Rectified 10-cubes

In ten-dimensional geometry, a rectified 10-cube is a convex uniform 10-polytope, being a rectification of the regular 10-cube.

10-orthoplex	Rectified 10-orthoplex	Birectified 10-orthoplex	Trirectified 10-orthoplex
Quadirectified 10-orthoplex	Quadrirectified 10-cube	Trirectified 10-cube	Birectified 10-cube
Rectified 10-cube	10-cube
Orthogonal projections in BC10 Coxeter plane

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

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

• Rectified dekeract (Acronym rade) (Jonathan Bowers)^[1]

Cartesian coordinates

Cartesian coordinates for the vertices of a rectified 10-cube, centered at the origin, edge length ${\displaystyle {\sqrt {2}}}$ are all permutations of:

(±1,±1,±1,±1,±1,±1,±1,±1,±1,0)

Images

Orthographic projections

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

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

• Birectified dekeract (Acronym brade) (Jonathan Bowers)^[2]

Cartesian coordinates

Cartesian coordinates for the vertices of a birectified 10-cube, centered at the origin, edge length ${\displaystyle {\sqrt {2}}}$ are all permutations of:

(±1,±1,±1,±1,±1,±1,±1,±1,0,0)

Images

Orthographic projections

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

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

• Tririrectified dekeract (Acronym trade) (Jonathan Bowers)^[3]

Cartesian coordinates

Cartesian coordinates for the vertices of a triirectified 10-cube, centered at the origin, edge length ${\displaystyle {\sqrt {2}}}$ are all permutations of:

(±1,±1,±1,±1,±1,±1,±1,0,0,0)

Images

Orthographic projections

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

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

• Quadrirectified dekeract
• Quadrirectified decacross (Acronym terade) (Jonathan Bowers)^[4]

Cartesian coordinates

Cartesian coordinates for the vertices of a quadrirectified 10-cube, centered at the origin, edge length ${\displaystyle {\sqrt {2}}}$ are all permutations of:

(±1,±1,±1,±1,±1,±1,0,0,0,0)

Images

Orthographic projections

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]