Compound of two snub cubes

Cartesian coordinates for the vertices are all the permutations of

(±1, ±ξ, ±1/ξ)

where ξ is the real solution to

${\displaystyle \xi ^{3}+\xi ^{2}+\xi =1,\,}$ 

which can be written

${\displaystyle \xi ={\frac {1}{3}}\left({\sqrt[{3}]{17+3{\sqrt {33}}}}-{\sqrt[{3}]{-17+3{\sqrt {33}}}}-1\right)}$ 

or approximately 0.543689. ξ is the reciprocal of the tribonacci constant.

Equally, the tribonacci constant, t, just like the snub cube, can compute the coordinates as:

(±1, ±t, ±⁠1/t⁠)

This compound can be seen as the union of the two chiral alternations of a truncated cuboctahedron:

• Compound of two icosahedra
• Compound of two snub dodecahedra
• Snub (geometry)

• Skilling, John (1976), "Uniform Compounds of Uniform Polyhedra", Mathematical Proceedings of the Cambridge Philosophical Society, 79: 447–457, doi:10.1017/S0305004100052440, MR 0397554.