Quasiregular rhombic tiling
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| Quasiregular rhombic tiling | |
|---|---|
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| Type | Dual semiregular tiling |
| Faces | Rhombus |
| Edges | Infinite |
| Vertices | Infinite |
| Face configuration | V3.6.3.6 |
| Symmetry group | p6m |
| Dual | Trihexagonal_tiling |
| Properties | planar, face-uniform |
In geometry, the Quasiregular rhombic tiling is a tiling of identical 60° rhombi polygons on the Euclidean plane. There are two types of vertices, one with three rhombi and one with six rhombi.
This is the dual of the trihexagonal tiling.
This tiling is topologically related as a part of sequence of polyhedra constructed from rhombic faces. This set is called quasi-regular because there is only one type of face, with equal edge lengths, but they are not regular polygons.
 V3.3.3.3 |
 V3.4.3.4 |
 V3.5.3.5 |
See also:
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