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- Tetrahedral-cubic_honeycomb abstract "In the geometry of hyperbolic 3-space, the tetrahedron-cube honeycomb is a compact uniform honeycomb, constructed from cube, tetrahedron, and cuboctahedron cells, in a rhombicuboctahedron vertex figure. It has a single-ring Coxeter diagram, File:CDel node 1.pngFile:CDel split1-43.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png, and is named by its two regular cells.A geometric honeycomb is a space-filling of polyhedral or higher-dimensional cells, so that there are no gaps. It is an example of the more general mathematical tiling or tessellation in any number of dimensions.Honeycombs are usually constructed in ordinary Euclidean ("flat") space, like the convex uniform honeycombs. They may also be constructed in non-Euclidean spaces, such as hyperbolic uniform honeycombs. Any finite uniform polytope can be projected to its circumsphere to form a uniform honeycomb in spherical space.".
- Tetrahedral-cubic_honeycomb thumbnail Uniform_polyhedron-33-t0.png?width=300.
- Tetrahedral-cubic_honeycomb wikiPageID "42747596".
- Tetrahedral-cubic_honeycomb wikiPageLength "2701".
- Tetrahedral-cubic_honeycomb wikiPageOutDegree "33".
- Tetrahedral-cubic_honeycomb wikiPageRevisionID "628849136".
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Category:Honeycombs_(geometry).
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Convex_uniform_honeycombs_in_hyperbolic_space.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Coxeter_diagram.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Coxeter_group.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Coxeter–Dynkin_diagram.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Cube.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Cuboctahedron.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Geometry.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink H.S.M._Coxeter.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Harold_Scott_MacDonald_Coxeter.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Honeycomb_(geometry).
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Hyperbolic_space.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Hyperbolic_tetrahedral-octahedral_honeycomb.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Jeffrey_Weeks_(mathematician).
- Tetrahedral-cubic_honeycomb wikiPageWikiLink List_of_regular_polytopes.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink List_of_regular_polytopes_and_compounds.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Norman_Johnson_(mathematician).
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Regular_Polytopes_(book).
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Rhombicuboctahedron.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Schläfli_symbol.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Square.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Tetrahedron.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Triangle.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Triangular.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Uniform_honeycombs_in_hyperbolic_space.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink Vertex_figure.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink File:H3_4333-1000_center_ultrawide.png.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink File:Uniform_polyhedron-33-t0.png.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink File:Uniform_polyhedron-43-t0.png.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink File:Uniform_polyhedron-43-t1.png.
- Tetrahedral-cubic_honeycomb wikiPageWikiLink File:Uniform_t0_4333_honeycomb_verf.png.
- Tetrahedral-cubic_honeycomb wikiPageWikiLinkText "Tetrahedral-cubic honeycomb".
- Tetrahedral-cubic_honeycomb wikiPageWikiLinkText "tetrahedral-cubic".
- Tetrahedral-cubic_honeycomb hasPhotoCollection Tetrahedral-cubic_honeycomb.
- Tetrahedral-cubic_honeycomb wikiPageUsesTemplate Template:CDD.
- Tetrahedral-cubic_honeycomb wikiPageUsesTemplate Template:Honeycomb.
- Tetrahedral-cubic_honeycomb subject Category:Honeycombs_(geometry).
- Tetrahedral-cubic_honeycomb hypernym Honeycomb.
- Tetrahedral-cubic_honeycomb comment "In the geometry of hyperbolic 3-space, the tetrahedron-cube honeycomb is a compact uniform honeycomb, constructed from cube, tetrahedron, and cuboctahedron cells, in a rhombicuboctahedron vertex figure. It has a single-ring Coxeter diagram, File:CDel node 1.pngFile:CDel split1-43.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png, and is named by its two regular cells.A geometric honeycomb is a space-filling of polyhedral or higher-dimensional cells, so that there are no gaps.".
- Tetrahedral-cubic_honeycomb label "Tetrahedral-cubic honeycomb".
- Tetrahedral-cubic_honeycomb sameAs m.010lql4x.
- Tetrahedral-cubic_honeycomb sameAs Q17077885.
- Tetrahedral-cubic_honeycomb sameAs Q17077885.
- Tetrahedral-cubic_honeycomb wasDerivedFrom Tetrahedral-cubic_honeycomb?oldid=628849136.
- Tetrahedral-cubic_honeycomb depiction Uniform_polyhedron-33-t0.png.
- Tetrahedral-cubic_honeycomb isPrimaryTopicOf Tetrahedral-cubic_honeycomb.