Hexagonal-hemiapeirogonal tiling
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| Hexagonal-hemiapeirogonal tiling | |
|---|---|
 | |
| Rank | 3 |
| Type | Uniform |
| Space | Euclidean |
| Notation | |
| Bowers style acronym | Hoha |
| Coxeter diagram | (x6/5o6x∞*a) /2 |
| Elements | |
| Faces | MN hexagons, 6N apeirogons |
| Edges | 6MN |
| Vertices | 3MN |
| Vertex figure | Bowtie, edge lengths √3, 2 |
| Related polytopes | |
| Army | That |
| Regiment | That |
| Conjugate | None |
| Abstract & topological properties | |
| Flag count | 24MN |
| Orientable | No |
| Genus | ∞ |
| Properties | |
| Symmetry | V3 |
| Convex | No |
| Nature | Tame |
The hexagonal-hemiapeirogonal tiling, or hoha, is a nonconvex uniform tiling of the Euclidean plane. 2 hexagons and 2 apeirogons join at each vertex of this tiling.
It is based on the same edge set as the trihexagonal tiling, while only using its hexagons and omitting the triangles
External links[edit | edit source]
- Klitzing, Richard. "hoha".
- McNeill, Jim. "Infinite and Semi".