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- Wythoff symbol '''Wythoff symbols''' are a way of describing [[uniform polyhedra]] by decorating the symbol of the ''Schwarz triangles''.3 KB (474 words) - 21:48, 11 February 2014
- Polytope ...dimensional polytopes. Polytopes are grouped by their dimension into the ''polygons'', ''polyhedra'', ''polychora'', ''polytera'', ''polypeta'', etc. == Uniform polytope ==3 KB (392 words) - 13:09, 15 March 2014
- Hexagon }}{{STS Uniform polytope ...d polygon. It is also the truncated [[triangle]]. It is one of the regular polygons that can tile the plain.1 KB (204 words) - 14:56, 26 March 2017
- Xylochoron }}{{STS Uniform polytope ...r polygons, and the cuboctahedron which has two different types of regular polygons for its faces, the cells of the 24-cell are all identical, regular [[octahe7 KB (1,077 words) - 14:26, 26 March 2017
- Triangle | dual=''Self-dual''}}{{STS Uniform polytope Triangles are one of the three regular polygons that can tile the plain, forming the [[triangular tiling]].2 KB (207 words) - 10:40, 26 March 2017
- Duoprism <[#ontology [kind class] [cats 4D Ringed_form Uniform Polytope]]> A '''duoprism''' is the Cartesian product of two polygons. In other words, it is the set of all combinations of points (w,x,y,z) wher2 KB (398 words) - 19:54, 8 February 2014
- SSC2 === Regular polygons === Regular polygon [[dual]]s are exactly the same as regular polygons except they are written as Hx rather than Gx. Functionally, they are mainly11 KB (1,890 words) - 20:11, 8 February 2014
- List of uniform polychora <[#ontology [kind meta] [cats 4D Uniform Polytope]]> ...mple data for each of the ([[convex]], [[Euclidean]], non-[[prismatic]]) [[uniform]] [[polychora]].23 KB (3,683 words) - 21:20, 11 February 2014
- Dimensional Features Summary ... the Gosset ''k''<sub>21</sub> polytope diverges into a distinct family of uniform polytopes. In 5D, it coincides with the demihypercube; in 4D it coincides w11 KB (1,862 words) - 20:00, 30 October 2017
- CRF All regular and uniform polytopes in all dimensions are CRF. In 2D, the CRF polytopes are exactly the regular polygons.2 KB (277 words) - 20:54, 4 July 2016
