Tetrahedral cupola
From Wikipedia, the free encyclopedia
In 4-dimensional geometry, the tetrahedral cupola is a polychoron bounded by one tetrahedron, a parallel cuboctahedron, connected by 10 triangular prisms, and 4 triangular pyramids.[1]
This article relies largely or entirely on a single source. (April 2024) |
Tetrahedral cupola | ||
---|---|---|
Schlegel diagram | ||
Type | Polyhedral cupola | |
Schläfli symbol | {3,3} v rr{3,3} | |
Cells | 16 | 1 rr{3,3} 1+4 {3,3} 4+6 {}×{3} |
Faces | 42 | 24 triangles 18 squares |
Edges | 42 | |
Vertices | 16 | |
Dual | ||
Symmetry group | [3,3,1], order 24 | |
Properties | convex, regular-faced |