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- 120-cell abstract "In geometry, the 120-cell (or hecatonicosachoron) is the convex regular 4-polytope with Schläfli symbol {5,3,3}. The boundary of the 120-cell is composed of 120 dodecahedral cells with 4 meeting at each vertex.It can be thought of as the 4-dimensional analog of the dodecahedron and has been called a dodecaplex (short for "dodecahedral complex"), hyperdodecahedron, and polydodecahedron. Just as a dodecahedron can be built up as a model with 12 pentagons, 3 around each vertex, the dodecaplex can be built up from 120 dodecahedra, with 3 around each edge.The Davis 120-cell, introduced by Davis (1985), is a compact 4-dimensional hyperbolic manifold obtained by identifying opposite faces of the 120-cell, whose universal cover gives the regular honeycomb {5,3,3,5} of 4-dimensional hyperbolic space.".
- 120-cell thumbnail Schlegel_wireframe_120-cell.png?width=300.
- 120-cell wikiPageExternalLink 120cell.
- 120-cell wikiPageExternalLink www.polytope.de.
- 120-cell wikiPageExternalLink c120.html.
- 120-cell wikiPageExternalLink Dissertation.pdf.
- 120-cell wikiPageExternalLink 120-cell.
- 120-cell wikiPageExternalLink productCd-0471010030.html.
- 120-cell wikiPageExternalLink watch?v=MFXRRW9goTs.
- 120-cell wikiPageID "717358".
- 120-cell wikiPageRevisionID "603873352".
- 120-cell anchor "hecatonicosachoron".
- 120-cell cellList "120".
- 120-cell coxeterGroup "H4, [3,3,5]".
- 120-cell dual "600".
- 120-cell edgeCount "1200".
- 120-cell faceList "720".
- 120-cell hasPhotoCollection 120-cell.
- 120-cell imageCaption "Schlegel diagram".
- 120-cell imageFile "Schlegel wireframe 120-cell.png".
- 120-cell index "32".
- 120-cell last "31".
- 120-cell name "120".
- 120-cell next "33".
- 120-cell petriePolygon "30".
- 120-cell propertyList Convex_set.
- 120-cell propertyList Isogonal_figure.
- 120-cell propertyList Isohedral_figure.
- 120-cell propertyList Isotoxal_figure.
- 120-cell schläfli "{5,3,3}".
- 120-cell title "120".
- 120-cell title "Convex uniform polychora based on the hecatonicosachoron and hexacosichoron - Model 32".
- 120-cell title "Hecatonicosachoron".
- 120-cell type Convex_regular_polychoron.
- 120-cell urlname "120".
- 120-cell urlname "section4.html".
- 120-cell vertexCount "600".
- 120-cell vertexFigure "80".
- 120-cell subject Category:Four-dimensional_geometry.
- 120-cell subject Category:Polychora.
- 120-cell comment "In geometry, the 120-cell (or hecatonicosachoron) is the convex regular 4-polytope with Schläfli symbol {5,3,3}. The boundary of the 120-cell is composed of 120 dodecahedral cells with 4 meeting at each vertex.It can be thought of as the 4-dimensional analog of the dodecahedron and has been called a dodecaplex (short for "dodecahedral complex"), hyperdodecahedron, and polydodecahedron.".
- 120-cell label "120-cel".
- 120-cell label "120-cell".
- 120-cell label "120-celle".
- 120-cell label "120-ячейник".
- 120-cell label "Hecatonicosacoron".
- 120-cell label "Hécatonicosachore".
- 120-cell label "正一百二十胞体".
- 120-cell label "正百二十胞体".
- 120-cell sameAs 120-nadstěn.
- 120-cell sameAs Hecatonicosacoron.
- 120-cell sameAs Hécatonicosachore.
- 120-cell sameAs 120-celle.
- 120-cell sameAs 正百二十胞体.
- 120-cell sameAs 정백이십포체.
- 120-cell sameAs 120-cel.
- 120-cell sameAs m.035czp.
- 120-cell sameAs Q736191.
- 120-cell sameAs Q736191.
- 120-cell wasDerivedFrom 120-cell?oldid=603873352.
- 120-cell depiction Schlegel_wireframe_120-cell.png.
- 120-cell isPrimaryTopicOf 120-cell.