The trapezohedron ( deltohedron , antitegum [1] ) is a polyhedron dual to antiprism . If the initial antiprism of the base is n-gons, then the corresponding trapezhedron has 2n faces in the form of a deltoid .
| Trapezohedron on -gon | ||
|---|---|---|
 Trapezohedron on a 10-gon | ||
| Combinatorics | ||
| Items |
| |
| Facets | deltoids | |
| Vertex configuration | 4.4.4 | |
| Dual polyhedron | antiprism | |
Scan
| ||
| Classification | ||
| Designations | ||
| Shlefly symbol | ||
| Dynkin diagram | ||
| Symmetry group | ||
| Rotation group | ||
Trapezohedra are called by the number of angles at the base of the antiprism, to which they are dual. For example, a quadrangular trapezohedron is a polyhedron dual to a quadrangular antiprism.
 Triangular Trapezhedron (if its edges are correct quadrangles then he is a cube) |  Quadrangular trapezhedron |
 Pentagonal Trapezhedron |  Hexagonal Trapezhedron |
Notes
- ↑ Jonathan Bauvers. Dice of the Dimensions. Dice of 3 dimensions