| Cantitruncated 24-cell | ||
|---|---|---|
Schlegel diagram, centered on truncated cuboctahedron |
||
| Type | Uniform polychoron | |
| Schläfli symbol | t0,1,2{3,4,3} | |
| Coxeter-Dynkin diagram | ||
| Cells | 144 | 24 4.6.8 96 4.4.3 24 3.8.8 |
| Faces | 720 | 192{3} 288{4} 96{6} 144{8} |
| Edges | 1152 | |
| Vertices | 576 | |
| Vertex figure | sphenoid |
|
| Symmetry group | F4, | |
| Properties | convex | |
| Uniform index | 27 28 29 | |
The cantitruncated 24-cell is a uniform polychoron derived from the 24-cell. It is bounded by 24 great rhombicuboctahedra corresponding with the cells of a 24-cell, 24 truncated cubes corresponding with the cells of the dual 24-cell, and 96 triangular prisms corresponding with the edges of the first 24-cell.
Read more about this topic: Cantellated 24-cell