Rectified 10-cubes
 10-orthoplex    
|
 Rectified 10-orthoplex
|
 Birectified 10-orthoplex
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 Trirectified 10-orthoplex
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 Quadirectified 10-orthoplex
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 Quadrirectified 10-cube
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 Trirectified 10-cube
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 Birectified 10-cube
|
 Rectified 10-cube
|
 10-cube
| ||
| Orthogonal projections in BC10 Coxeter plane | |||
|---|---|---|---|
In ten-dimensional geometry, a rectified 10-cube is a convex uniform 10-polytope, being a rectification of the regular 10-cube.
There are 10 rectifications of the 10-cube, with the zeroth being the 10-cube itself. Vertices of the rectified 10-cube are located at the edge-centers of the 10-cube. Vertices of the birectified 10-cube are located in the square face centers of the 10-cube. Vertices of the trirectified 10-cube are located in the cubic cell centers of the 10-cube. The others are more simply constructed relative to the 10-cube dual polytope, the 10-orthoplex.
These polytopes are part of a family 1023 uniform 10-polytopes with BC10 symmetry.
Rectified 10-cube[edit]
| Rectified 10-orthoplex | |
|---|---|
| Type | uniform 10-polytope |
| Schläfli symbol | t1{38,4} |
| Coxeter-Dynkin diagrams |  
|
| 7-faces | |
| 6-faces | |
| 5-faces | |
| 4-faces | |
| Cells | |
| Faces | |
| Edges | 46080 |
| Vertices | 5120 |
| Vertex figure | 8-simplex prism |
| Coxeter groups | C10, [4,38] D10, [37,1,1] |
| Properties | convex |
Alternate names[edit]
- Rectified dekeract (Acronym rade) (Jonathan Bowers)[1]
Cartesian coordinates[edit]
Cartesian coordinates for the vertices of a rectified 10-cube, centered at the origin, edge length are all permutations of:
- (±1,±1,±1,±1,±1,±1,±1,±1,±1,0)
Images[edit]
| B10 | B9 | B8 |
|---|---|---|
|
|
|
|
| [20] | [18] | [16] |
| B7 | B6 | B5 |
|
|
|
| [14] | [12] | [10] |
| B4 | B3 | B2 |
|
|
|
| [8] | [6] | [4] |
| A9 | A5 | |
| — | — | |
| [10] | [6] | |
| A7 | A3 | |
| — | — | |
| [8] | [4] | |
Birectified 10-cube[edit]
| Birectified 10-orthoplex | |
|---|---|
| Type | uniform 10-polytope |
| Coxeter symbol | 0711 |
| Schläfli symbol | t2{38,4} |
| Coxeter-Dynkin diagrams | 
|
| 7-faces | |
| 6-faces | |
| 5-faces | |
| 4-faces | |
| Cells | |
| Faces | |
| Edges | 184320 |
| Vertices | 11520 |
| Vertex figure | {4}x{36} |
| Coxeter groups | C10, [4,38] D10, [37,1,1] |
| Properties | convex |
Alternate names[edit]
- Birectified dekeract (Acronym brade) (Jonathan Bowers)[2]
Cartesian coordinates[edit]
Cartesian coordinates for the vertices of a birectified 10-cube, centered at the origin, edge length are all permutations of:
- (±1,±1,±1,±1,±1,±1,±1,±1,0,0)
Images[edit]
| B10 | B9 | B8 |
|---|---|---|
|
|
|
|
| [20] | [18] | [16] |
| B7 | B6 | B5 |
|
|
|
| [14] | [12] | [10] |
| B4 | B3 | B2 |
|
|
|
| [8] | [6] | [4] |
| A9 | A5 | |
| — | — | |
| [10] | [6] | |
| A7 | A3 | |
| — | — | |
| [8] | [4] | |
Trirectified 10-cube[edit]
| Trirectified 10-orthoplex | |
|---|---|
| Type | uniform 10-polytope |
| Schläfli symbol | t3{38,4} |
| Coxeter-Dynkin diagrams |
|
| 7-faces | |
| 6-faces | |
| 5-faces | |
| 4-faces | |
| Cells | |
| Faces | |
| Edges | 322560 |
| Vertices | 15360 |
| Vertex figure | {4,3}x{35} |
| Coxeter groups | C10, [4,38] D10, [37,1,1] |
| Properties | convex |
Alternate names[edit]
- Tririrectified dekeract (Acronym trade) (Jonathan Bowers)[3]
Cartesian coordinates[edit]
Cartesian coordinates for the vertices of a triirectified 10-cube, centered at the origin, edge length are all permutations of:
- (±1,±1,±1,±1,±1,±1,±1,0,0,0)
Images[edit]
| B10 | B9 | B8 |
|---|---|---|
|
|
|
|
| [20] | [18] | [16] |
| B7 | B6 | B5 |
|
|
|
| [14] | [12] | [10] |
| B4 | B3 | B2 |
|
|
|
| [8] | [6] | [4] |
| A9 | A5 | |
| — | — | |
| [10] | [6] | |
| A7 | A3 | |
| — | — | |
| [8] | [4] | |
Quadrirectified 10-cube[edit]
| Quadrirectified 10-orthoplex | |
|---|---|
| Type | uniform 10-polytope |
| Schläfli symbol | t4{38,4} |
| Coxeter-Dynkin diagrams |
|
| 7-faces | |
| 6-faces | |
| 5-faces | |
| 4-faces | |
| Cells | |
| Faces | |
| Edges | 322560 |
| Vertices | 13440 |
| Vertex figure | {4,3,3}x{34} |
| Coxeter groups | C10, [4,38] D10, [37,1,1] |
| Properties | convex |
Alternate names[edit]
- Quadrirectified dekeract
- Quadrirectified decacross (Acronym terade) (Jonathan Bowers)[4]
Cartesian coordinates[edit]
Cartesian coordinates for the vertices of a quadrirectified 10-cube, centered at the origin, edge length are all permutations of:
- (±1,±1,±1,±1,±1,±1,0,0,0,0)
Images[edit]
| B10 | B9 | B8 |
|---|---|---|
|
|
|
|
| [20] | [18] | [16] |
| B7 | B6 | B5 |
|
|
|
| [14] | [12] | [10] |
| B4 | B3 | B2 |
|
|
|
| [8] | [6] | [4] |
| A9 | A5 | |
| — | — | |
| [10] | [6] | |
| A7 | A3 | |
| — | — | |
| [8] | [4] | |
Notes[edit]
References[edit]
- H.S.M. Coxeter:
- H.S.M. Coxeter, Regular Polytopes, 3rd Edition, Dover New York, 1973
- Kaleidoscopes: Selected Writings of H.S.M. Coxeter, edited by F. Arthur Sherk, Peter McMullen, Anthony C. Thompson, Asia Ivic Weiss, Wiley-Interscience Publication, 1995, ISBN 978-0-471-01003-6 [1]
- (Paper 22) H.S.M. Coxeter, Regular and Semi Regular Polytopes I, [Math. Zeit. 46 (1940) 380–407, MR 2,10]
- (Paper 23) H.S.M. Coxeter, Regular and Semi-Regular Polytopes II, [Math. Zeit. 188 (1985) 559-591]
- (Paper 24) H.S.M. Coxeter, Regular and Semi-Regular Polytopes III, [Math. Zeit. 200 (1988) 3-45]
- Norman Johnson Uniform Polytopes, Manuscript (1991)
- N.W. Johnson: The Theory of Uniform Polytopes and Honeycombs, Ph.D. (1966)
- Klitzing, Richard. "10D uniform polytopes (polyxenna)". x3o3o3o3o3o3o3o3o4o - ka, o3x3o3o3o3o3o3o3o4o - rake, o3o3x3o3o3o3o3o3o4o - brake, o3o3o3x3o3o3o3o3o4o - trake, o3o3o3o3x3o3o3o3o4o - terake, o3o3o3o3o3x3o3o3o4o - terade, o3o3o3o3o3o3x3o3o4o - trade, o3o3o3o3o3o3o3x3o4o - brade, o3o3o3o3o3o3o3o3x4o - rade, o3o3o3o3o3o3o3o3o4x - deker