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The rectified order-5 hexagonal tiling honeycomb, t 1 {6,3,5}, has icosahedron and trihexagonal tiling facets, with a pentagonal prism vertex figure. It is similar to the 2D hyperbolic infinite-order square tiling, r{∞,5} with pentagon and apeirogonal faces. All vertices are on the ideal surface.
The order-5 truncated pentagonal hexecontahedron is a convex polyhedron with 72 faces: 60 hexagons and 12 pentagons triangular, with 210 edges, and 140 vertices. Its dual is the pentakis snub dodecahedron. It is Goldberg polyhedron {5+,3} 2,1 in the icosahedral family, with chiral symmetry. The relationship between pentagons steps into 2 ...
Truncated order-5 hexagonal tiling Poincaré disk model of the hyperbolic plane: Type: Hyperbolic uniform tiling: Vertex configuration: 5.12.12 Schläfli symbol: t{6,5} Wythoff symbol: 2 5 | 6 Coxeter diagram: Symmetry group [6,5], (*652) Dual: Order-6 pentakis pentagonal tiling: Properties: Vertex-transitive
In other projects Wikimedia Commons; Wikidata item; Appearance. move to sidebar hide. Help ... Truncated order-5 hexagonal tiling; Truncated order-6 hexagonal tiling;
In geometry, the truncated hexagonal tiling is a semiregular tiling of the Euclidean plane.There are 2 dodecagons (12-sides) and one triangle on each vertex.. As the name implies this tiling is constructed by a truncation operation applied to a hexagonal tiling, leaving dodecagons in place of the original hexagons, and new triangles at the original vertex locations.
5 6 7 Rows of squares with horizontal offsets Rows of triangles with horizontal offsets A tiling by squares: Three hexagons surround each triangle Six triangles surround every hexagon. Three size triangles cmm (2*22) p2 (2222) cmm (2*22) p4m (*442) p6 (632) p3 (333) Hexagonal tiling Square tiling Truncated square tiling Truncated hexagonal tiling
Order-5 hexagonal tiling Poincaré disk model of the hyperbolic plane: Type: Hyperbolic regular tiling: Vertex configuration: 6 5: Schläfli symbol {6,5} Wythoff symbol: 5 | 6 2 Coxeter diagram: Symmetry group [6,5], (*652) Dual: Order-6 pentagonal tiling: Properties: Vertex-transitive, edge-transitive, face-transitive
From a Wythoff construction there are fourteen hyperbolic uniform tilings that can be based from the regular order-5 hexagonal tiling. Drawing the tiles colored as red on the original faces, yellow at the original vertices, and blue along the original edges, there are seven forms with full [6,5] symmetry, and three with subsymmetry.