10-simplex

Template:Short description

Regular hendecaxennon (10-simplex)
File:10-simplex t0.svg Orthogonal projection inside Petrie polygon
Type	Regular 10-polytope
Family	simplex
Schläfli symbol	{3,3,3,3,3,3,3,3,3}
Coxeter-Dynkin diagram	Template:CDD
9-faces	11 9-simplexFile:9-simplex t0.svg
8-faces	55 8-simplexFile:8-simplex t0.svg
7-faces	165 7-simplexFile:7-simplex t0.svg
6-faces	330 6-simplexFile:6-simplex t0.svg
5-faces	462 5-simplexFile:5-simplex t0.svg
4-faces	462 5-cellFile:4-simplex t0.svg
Cells	330 tetrahedronFile:3-simplex t0.svg
Faces	165 triangleFile:2-simplex t0.svg
Edges	55
Vertices	11
Vertex figure	9-simplex
Petrie polygon	hendecagon
Coxeter group	A₁₀ [3,3,3,3,3,3,3,3,3]
Dual	Self-dual
Properties	convex

In geometry, a 10-simplex is a self-dual regular 10-polytope. It has 11 vertices, 55 edges, 165 triangle faces, 330 tetrahedral cells, 462 5-cell 4-faces, 462 5-simplex 5-faces, 330 6-simplex 6-faces, 165 7-simplex 7-faces, 55 8-simplex 8-faces, and 11 9-simplex 9-faces. Its dihedral angle is cos⁻¹(1/10), or approximately 84.26°.

It can also be called a hendecaxennon, or hendeca-10-tope, as an 11-facetted polytope in 10-dimensions. Acronym: uxTemplate:Sfn

The name hendecaxennon is derived from hendeca for 11 facets in Greek and -xenn (variation of ennea for nine), having 9-dimensional facets, and -on.

Coordinates

The Cartesian coordinates of the vertices of an origin-centered regular 10-simplex having edge length 2 are:

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, \sqrt{1 / 21}, \sqrt{1 / 15}, \sqrt{1 / 10}, \sqrt{1 / 6}, \sqrt{1 / 3}, \pm 1)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, \sqrt{1 / 21}, \sqrt{1 / 15}, \sqrt{1 / 10}, \sqrt{1 / 6}, - 2 \sqrt{1 / 3}, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, \sqrt{1 / 21}, \sqrt{1 / 15}, \sqrt{1 / 10}, - \sqrt{3 / 2}, 0, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, \sqrt{1 / 21}, \sqrt{1 / 15}, - 2 \sqrt{2 / 5}, 0, 0, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, \sqrt{1 / 21}, - \sqrt{5 / 3}, 0, 0, 0, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, \sqrt{1 / 28}, - \sqrt{12 / 7}, 0, 0, 0, 0, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, 1 / 6, - \sqrt{7 / 4}, 0, 0, 0, 0, 0, 0)

(\sqrt{1 / 55}, \sqrt{1 / 45}, - 4 / 3, 0, 0, 0, 0, 0, 0, 0)

(\sqrt{1 / 55}, - 3 \sqrt{1 / 5}, 0, 0, 0, 0, 0, 0, 0, 0)

(- \sqrt{20 / 11}, 0, 0, 0, 0, 0, 0, 0, 0, 0)

More simply, the vertices of the 10-simplex can be positioned in 11-space as permutations of (0,0,0,0,0,0,0,0,0,0,1). This construction is based on facets of the 11-orthoplex.

Images

Template:A10 Coxeter plane graphs

Related polytopes

The 2-skeleton of the 10-simplex is topologically related to the 11-cell abstract regular polychoron which has the same 11 vertices, 55 edges, but only 1/3 the faces (55).

References

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Template:KlitzingPolytopes x3o3o3o3o3o3o3o3o3o – ux Template:Sfn whitelist

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10-simplex

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10-simplex

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