Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Apeirogonal_hosohedron> ?p ?o }
Showing triples 1 to 58 of
58
with 100 triples per page.
- Apeirogonal_hosohedron abstract "In geometry, an apeirogonal hosohedron or infinite hosohedronis a tiling of the plane consisting of two vertices at infinity. It may be considered an improper regular tiling of the Euclidean plane, with Schläfli symbol {2,∞}.".
- Apeirogonal_hosohedron thumbnail Apeirogonal_tiling.png?width=300.
- Apeirogonal_hosohedron wikiPageExternalLink tessel.htm.
- Apeirogonal_hosohedron wikiPageID "42115167".
- Apeirogonal_hosohedron wikiPageLength "3060".
- Apeirogonal_hosohedron wikiPageOutDegree "38".
- Apeirogonal_hosohedron wikiPageRevisionID "666461017".
- Apeirogonal_hosohedron wikiPageWikiLink Apeirogonal_antiprism.
- Apeirogonal_hosohedron wikiPageWikiLink Apeirogonal_prism.
- Apeirogonal_hosohedron wikiPageWikiLink Cantellation_(geometry).
- Apeirogonal_hosohedron wikiPageWikiLink Category:Apeirogonal_tilings.
- Apeirogonal_hosohedron wikiPageWikiLink Category:Euclidean_tilings.
- Apeirogonal_hosohedron wikiPageWikiLink Category:Isogonal_tilings.
- Apeirogonal_hosohedron wikiPageWikiLink Category:Isohedral_tilings.
- Apeirogonal_hosohedron wikiPageWikiLink Category:Regular_tilings.
- Apeirogonal_hosohedron wikiPageWikiLink Coxeter–Dynkin_diagram.
- Apeirogonal_hosohedron wikiPageWikiLink Euclidean_geometry.
- Apeirogonal_hosohedron wikiPageWikiLink Euclidean_tilings_by_convex_regular_polygons.
- Apeirogonal_hosohedron wikiPageWikiLink Geometry.
- Apeirogonal_hosohedron wikiPageWikiLink Hosohedron.
- Apeirogonal_hosohedron wikiPageWikiLink Infinity.
- Apeirogonal_hosohedron wikiPageWikiLink Omnitruncation.
- Apeirogonal_hosohedron wikiPageWikiLink Order-2_apeirogonal_tiling.
- Apeirogonal_hosohedron wikiPageWikiLink Plane_(geometry).
- Apeirogonal_hosohedron wikiPageWikiLink Rectification_(geometry).
- Apeirogonal_hosohedron wikiPageWikiLink Schläfli_symbol.
- Apeirogonal_hosohedron wikiPageWikiLink Truncation_(geometry).
- Apeirogonal_hosohedron wikiPageWikiLink Uniform_polyhedron.
- Apeirogonal_hosohedron wikiPageWikiLink Uniform_tiling.
- Apeirogonal_hosohedron wikiPageWikiLink Vertex_figure.
- Apeirogonal_hosohedron wikiPageWikiLink Wythoff_symbol.
- Apeirogonal_hosohedron wikiPageWikiLink File:Apeirogonal_hosohedron.png.
- Apeirogonal_hosohedron wikiPageWikiLink File:Apeirogonal_tiling.png.
- Apeirogonal_hosohedron wikiPageWikiLink File:Infinite_antiprism.png.
- Apeirogonal_hosohedron wikiPageWikiLink File:Infinite_prism_tiling.png.
- Apeirogonal_hosohedron wikiPageWikiLink File:Infinite_prism_tiling2.png.
- Apeirogonal_hosohedron wikiPageWikiLinkText "apeirogonal hosohedron".
- Apeirogonal_hosohedron wikiPageWikiLinkText "{2, ∞}".
- Apeirogonal_hosohedron wikiPageWikiLinkText "{2,∞}".
- Apeirogonal_hosohedron wikiPageUsesTemplate Template:CDD.
- Apeirogonal_hosohedron wikiPageUsesTemplate Template:Geometry-stub.
- Apeirogonal_hosohedron wikiPageUsesTemplate Template:Reflist.
- Apeirogonal_hosohedron wikiPageUsesTemplate Template:Tessellation.
- Apeirogonal_hosohedron wikiPageUsesTemplate Template:Uniform_tiles_db.
- Apeirogonal_hosohedron subject Category:Apeirogonal_tilings.
- Apeirogonal_hosohedron subject Category:Euclidean_tilings.
- Apeirogonal_hosohedron subject Category:Isogonal_tilings.
- Apeirogonal_hosohedron subject Category:Isohedral_tilings.
- Apeirogonal_hosohedron subject Category:Regular_tilings.
- Apeirogonal_hosohedron comment "In geometry, an apeirogonal hosohedron or infinite hosohedronis a tiling of the plane consisting of two vertices at infinity. It may be considered an improper regular tiling of the Euclidean plane, with Schläfli symbol {2,∞}.".
- Apeirogonal_hosohedron label "Apeirogonal hosohedron".
- Apeirogonal_hosohedron sameAs Q16829468.
- Apeirogonal_hosohedron sameAs m.0_x7s_b.
- Apeirogonal_hosohedron sameAs Q16829468.
- Apeirogonal_hosohedron sameAs 無限面形.
- Apeirogonal_hosohedron wasDerivedFrom Apeirogonal_hosohedron?oldid=666461017.
- Apeirogonal_hosohedron depiction Apeirogonal_tiling.png.
- Apeirogonal_hosohedron isPrimaryTopicOf Apeirogonal_hosohedron.