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- 2_22_honeycomb abstract "In geometry, the 222 honeycomb is a uniform tessellation of the six-dimensional Euclidean space. It can be represented by the Schlafli symbol {3,3,32,2}. It is constructed from 221 facets and has a 122 vertex figure, with 54 221 polytopes around every vertex.Its vertex arrangement is the E6 lattice, and the root system of the E6 Lie group so it can also be called the E6 honeycomb.".
- 2_22_honeycomb thumbnail E6_graph.svg?width=300.
- 2_22_honeycomb wikiPageExternalLink v=onepage&q&f=false.
- 2_22_honeycomb wikiPageExternalLink productCd-0471010030.html.
- 2_22_honeycomb wikiPageID "19582093".
- 2_22_honeycomb wikiPageRevisionID "597657797".
- 2_22_honeycomb hasPhotoCollection 2_22_honeycomb.
- 2_22_honeycomb subject Category:7-polytopes.
- 2_22_honeycomb comment "In geometry, the 222 honeycomb is a uniform tessellation of the six-dimensional Euclidean space. It can be represented by the Schlafli symbol {3,3,32,2}. It is constructed from 221 facets and has a 122 vertex figure, with 54 221 polytopes around every vertex.Its vertex arrangement is the E6 lattice, and the root system of the E6 Lie group so it can also be called the E6 honeycomb.".
- 2_22_honeycomb label "2 22 honeycomb".
- 2_22_honeycomb sameAs m.04n3fqp.
- 2_22_honeycomb sameAs Q4633283.
- 2_22_honeycomb sameAs Q4633283.
- 2_22_honeycomb wasDerivedFrom 2_22_honeycomb?oldid=597657797.
- 2_22_honeycomb depiction E6_graph.svg.
- 2_22_honeycomb isPrimaryTopicOf 2_22_honeycomb.