τ−1−(2τ−1)cosθ+τ(√(5τ+10))sinθ), ±(5τcosθ+τ−1(√(5τ+10))sinθ),
±(τ+2+(3−τ)cosθ−(√(5τ+10))sinθ))

where τ = (1+√5)/2 is the golden ratio (sometimes written φ).

References

  • Skilling, John (1976), "Uniform Compounds of Uniform Polyhedra", Mathematical Proceedings of the Cambridge Philosophical Society 79: 447–457, doi:10.1017/S0305004100052440, MR0397554 .