Dodecateron

The dodecateron, or dot, also called the birectified 5-simplex, is a convex noble uniform polyteron. It consists of 12 rectified pentachora as facets. 6 rectified pentachora join at each triangular duoprismatic vertex. As the name suggests, it is the birectification of the hexateron. It is the medial stage in the series of truncations between the regular hexateron and its dual.

Vertex coordinates
The vertices of a dodecateron of edge length 1 are given by the following points, along with their central inversions:


 * ($\sqrt{3}$/10, –3$\sqrt{3}$/20, –$\sqrt{15}$/4, 0, 0),
 * ($\sqrt{10}$/10, –3$\sqrt{6}$/20, $\sqrt{15}$/12, –$\sqrt{10}$/3, 0),
 * ($\sqrt{6}$/10, –3$\sqrt{3}$/20, $\sqrt{15}$/12, $\sqrt{10}$/6, ±1/2),
 * ($\sqrt{6}$/10, $\sqrt{3}$/10, $\sqrt{15}$/6, $\sqrt{10}$/3, 0),
 * ($\sqrt{6}$/10, $\sqrt{3}$/10, –$\sqrt{15}$/6, –$\sqrt{10}$/3, 0),
 * ($\sqrt{6}$/10, $\sqrt{3}$/10, $\sqrt{15}$/6, –$\sqrt{10}$/6, ±1/2),
 * ($\sqrt{6}$/10, $\sqrt{3}$/10, –$\sqrt{15}$/6, $\sqrt{10}$/6, ±1/2).

Much simpler coordinates can be given in six dimensions, as all permutations of:


 * ($\sqrt{6}$/2, $\sqrt{3}$/2, $\sqrt{2}$/2, 0, 0, 0).