Hexagonal duotransitionaltertegum
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| Hexagonal duotransitionaltertegum | |
|---|---|
| Rank | 4 |
| Type | Isotopic |
| Elements | |
| Cells | 144 kite pyramids |
| Faces | 144 scalene triangles, 144 isosceles triangles, 72 kites |
| Edges | 24+36+72+144 |
| Vertices | 12+12+36 |
| Vertex figure | 12 vertical-laterobisected joined hexagonal prisms, 12 hexagonal tegums, 36 digonal scalenohedra |
| Measures (edge length 1) | |
| Central density | 1 |
| Related polytopes | |
| Dual | Hexagonal duotransitionalterprism |
| Abstract & topological properties | |
| Euler characteristic | 0 |
| Orientable | Yes |
| Properties | |
| Symmetry | G2≀S2, order 288 |
| Convex | Yes |
| Nature | Tame |
The hexagonal duotransitionaltertegum is a convex isochoric polychoron and member of the duotransitionaltertegum family with 144 kite pyramids as cells.
Each cell of this polychoron has mirror symmetry, with 1 kite, 2 isosceles triangles, and 2 scalene triangles for faces.