Triangular duoantiprism

The triangular duoantiprism or triddap, also known as the triangular-triangular duoantiprism, the 3 duoantiprism or the 3-3 duoantiprism, is a convex isogonal polychoron that consists of 12 triangular antiprisms and 18 tetragonal disphenoids. 4 triangular antiprisms and 4 tetragonal disphenoids join at each vertex. It can be obtained through the process of alternating the hexagonal duoprism. However, it cannot be made uniform, and has two edge lengths. Together with its dual, it is the first in an infinite family of triangular antiprismatic swirlchora.

The ratio between the longest and shortest edges is $$1:\frac{\sqrt6}{2} ≈ 1:1.22474$$.

Vertex coordinates
The vertices of a triangular duoantiprism based on triangles of edge length 1, centered at the origin, are given by:
 * $$±\left(0,\,\frac{\sqrt3}{3},\,0,\,\frac{\sqrt3}{3}\right),$$
 * $$±\left(0,\,\frac{\sqrt3}{3},\,±\frac12,\,-\frac{\sqrt3}{6}\right),$$
 * $$±\left(±\frac12,\,-\frac{\sqrt3}{6},\,0,\,\frac{\sqrt3}{3}\right),$$
 * $$±\left(±\frac12,\,\frac{\sqrt3}{6},\,±\frac12,\,\frac{\sqrt3}{6}\right).$$

These coordinates show that a triangular duoantiprism can be obtained as the convex hull of two inversely oriented triangular duoprisms.

Isogonal derivatives
Substitution by vertices of these following elements will produce these convex isogonal polychora:
 * Triangular antiprism (12): Hexagonal duotegum
 * Tetragonal disphenoid (18): Triangular duoantiprism
 * Triangle (12): Hexagonal duotegum
 * Isosceles triangle (72): Hexagonal ditetragoltriate
 * Edge (36): Hexagonal duoprism
 * Edge (36): Triangular double gyroantiprismoid