In geometry, a pentagon tiling is a tiling of the plane by pentagons. A regular pentagonal tiling on the Euclidean plane is impossible because the internal angle of a regular pentagon, 108 is not a divisor of 360. There are fourteen known types of convex pentagon that tile the plane; it is not known if this list is complete.
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There are 3 isohedral pentagonal tilings generated as duals of the uniform tilings:
Cairo pentagonal tiling |
Floret pentagonal tiling |
Prismatic pentagonal tiling |
A dodecahedron can be considered a regular tiling of 12 pentagons on the surface of a sphere, with Schlafli symbol {5,3}, having 3 pentagons around reach vertex.
In the hyperbolic plane, there are tilings of regular pentagons, for instance order-4 pentagonal tiling, with Schlafli symbol {5,4}, having 4 pentagons around reach vertex. Higher order regular tilings {5,n} can be constructed on the hyperbolic plane, ending in {5,∞}.
| Sphere | Hyperbolic plane | ||||
|---|---|---|---|---|---|
Dodecahedron {5,3} |
order-4 pentagonal tiling {5,4} |
order-5 pentagonal tiling {5,5} |
order-6 pentagonal tiling {5,6} |
order-7 pentagonal tiling {5,7} |
...{5,∞} |
There are an infinite number of dual uniform tilings in hyperbolic plane with isogonal irregular pentagonal faces. They have face configurations as V3.3.p.3.q.
| 7-3 | 8-3 | 9-3 | ... | 5-4 | 6-4 | 7-4 | ... | 5-5 | |
|---|---|---|---|---|---|---|---|---|---|
V3.3.3.3.7 |
V3.3.3.3.8 | V3.3.3.3.9 | ... | V3.3.4.3.5 |
V3.3.4.3.6 | V3.3.4.3.7 | ... | V3.3.5.3.5 | ... |