User:Tomruen/configuration

The configuration matrix shows the number of k-face elements along the diagonal, while the nondiagonal element show the incidence counts between all elements.[1] The number of elements of its facets can be seen on the bottom row, left of the diagonal, and k-face elements above that. The top row, right of the diagonal represent the number of elements of the vertex figure. The second row contains the edge-figures, and so on. These figures are the duals of the k-faces of the dual polytope, which can be seen by rotating the matrix 180 degrees.

For regular n-polytopes, the there are only one type of element, so the matrix is n×n. For irregular polytopes, the matrix is expanded with one row per element type, which in the limit contains one row for every element. Like a general polyhedron with v vertices, e edges and f faces would have v+e+f total rows and columns.

Polygons edit

Regular polygons

xno
. . | n | 2
----+---+--
x . | 2 | n

x-2n-o
.    . | 2n | 2
-------+----+---
x    . | 2  | 2n

x3o
. . | 3 | 2
----+---+--
x . | 2 | 3

x4o
. . | 4 | 2
----+---+--
x . | 2 | 4

x5o
. . | 5 | 2
----+---+--
x . | 2 | 5

x6o
. . | 6 | 2
----+---+--
x . | 2 | 6

Triangle edit

Triangles

Equilateral
{3}

Isosceles
{ }∨( )

Scalene
( )∨( )∨( )

(v:3; e:3)

(v:2+1; e:2+1)

(v:1+1+1; e:1+1+1)

  | A | a 
--+---+---
A | 3 | 2 
--+---+---
a | 2 | 3

  | A B | a b
--+-----+-----
A | 2 * | 1 1
B | * 1 | 2 0
--+-----+-----
a | 1 1 | 2 * 
b | 2 0 | * 1

  | A B C | a b c
--+-------+-------
A | 1 * * | 0 1 1
B | * 1 * | 1 0 1 
C | * * 1 | 1 1 0 
--+-------+-------
a | 0 1 1 | 1 * * 
b | 1 0 1 | * 1 * 
c | 1 1 0 | * * 1

Quadrilateral edit

Quadrilaterals

Square
{4}

Rectangle
{ }×{ }

Rhombus
{ }+{ }

Parallelogram

Isosceles trapezoid
{ }||{ }

Kite

General

(v:4; e:4)

(v:4; e:2+2)

(v:2+2; e:4)

(v:2+2; e:2+2)

(v:2+2; e:1+1+2)

(v:1+1+2; e:2+2)

(v:1+1+1+1; e:1+1+1+1)

  | A | a 
--+---+---
A | 4 | 2 
--+---+---
a | 2 | 4

  | A | a b
--+---+-----
A | 4 | 1 1
--+---+-----
a | 2 | 2 * 
b | 2 | * 2

  | A B | a
--+-----+---
A | 2 * | 2 
B | * 2 | 2 
--+-----+---
a | 1 1 | 4

  | A B | a b
--+-----+-----
A | 2 * | 1 1
B | * 2 | 1 1
--+-----+-----
a | 1 1 | 2 * 
b | 1 1 | * 2

  | A B | a b c
--+-----+-------
A | 2 * | 1 0 1 
B | * 2 | 0 1 1
--+-----+------
a | 2 0 | 1 * *
b | 0 2 | * 1 *
c | 1 1 | * * 2

  | A B C | a b
--+-------+----
A | 1 * * | 2 0 
B | * 1 * | 0 2
C | * * 2 | 1 1
--+-------+----
a | 1 0 1 | 2 *
b | 0 1 1 | * 2

  | A B C D | a b c d
--+---------+--------
A | 1 * * * | 1 0 0 1
B | * 1 * * | 1 1 0 0 
C | * * 1 * | 0 1 1 0
D | * * * 1 | 0 0 1 1
--+---------+--------
a | 1 1 0 0 | 1 * * *
b | 0 1 1 0 | * 1 * *
c | 0 0 1 1 | * * 1 *
d | 1 0 0 1 | * * * 1

Polyhedra edit

Regular polyhedra

Platonic solid
{p,q}

Tetrahedron ^[1]
{3,3}
(v:4; e:6; f:4)

Icosahedron^[2]
{3,5}
(v:12; e:30; f:20)

Dodecahedron ^[3]
{5,3}
(v:20; e:30; f:12)

Stellated dodecahedron ^[4]
{5/2,5}
(v:12; e:30; f:12)

	v	e	f
v	4p/k	q	q
e	2	2pq/k	2
f	p	p	4q/k

With k=4-(p-2)(q-2)

x3o3o
. . . | 4 | 3 | 3
------+---+---+--
x . . | 2 | 6 | 2
------+---+---+--
x3o . | 3 | 3 | 4

x3o5o
. . . | 12 |  5 |  5
------+----+----+---
x . . |  2 | 30 |  2
------+----+----+---
x3o . |  3 |  3 | 20

o3o5x
. . . | 20 |  3 |  3
------+----+----+---
. . x |  2 | 30 |  2
------+----+----+---
. o5x |  5 |  5 | 12

x5/2o5o
.   . . | 12 |  5 |  5
--------+----+----+---
x   . . |  2 | 30 |  2
--------+----+----+---
x5/2o . |  5 |  5 | 12

Octahedron ^[5]
{3,4}
(v:6; e:12; f:8)

Cube ^[6]
{4,3}
(v:8; e:12; f:6)

Great icosahedron ^[7]
{3,5/2}
(v:12; e:30; f:20)

Great stellated dodecahedron ^[8]
{5/2,3}
(v:20; e:30; f:12)

Great dodecahedron ^[9]
{5,5/2}
(v:12; e:30; f:12)

x3o4o
. . . | 6 |  4 | 4
------+---+----+--
x . . | 2 | 12 | 2
------+---+----+--
x3o . | 3 |  3 | 8

o3o4x
. . . | 8 |  3 | 3
------+---+----+--
. . x | 2 | 12 | 2
------+---+----+--
. o4x | 4 |  4 | 6

o5/2o3x
.   . . | 12 |  5 |  5
--------+----+----+---
.   . x |  2 | 30 |  2
--------+----+----+---
.   o3x |  3 |  3 | 20

x5/2o3o
.   . . | 20 |  3 |  3
--------+----+----+---
x   . . |  2 | 30 |  2
--------+----+----+---
x5/2o . |  5 |  5 | 12

o5/2o5x
.   . . | 12 |  5 |  5
--------+----+----+---
.   . x |  2 | 30 |  2
--------+----+----+---
.   o5x |  5 |  5 | 12

Tetrahedra edit

Tetrahedra

Regular
(v:4; e:6; f:4)

tetragonal disphenoid
(v:4; e:2+4; f:4)

Rhombic disphenoid
(v:4; e:2+2+2; f:4)

Digonal disphenoid
(v:2+2; e:4+1+1; f:2+2)

Phyllic disphenoid
(v:2+2; e:2+2+1+1; f:2+2)

  A| 4 | 3 | 3
---+---+---+--
  a| 2 | 6 | 2
---+---+---+--
aaa| 3 | 3 | 4

  A| 4 | 2 1 | 3
---+---+-----+--
  a| 2 | 4 * | 2
  b| 2 | * 2 | 2
---+---+-----+--
aab| 3 | 2 1 | 4

   A| 4 | 1 1 1 | 3
----+---+-------+--
   a| 2 | 2 * * | 2
   b| 2 | * 2 * | 2
   c| 2 | * * 2 | 2
----+---+-------+--
 abc| 3 | 1 1 1 | 4

  A| 2 * | 2 1 0 | 2 1
  B| * 2 | 2 0 1 | 1 2
---+-----+-------+----
  a| 1 1 | 4 * * | 1 1
  b| 2 0 | * 1 * | 2 0
  c| 0 2 | * * 1 | 0 2
---+-----+-------+----
aab| 2 1 | 2 1 0 | 2 *
aac| 1 2 | 2 0 1 | * 2

  A| 2 * | 1 0 1 1 | 1 2
  B| * 2 | 1 1 1 0 | 2 1
---+-----+---------+----
  a| 1 1 | 2 * * * | 1 1
  b| 1 1 | * 2 * * | 1 1
  c| 0 2 | * * 1 * | 2 0
  d| 2 0 | * * * 1 | 0 2
---+-----+---------+----
abc| 1 2 | 1 1 1 0 | 2 *
bcd| 2 1 | 1 1 0 1 | * 2

Triangular pyramid
(v:3+1; e:3+3; f:3+1)

Mirrored spheroid
(v:2+1+1; e:2+2+1+1; f:2+1+1)

No symmetry
(v:1+1+1+1; e:1+1+1+1+1+1; f:1+1+1+1)

  A| 3 * | 2 1 | 2 1
  B| * 1 | 0 3 | 3 0
---+-----+-----+----
  a| 2 0 | 3 * | 1 1
  b| 1 1 | * 3 | 2 0
---+-----+-----+----
abb| 2 1 | 1 2 | 3 *
aaa| 3 0 | 3 0 | * 1

  A| 1 * * | 2 0 1 0 | 2 1 0 
  B| * 1 * | 0 2 1 0 | 2 0 1 
  C| * * 2 | 1 1 0 1 | 1 1 1 
---+-------+---------+------
  a| 1 0 1 | 2 * * * | 1 1 0 
  b| 0 1 1 | * 2 * * | 1 0 1 
  c| 1 1 0 | * * 1 * | 2 0 0 
  d| 0 0 2 | * * * 1 | 0 1 1 
---+-------+---------+------
ABC| 1 1 1 | 1 1 1 0 | 2 * *
ACC| 1 0 2 | 2 0 0 1 | * 1 *
BCC| 0 1 2 | 0 2 0 1 | * * 1

  A | 1 0 0 0 | 1 1 1 0 0 0 | 1 1 1 0
  B | 0 1 0 0 | 1 0 0 1 1 0 | 1 1 0 1
  C | 0 0 1 0 | 0 1 0 1 0 1 | 1 0 1 1
  D | 0 0 0 1 | 0 0 1 0 1 1 | 0 1 1 1
----+---------+-------------+--------
  a | 1 1 0 0 | 1 0 0 0 0 0 | 1 1 0 0
  b | 1 0 1 0 | 0 1 0 0 0 0 | 1 0 1 0
  c | 1 0 0 1 | 0 0 1 0 0 0 | 0 1 1 0
  d | 0 1 1 0 | 0 0 0 1 0 0 | 1 0 0 1
  e | 0 1 0 1 | 0 0 0 0 1 0 | 0 1 0 1
  f | 0 0 1 1 | 0 0 0 0 0 1 | 0 0 1 1
----+---------+-------------+--------
ABC | 1 1 1 0 | 1 1 0 1 0 0 | 1 0 0 0
ABD | 1 1 0 1 | 1 0 1 0 1 0 | 0 1 0 0
ACD | 1 0 1 1 | 0 1 1 0 0 1 | 0 0 1 0
BCD | 0 1 1 1 | 0 0 0 1 1 1 | 0 0 0 1

Uniform polyhedra edit

Semiregular polyhedra in tetrahedral family

Tetratetrahedron ^[10]

(v:6; e:12; f:4+4)

Truncated tetrahedron ^[11]

(v:12; e:6+12; f:4+4)

o3x3o
. . . | 6 |  4 | 2 2
------+---+----+----
. x . | 2 | 12 | 1 1
------+---+----+----
o3x . | 3 |  3 | 4 *
. x3o | 3 |  3 | * 4

x3x3o
. . . | 12 | 1  2 | 2 1
------+----+------+----
x . . |  2 | 6  * | 2 0
. x . |  2 | * 12 | 1 1
------+----+------+----
x3x . |  6 | 3  3 | 4 *
. x3o |  3 | 0  3 | * 4

o3x3x
. . . | 12 |  2 1 | 1 2
------+----+------+----
. x . |  2 | 12 * | 1 1
. . x |  2 |  * 6 | 0 2
------+----+------+----
o3x . |  3 |  3 0 | 4 *
. x3x |  6 |  3 3 | * 4

Rhombitetratetrahedron ^[12]

(v:12; e:12+12; f:4+6+4)

Truncated tetratetrahedron ^[13]

(v:12; e:12+12; f:4+6+4)

Snub tetrahedron ^[14]

(v:12; e:6+12+12; f:4+4+12)

x3o3x
. . . | 12 |  2  2 | 1 2 1
------+----+-------+------
x . . |  2 | 12  * | 1 1 0
. . x |  2 |  * 12 | 0 1 1
------+----+-------+------
x3o . |  3 |  3  0 | 4 * *
x . x |  4 |  2  2 | * 6 *
. o3x |  3 |  0  3 | * * 4

x3x3x
. . . | 24 |  1  1  1 | 1 1 1
------+----+----------+------
x . . |  2 | 12  *  * | 1 1 0
. x . |  2 |  * 12  * | 1 0 1
. . x |  2 |  *  * 12 | 0 1 1
------+----+----------+------
x3x . |  6 |  3  3  0 | 4 * *
x . x |  4 |  2  0  2 | * 6 *
. x3x |  6 |  0  3  3 | * * 4

s3s3s
demi( . . . ) | 12 | 1  2  2 | 1 1  3
--------------+----+---------+-------
      s 2 s   |  2 | 6  *  * | 0 0  2
sefa( s3s . ) |  2 | * 12  * | 1 0  1
sefa( . s3s ) |  2 | *  * 12 | 0 1  1
--------------+----+---------+-------
      s3s .   ♦  3 | 0  3  0 | 4 *  *
      . s3s   ♦  3 | 0  0  3 | * 4  *
sefa( s3s3s ) |  3 | 1  1  1 | * * 12

Semiregular polyhedra in octahedral family

Cuboctahedron ^[15]

(v:12; e:24; f:8+6)

Truncated cube ^[16]

(v:24; e:12+24; f:8+6)

Truncated octahedron ^[17]

(v:24; e:24+12; f:8+6)

o3x4o
. . . | 12 |  4 | 2 2
------+----+----+----
. x . |  2 | 24 | 1 1
------+----+----+----
o3x . |  3 |  3 | 8 *
. x4o |  4 |  4 | * 6

x3x4o
. . . | 24 |  1  2 | 2 1
------+----+-------+----
x . . |  2 | 12  * | 2 0
. x . |  2 |  * 24 | 1 1
------+----+-------+----
x3x . |  6 |  3  3 | 8 *
. x4o |  4 |  0  4 | * 6

o3x4x
. . . | 24 |  2  1 | 1 2
------+----+-------+----
. x . |  2 | 24  * | 1 1
. . x |  2 |  * 12 | 0 2
------+----+-------+----
o3x . |  3 |  3  0 | 8 *
. x4x |  8 |  4  4 | * 6

Rhombicuboctahedron ^[18]

(v:24; e:24+24; f:8+12+6)

Truncated cuboctahedron ^[19]

(v:48; e:24+24+24; f:8+12+6)

Snub cube ^[20]

(v:24; e:12+24+24; f:8+6+24)

x3o4x
. . . | 24 |  2  2 | 1  2 1
------+----+-------+-------
x . . |  2 | 24  * | 1  1 0
. . x |  2 |  * 24 | 0  1 1
------+----+-------+-------
x3o . |  3 |  3  0 | 8  * *
x . x |  4 |  2  2 | * 12 *
. o4x |  4 |  0  4 | *  * 6

x3x4x
. . . | 48 |  1  1  1 | 1  1 1
------+----+----------+-------
x . . |  2 | 24  *  * | 1  1 0
. x . |  2 |  * 24  * | 1  0 1
. . x |  2 |  *  * 24 | 0  1 1
------+----+----------+-------
x3x . |  6 |  3  3  0 | 8  * *
x . x |  4 |  2  0  2 | * 12 *
. x4x |  8 |  0  4  4 | *  * 6

s3s4s
demi( . . . ) | 24 |  1  2  2 | 1 1  3
--------------+----+----------+-------
      s 2 s   ♦  2 | 12  *  * | 0 0  2
sefa( s3s . ) |  2 |  * 24  * | 1 0  1
sefa( . s4s ) |  2 |  *  * 24 | 0 1  1
--------------+----+----------+-------
      s3s .   ♦  3 |  0  3  0 | 8 *  *
      . s4s   ♦  4 |  0  0  4 | * 6  *
sefa( s3s4s ) |  3 |  1  1  1 | * * 24

Semiregular polyhedra in icosahedron family

Icosidodecahedron ^[21]

(v:30; e:60; f:20+12)

Truncated dodecahedron ^[22]

(v:60; e:30+60; f:20+12)

Truncated icosahedron ^[23]

(v:60; e:60+30; f:20+12)

o3x5o
. . . | 30 |  4 |  2  2
------+----+----+------
. x . |  2 | 60 |  1  1
------+----+----+------
o3x . |  3 |  3 | 20  *
. x5o |  5 |  5 |  * 12

x3x5o
. . . | 60 |  1  2 |  2  1
------+----+-------+------
x . . |  2 | 30  * |  2  0
. x . |  2 |  * 60 |  1  1
------+----+-------+------
x3x . |  6 |  3  3 | 20  *
. x5o |  5 |  0  5 |  * 12

o3x5x
. . . | 60 |  2  1 |  1  2
------+----+-------+------
. x . |  2 | 60  * |  1  1
. . x |  2 |  * 30 |  0  2
------+----+-------+------
o3x . |  3 |  3  0 | 20  *
. x5x | 10 |  5  5 |  * 12

Rhombicosidodecahedron ^[24]

(v:60; e:60+60; f:20+30+12)

Truncated icosidodecahedron ^[25]

(v:120; e:60+60+60; f:20+30+12)

Snub dodecahedron ^[26]

(v:60; e:30+60+60; f:20+12+60)

x3o5x
. . . | 60 |  2  2 |  1  2  1
------+----+-------+---------
x . . |  2 | 60  * |  1  1  0
. . x |  2 |  * 60 |  0  1  1
------+----+-------+---------
x3o . |  3 |  3  0 | 20  *  *
x . x |  4 |  2  2 |  * 30  *
. o5x |  5 |  0  5 |  *  * 12

x3x5x
. . . | 120 |  1  1  1 |  1  1  1
------+-----+----------+---------
x . . |   2 | 60  *  * |  1  1  0
. x . |   2 |  * 60  * |  1  0  1
. . x |   2 |  *  * 60 |  0  1  1
------+-----+----------+---------
x3x . |   6 |  3  3  0 | 20  *  *
x . x |   4 |  2  0  2 |  * 30  *
. x5x |  10 |  0  5  5 |  *  * 12

s3s5s
demi( . . . ) | 60 |  1  2  2 |  1  1  3
--------------+----+----------+---------
      s 2 s   ♦  2 | 30  *  * |  0  0  2
sefa( s3s . ) |  2 |  * 60  * |  1  0  1
sefa( . s5s ) |  2 |  *  * 60 |  0  1  1
--------------+----+----------+---------
      s3s .   ♦  3 |  0  3  0 | 20  *  *
      . s5s   ♦  5 |  0  0  5 |  * 12  *
sefa( s3s5s ) |  3 |  1  1  1 |  *  * 60

Higher polytopes edit

4D edit

Regular 4-polytopes edit

4D

{p,q,r}

5-cell {3,3,3} ^[27]

16-cell {3,3,4} ^[28]

600-cell {3,3,5} ^[29]

120-cell {5,3,3} ^[30]

	v	e	f	c
v	f0	4q/k2	2qr\k2	4r\k2
e	2	f1	r	r
f	p	p	f2	2
c	4p/k1	2pq/k1	4q/k1	f3

With k1=4-(p-2)(q-2)

With k2=4-(q-2)(r-2)

f0=order([p,q,r])/order([q,r])

f1=order([p,q,r])/order([])/order([r])

f2=order([p,q,r])/order([])/order([p])

f3=order([p,q,r])/order([p,q])

x3o3o3o
. . . . | 5 ♦  4 |  6 | 4
--------+---+----+----+--
x . . . | 2 | 10 |  3 | 3
--------+---+----+----+--
x3o . . | 3 |  3 | 10 | 2
--------+---+----+----+--
x3o3o . ♦ 4 |  6 |  4 | 5

x3o3o4o
. . . . | 8 ♦  6 | 12 |  8
--------+---+----+----+---
x . . . | 2 | 24 |  4 |  4
--------+---+----+----+---
x3o . . | 3 |  3 | 32 |  2
--------+---+----+----+---
x3o3o . ♦ 4 |  6 |  4 | 16

x3o3o5o
. . . . | 120 ♦  12 |   30 |  20
--------+-----+-----+------+----
x . . . |   2 | 720 |    5 |   5
--------+-----+-----+------+----
x3o . . |   3 |   3 | 1200 |   2
--------+-----+-----+------+----
x3o3o . ♦   4 |   6 |    4 | 600

o3o3o5x
. . . . | 600 ♦    4 |   6 |   4
--------+-----+------+-----+----
. . . x |   2 | 1200 |   3 |   3
--------+-----+------+-----+----
. . o5x |   5 |    5 | 720 |   2
--------+-----+------+-----+----
. o3o5x ♦  20 |   30 |  12 | 120

24-cell {3,4,3} ^[31]

tesseract {4,3,3} ^[32]

grand 600-cell {3,3,5/2} ^[33]

great grand stellated 120-cell {5/2,3,3} ^[34]

x3o4o3o
. . . . | 24 ♦  8 | 12 |  6
--------+----+----+----+---
x . . . |  2 | 96 |  3 |  3
--------+----+----+----+---
x3o . . |  3 |  3 | 96 |  2
--------+----+----+----+---
x3o4o . ♦  6 | 12 |  8 | 24

o3o3o4x
. . . . | 16 ♦  4 |  6 | 4
--------+----+----+----+--
. . . x |  2 | 32 |  3 | 3
--------+----+----+----+--
. . o4x |  4 |  4 | 24 | 2
--------+----+----+----+--
. o3o4x ♦  8 | 12 |  6 | 8

x3o3o5/2o
. . .   . | 120 ♦  12 |   30 |  20
----------+-----+-----+------+----
x . .   . |   2 | 720 |    5 |   5
----------+-----+-----+------+----
x3o .   . |   3 |   3 | 1200 |   2
----------+-----+-----+------+----
x3o3o   . ♦   4 |   6 |    4 | 600

o3o3o5/2x
. . .   . | 600 ♦    4 |   6 |   4
----------+-----+------+-----+----
. . .   x |   2 | 1200 |   3 |   3
----------+-----+------+-----+----
. . o5/2x |   5 |    5 | 720 |   2
----------+-----+------+-----+----
. o3o5/2x ♦  20 |   30 |  12 | 120

great stellated 120-cell {5/2,3,5} ^[35]

icosahedral 120-cell {3,5,5/2} ^[36]

small stellated 120-cell {5/2,5,3} ^[37]

great 120-cell {5,5/2,5} ^[38]

o5o3o5/2x
. . .   . | 120 ♦  12 |  30 |  20
----------+-----+-----+-----+----
. . .   x |   2 | 720 |   5 |   5
----------+-----+-----+-----+----
. . o5/2x |   5 |   5 | 720 |   2
----------+-----+-----+-----+----
. o3o5/2x ♦  20 |  30 |  12 | 120

x3o5o5/2o
. . .   . | 120 ♦  12 |   30 |  12
----------+-----+-----+------+----
x . .   . |   2 | 720 |    5 |   5
----------+-----+-----+------+----
x3o .   . |   3 |   3 | 1200 |   2
----------+-----+-----+------+----
x3o5o   . ♦  12 |  30 |   20 | 120

x5/2o5o3o
.   . . . | 120 ♦   20 |  30 |  12
----------+-----+------+-----+----
x   . . . |   2 | 1200 |   3 |   3
----------+-----+------+-----+----
x5/2o . . |   5 |    5 | 720 |   2
----------+-----+------+-----+----
x5/2o5o . ♦  12 |   30 |  12 | 120

x5o5/2o5o
. .   . . | 120 ♦  12 |  30 |  12
----------+-----+-----+-----+----
x .   . . |   2 | 720 |   5 |   5
----------+-----+-----+-----+----
x5o   . . |   5 |   5 | 720 |   2
----------+-----+-----+-----+----
x5o5/2o . ♦  12 |  30 |  12 | 120

grand 120-cell {5,3,5/2} ^[39]

great icosahedral 120-cell {3,5/2,5} ^[40]

great grand 120-cell {5,5/2,3} ^[41]

grand stellated 120-cell {5/2,5,5/2} ^[42]

x5o3o5/2o
. . .   . | 120 ♦  12 |  30 |  20
----------+-----+-----+-----+----
x . .   . |   2 | 720 |   5 |   5
----------+-----+-----+-----+----
x5o .   . |   5 |   5 | 720 |   2
----------+-----+-----+-----+----
x5o3o   . ♦  20 |  30 |  12 | 120

x3o5/2o5o
. .   . . | 120 ♦  12 |   30 |  12
----------+-----+-----+------+----
x .   . . |   2 | 720 |    5 |   5
----------+-----+-----+------+----
x3o   . . |   3 |   3 | 1200 |   2
----------+-----+-----+------+----
x3o5/2o . ♦  12 |  30 |   20 | 120

x5o5/2o3o
. .   . . | 120 ♦   20 |  30 |  12
----------+-----+------+-----+----
x .   . . |   2 | 1200 |   3 |   3
----------+-----+------+-----+----
x5o   . . |   5 |    5 | 720 |   2
----------+-----+------+-----+----
x5o5/2o . ♦  12 |   30 |  12 | 120

x5/2o5o5/2o
.   . . . | 120 ♦  12 |  30 |  12
----------+-----+-----+-----+----
x   . . . |   2 | 720 |   5 |   5
----------+-----+-----+-----+----
x5/2o . . |   5 |   5 | 720 |   2
----------+-----+-----+-----+----
x5/2o5o . ♦  12 |  30 |  12 | 120

5-cells edit

5-cells

5-cell {3,3,3} ^[43]

Tetrahedral pyramid {3,3}∨( )

{3}∨{ }

x3o3o3o
. . . . | 5 ♦  4 |  6 | 4
--------+---+----+----+--
x . . . | 2 | 10 |  3 | 3
--------+---+----+----+--
x3o . . | 3 |  3 | 10 | 2
--------+---+----+----+--
x3o3o . ♦ 4 |  6 |  4 | 5

(pt || tet)

o.3o.3o.    | 1 * ♦ 4 0 | 6 0 | 4 0
.o3.o3.o    | * 4 ♦ 1 3 | 3 3 | 3 1
------------+-----+-----+-----+----
oo3oo3oo&#x | 1 1 | 4 * | 3 0 | 3 0
.x .. ..    | 0 2 | * 6 | 1 2 | 2 1
------------+-----+-----+-----+----
ox .. ..&#x | 1 2 | 2 1 | 6 * | 2 0
.x3.o ..    | 0 3 | 0 3 | * 4 | 1 1
------------+-----+-----+-----+----
ox3oo ..&#x ♦ 1 3 | 3 3 | 3 1 | 4 *
.x3.o3.o    ♦ 0 4 | 0 6 | 0 4 | * 1

(line || perp {3})
o. o.3o.    | 2 * ♦ 1 3 0 | 3 3 0 | 3 1
.o .o3.o    | * 3 ♦ 0 2 2 | 1 4 1 | 2 2
------------+-----+-------+-------+----
x. .. ..    | 2 0 | 1 * * | 3 0 0 | 3 0
oo oo3oo&#x | 1 1 | * 6 * | 1 2 0 | 2 1
.. .x ..    | 0 2 | * * 3 | 0 2 1 | 1 2
------------+-----+-------+-------+----
xo .. ..&#x | 2 1 | 1 2 0 | 3 * * | 2 0
.. ox ..&#x | 1 2 | 0 2 1 | * 6 * | 1 1
.. .x3.o    | 0 3 | 0 0 3 | * * 1 | 0 2
------------+-----+-------+-------+----
xo ox ..&#x ♦ 2 2 | 1 4 1 | 2 2 0 | 3 *
.. ox3oo&#x ♦ 1 3 | 0 3 3 | 0 3 1 | * 2

{3}∨( )∨( )

Digonal disphenoid pyramid, { }∨{ }∨( )

( (pt || {3}) || pt)

o..3o..    | 1 * * ♦ 3 1 0 0 | 3 3 0 0 | 1 3 0
.o.3.o.    | * 3 * ♦ 1 0 2 1 | 2 1 1 2 | 1 2 1
..o3..o    | * * 1 ♦ 0 1 0 3 | 0 3 0 3 | 0 3 1
-----------+-------+---------+---------+------
oo.3oo.&#x | 1 1 0 | 3 * * * | 2 1 0 0 | 1 2 0
o.o3o.o&#x | 1 0 1 | * 1 * * | 0 3 0 0 | 0 3 0
.x. ...    | 0 2 0 | * * 3 * | 1 0 1 1 | 1 1 1
.oo3.oo&#x | 0 1 1 | * * * 3 | 0 1 0 2 | 0 2 1
-----------+-------+---------+---------+------
ox. ...&#x | 1 2 0 | 2 0 1 0 | 3 * * * | 1 1 0
ooo ...&#x | 1 1 1 | 1 1 0 1 | * 3 * * | 0 2 0
.x.3.o.    | 0 3 0 | 0 0 3 0 | * * 1 * | 1 0 1
.xo ...&#x | 0 2 1 | 0 0 1 2 | * * * 3 | 0 1 1
-----------+-------+---------+---------+------
ox.3oo.&#x ♦ 1 3 0 | 3 0 3 0 | 3 0 1 0 | 1 * *
oxo ...&#x ♦ 1 2 1 | 2 1 1 2 | 1 2 0 1 | * 3 *
.xo3.oo&#x ♦ 0 3 1 | 0 0 3 3 | 0 0 1 3 | * * 1

( (pt || line) || perp line)

o.. o..    | 1 * * ♦ 2 2 0 0 0 | 1 4 1 0 0 | 2 2 0
.o. .o.    | * 2 * ♦ 1 0 1 2 0 | 1 2 0 2 1 | 2 1 1
..o ..o    | * * 2 ♦ 0 1 0 2 1 | 0 2 1 1 2 | 1 2 1
-----------+-------+-----------+-----------+------
oo. oo.&#x | 1 1 0 | 2 * * * * | 1 2 0 0 0 | 2 1 0
o.o o.o&#x | 1 0 1 | * 2 * * * | 0 2 1 0 0 | 1 2 0
.x. ...    | 0 2 0 | * * 1 * * | 1 0 0 2 0 | 2 0 1
.oo .oo&#x | 0 1 1 | * * * 4 * | 0 1 0 1 1 | 1 1 1
... ..x    | 0 0 2 | * * * * 1 | 0 0 1 0 2 | 0 2 1
-----------+-------+-----------+-----------+------
ox. ...&#x | 1 2 0 | 2 0 1 0 0 | 1 * * * * | 2 0 0
ooo ooo&#x | 1 1 1 | 1 1 0 1 0 | * 4 * * * | 1 1 0
... o.x&#x | 1 0 2 | 0 2 0 0 1 | * * 1 * * | 0 2 0
.xo ...&#x | 0 2 1 | 0 0 1 2 0 | * * * 2 * | 1 0 1
... .ox&#x | 0 1 2 | 0 0 0 2 1 | * * * * 2 | 0 1 1
-----------+-------+-----------+-----------+------
oxo ...&#x ♦ 1 2 1 | 2 1 1 2 0 | 1 2 0 1 0 | 2 * *
... oox&#x ♦ 1 1 2 | 1 2 0 2 1 | 0 2 1 0 1 | * 2 *
.xo .ox&#x ♦ 0 2 2 | 0 0 1 4 1 | 0 0 0 2 2 | * * 1

Uniform 4D edit

A4 family

o3x3o3o - rap
. . . . | 10 ♦  6 |  3  6 | 3 2
--------+----+----+-------+----
. x . . |  2 | 30 |  1  2 | 2 1
--------+----+----+-------+----
o3x . . |  3 |  3 | 10  * | 2 0
. x3o . |  3 |  3 |  * 20 | 1 1
--------+----+----+-------+----
o3x3o . ♦  6 | 12 |  4  4 | 5 *
. x3o3o ♦  4 |  6 |  0  4 | * 5

x3x3o3o - tip
. . . . | 20 |  1  3 |  3  3 | 3 1
--------+----+-------+-------+----
x . . . |  2 | 10  * |  3  0 | 3 0
. x . . |  2 |  * 30 |  1  2 | 2 1
--------+----+-------+-------+----
x3x . . |  6 |  3  3 | 10  * | 2 0
. x3o . |  3 |  0  3 |  * 20 | 1 1
--------+----+-------+-------+----
x3x3o . ♦ 12 |  6 12 |  4  4 | 5 *
. x3o3o ♦  4 |  0  6 |  0  4 | * 5

x3o3x3o - srip
. . . . | 30 ♦  2  4 |  1  4  2  2 | 2  2 1
--------+----+-------+-------------+-------
x . . . |  2 | 30  * |  1  2  0  0 | 2  1 0
. . x . |  2 |  * 60 |  0  1  1  1 | 1  1 1
--------+----+-------+-------------+-------
x3o . . |  3 |  3  0 | 10  *  *  * | 2  0 0
x . x . |  4 |  2  2 |  * 30  *  * | 1  1 0
. o3x . |  3 |  0  3 |  *  * 20  * | 1  0 1
. . x3o |  3 |  0  3 |  *  *  * 20 | 0  1 1
--------+----+-------+-------------+-------
x3o3x . ♦ 12 | 12 12 |  4  6  4  0 | 5  * *
x . x3o ♦  6 |  3  6 |  0  3  0  2 | * 10 *
. o3x3o ♦  6 |  0 12 |  0  0  4  4 | *  * 5

x3o3o3x - spid
. . . . | 20 ♦  3  3 |  3  6  3 | 1  3  3 1
--------+----+-------+----------+----------
x . . . |  2 | 30  * |  2  2  0 | 1  2  1 0
. . . x |  2 |  * 30 |  0  2  2 | 0  1  2 1
--------+----+-------+----------+----------
x3o . . |  3 |  3  0 | 20  *  * | 1  1  0 0
x . . x |  4 |  2  2 |  * 30  * | 0  1  1 0
. . o3x |  3 |  0  3 |  *  * 20 | 0  0  1 1
--------+----+-------+----------+----------
x3o3o . ♦  4 |  6  0 |  4  0  0 | 5  *  * *
x3o . x ♦  6 |  6  3 |  2  3  0 | * 10  * *
x . o3x ♦  6 |  3  6 |  0  3  2 | *  * 10 *
. o3o3x ♦  4 |  0  6 |  0  0  4 | *  *  * 5

o3x3x3o - deca
. . . . | 30 |  2  2 |  1  4  1 | 2 2
--------+----+-------+----------+----
. x . . |  2 | 30  * |  1  2  0 | 2 1
. . x . |  2 |  * 30 |  0  2  1 | 1 2
--------+----+-------+----------+----
o3x . . |  3 |  3  0 | 10  *  * | 2 0
. x3x . |  6 |  3  3 |  * 20  * | 1 1
. . x3o |  3 |  0  3 |  *  * 10 | 0 2
--------+----+-------+----------+----
o3x3x . ♦ 12 | 12  6 |  4  4  0 | 5 *
. x3x3o ♦ 12 |  6 12 |  0  4  4 | * 5

x3x3x3o - grip
. . . . | 60 |  1  1  2 |  1  2  2  1 | 2  1 1
--------+----+----------+-------------+-------
x . . . |  2 | 30  *  * |  1  2  0  0 | 2  1 0
. x . . |  2 |  * 30  * |  1  0  2  0 | 2  0 1
. . x . |  2 |  *  * 60 |  0  1  1  1 | 1  1 1
--------+----+----------+-------------+-------
x3x . . |  6 |  3  3  0 | 10  *  *  * | 2  0 0
x . x . |  4 |  2  0  2 |  * 30  *  * | 1  1 0
. x3x . |  6 |  0  3  3 |  *  * 20  * | 1  0 1
. . x3o |  3 |  0  0  3 |  *  *  * 20 | 0  1 1
--------+----+----------+-------------+-------
x3x3x . ♦ 24 | 12 12 12 |  4  6  4  0 | 5  * *
x . x3o ♦  6 |  3  0  6 |  0  3  0  2 | * 10 *
. x3x3o ♦ 12 |  0  6 12 |  0  0  4  4 | *  * 5

x3x3o3x - prip
. . . . | 60 |  1  2  2 |  2  2  1  2  1 | 1  2  1 1
--------+----+----------+----------------+----------
x . . . |  2 | 30  *  * |  2  2  0  0  0 | 1  2  1 0
. x . . |  2 |  * 60  * |  1  0  1  1  0 | 1  1  0 1
. . . x |  2 |  *  * 60 |  0  1  0  1  1 | 0  1  1 1
--------+----+----------+----------------+----------
x3x . . |  6 |  3  3  0 | 20  *  *  *  * | 1  1  0 0
x . . x |  4 |  2  0  2 |  * 30  *  *  * | 0  1  1 0
. x3o . |  3 |  0  3  0 |  *  * 20  *  * | 1  0  0 1
. x . x |  4 |  0  2  2 |  *  *  * 30  * | 0  1  0 1
. . o3x |  3 |  0  0  3 |  *  *  *  * 20 | 0  0  1 1
--------+----+----------+----------------+----------
x3x3o . ♦ 12 |  6 12  0 |  4  0  4  0  0 | 5  *  * *
x3x . x ♦ 12 |  6  6  6 |  2  3  0  3  0 | * 10  * *
x . o3x ♦  6 |  3  0  6 |  0  3  0  0  2 | *  * 10 *
. x3o3x ♦ 12 |  0 12 12 |  0  0  4  6  4 | *  *  * 5

x3x3x3x - gippid
. . . . | 120 |  1  1  1  1 |  1  1  1  1  1  1 | 1  1  1 1
--------+-----+-------------+-------------------+----------
x . . . |   2 | 60  *  *  * |  1  1  1  0  0  0 | 1  1  1 0
. x . . |   2 |  * 60  *  * |  1  0  0  1  1  0 | 1  1  0 1
. . x . |   2 |  *  * 60  * |  0  1  0  1  0  1 | 1  0  1 1
. . . x |   2 |  *  *  * 60 |  0  0  1  0  1  1 | 0  1  1 1
--------+-----+-------------+-------------------+----------
x3x . . |   6 |  3  3  0  0 | 20  *  *  *  *  * | 1  1  0 0
x . x . |   4 |  2  0  2  0 |  * 30  *  *  *  * | 1  0  1 0
x . . x |   4 |  2  0  0  2 |  *  * 30  *  *  * | 0  1  1 0
. x3x . |   6 |  0  3  3  0 |  *  *  * 20  *  * | 1  0  0 1
. x . x |   4 |  0  2  0  2 |  *  *  *  * 30  * | 0  1  0 1
. . x3x |   6 |  0  0  3  3 |  *  *  *  *  * 20 | 0  0  1 1
--------+-----+-------------+-------------------+----------
x3x3x . ♦  24 | 12 12 12  0 |  4  6  0  4  0  0 | 5  *  * *
x3x . x ♦  12 |  6  6  0  6 |  2  0  3  0  3  0 | * 10  * *
x . x3x ♦  12 |  6  0  6  6 |  0  3  3  0  0  2 | *  * 10 *
. x3x3x ♦  24 |  0 12 12 12 |  0  0  0  4  6  4 | *  *  * 5

D4 family

4-demicube {3,3^1,1} ^[44]

24-cell {3^1,1,1} ^[45]

x3o3o *b3o - hex
. . .    . | 8 ♦  6 | 12 | 4 4
-----------+---+----+----+----
x . .    . | 2 | 24 |  4 | 2 2
-----------+---+----+----+----
x3o .    . | 3 |  3 | 32 | 1 1
-----------+---+----+----+----
x3o3o    . ♦ 4 |  6 |  4 | 8 *
x3o . *b3o ♦ 4 |  6 |  4 | * 8

o3x3o *b3o - ico
. . .    . | 24 ♦  8 |  4  4  4 | 2 2 2
-----------+----+----+----------+------
. x .    . |  2 | 96 |  1  1  1 | 1 1 1
-----------+----+----+----------+------
o3x .    . |  3 |  3 | 32  *  * | 1 1 0
. x3o    . |  3 |  3 |  * 32  * | 1 0 1
. x . *b3o |  3 |  3 |  *  * 32 | 0 1 1
-----------+----+----+----------+------
o3x3o    . ♦  6 | 12 |  4  4  0 | 8 * *
o3x . *b3o ♦  6 | 12 |  4  0  4 | * 8 *
. x3o *b3o ♦  6 | 12 |  0  4  4 | * * 8

B4 family
o3x3o4o - ico . . . . \| 24 ♦ 8 \| 4 8 \| 4 2 --------+----+----+-------+----- . x . . \| 2 \| 96 \| 1 2 \| 2 1 --------+----+----+-------+----- o3x . . \| 3 \| 3 \| 32 * \| 2 0 . x3o . \| 3 \| 3 \| * 64 \| 1 1 --------+----+----+-------+----- o3x3o . ♦ 6 \| 12 \| 4 4 \| 16 * . x3o4o ♦ 6 \| 12 \| 0 8 \| * 8 \|	o3o3x4o - rit . . . . \| 32 ♦ 6 \| 6 3 \| 2 3 --------+----+----+-------+----- . . x . \| 2 \| 96 \| 1 2 \| 1 2 --------+----+----+-------+----- . o3x . \| 3 \| 3 \| 64 * \| 1 1 . . x4o \| 4 \| 4 \| * 24 \| 0 2 --------+----+----+-------+----- o3o3x . ♦ 4 \| 6 \| 4 0 \| 16 * . o3x4o ♦ 12 \| 24 \| 8 6 \| * 8	x3x3o4o - thex . . . . \| 48 \| 1 4 \| 4 4 \| 4 1 --------+----+-------+-------+----- x . . . \| 2 \| 24 * \| 4 0 \| 4 0 . x . . \| 2 \| * 96 \| 1 2 \| 2 1 --------+----+-------+-------+----- x3x . . \| 6 \| 3 3 \| 32 * \| 2 0 . x3o . \| 3 \| 0 3 \| * 64 \| 1 1 --------+----+-------+-------+----- x3x3o . ♦ 12 \| 6 12 \| 4 4 \| 16 * . x3o4o ♦ 6 \| 0 12 \| 0 8 \| * 8	x3o3x4o - rico . . . . \| 96 ♦ 2 4 \| 1 4 2 2 \| 2 2 1 --------+----+--------+-------------+-------- x . . . \| 2 \| 96 * \| 1 2 0 0 \| 2 1 0 . . x . \| 2 \| * 192 \| 0 1 1 1 \| 1 1 1 --------+----+--------+-------------+-------- x3o . . \| 3 \| 3 0 \| 32 * * * \| 2 0 0 x . x . \| 4 \| 2 2 \| * 96 * * \| 1 1 0 . o3x . \| 3 \| 0 3 \| * * 64 * \| 1 0 1 . . x4o \| 4 \| 0 4 \| * * * 48 \| 0 1 1 --------+----+--------+-------------+-------- x3o3x . ♦ 12 \| 12 12 \| 4 6 4 0 \| 16 * * x . x4o ♦ 8 \| 4 8 \| 0 4 0 2 \| * 24 * . o3x4o ♦ 12 \| 0 24 \| 0 0 8 6 \| * * 8
x3o3o4x - sidpith . . . . \| 64 \| 3 3 \| 3 6 3 \| 1 3 3 1 --------+----+-------+----------+----------- x . . . \| 2 \| 96 * \| 2 2 0 \| 1 2 1 0 . . . x \| 2 \| * 96 \| 0 2 2 \| 0 1 2 1 --------+----+-------+----------+----------- x3o . . \| 3 \| 3 0 \| 64 * * \| 1 1 0 0 x . . x \| 4 \| 2 2 \| * 96 * \| 0 1 1 0 . . o4x \| 4 \| 0 4 \| * * 48 \| 0 0 1 1 --------+----+-------+----------+----------- x3o3o . ♦ 4 \| 6 0 \| 4 0 0 \| 16 * * * x3o . x ♦ 6 \| 6 3 \| 2 3 0 \| * 32 * * x . o4x ♦ 8 \| 4 8 \| 0 4 2 \| * * 24 * . o3o4x ♦ 8 \| 0 12 \| 0 0 6 \| * * * 8	o3x3x4o - tah . . . . \| 96 \| 2 2 \| 1 4 1 \| 2 2 --------+----+-------+----------+----- . x . . \| 2 \| 96 * \| 1 2 0 \| 2 1 . . x . \| 2 \| * 96 \| 0 2 1 \| 1 2 --------+----+-------+----------+----- o3x . . \| 3 \| 3 0 \| 32 * * \| 2 0 . x3x . \| 6 \| 3 3 \| * 64 * \| 1 1 . . x4o \| 4 \| 0 4 \| * * 24 \| 0 2 --------+----+-------+----------+----- o3x3x . ♦ 12 \| 12 6 \| 4 4 0 \| 16 * . x3x4o ♦ 24 \| 12 24 \| 0 8 6 \| * 8	o3x3o4x - srit . . . . \| 96 \| 4 2 \| 2 2 4 1 \| 1 2 2 (A),(B) --------+----+--------+-------------+-------- . x . . \| 2 \| 192 * \| 1 1 1 0 \| 1 1 1 (1),(/),(\) . . . x \| 2 \| * 96 \| 0 0 2 1 \| 0 1 2 (2),(3) --------+----+--------+-------------+-------- o3x . . \| 3 \| 3 0 \| 64 * * * \| 1 1 0 . x3o . \| 3 \| 3 0 \| * 64 * * \| 1 0 1 . x . x \| 4 \| 2 2 \| * * 96 * \| 0 1 1 . . o4x \| 4 \| 0 4 \| * * * 24 \| 0 0 2 --------+----+--------+-------------+-------- o3x3o . ♦ 6 \| 12 0 \| 4 4 0 0 \| 16 * * o3x . x ♦ 6 \| 6 3 \| 2 0 3 0 \| * 32 * . x3o4x ♦ 24 \| 24 24 \| 0 8 12 6 \| * * 8	o3o3x4x - tat . . . . \| 64 \| 3 1 \| 3 3 \| 1 3 --------+----+-------+-------+----- . . x . \| 2 \| 96 * \| 2 1 \| 1 2 . . . x \| 2 \| * 32 \| 0 3 \| 0 3 --------+----+-------+-------+----- . o3x . \| 3 \| 3 0 \| 64 * \| 1 1 . . x4x \| 8 \| 4 4 \| * 24 \| 0 2 --------+----+-------+-------+----- o3o3x . ♦ 4 \| 6 0 \| 4 0 \| 16 * . o3x4x ♦ 24 \| 24 12 \| 8 6 \| * 8
x3x3x4o - tico . . . . \| 192 \| 1 1 2 \| 1 2 2 1 \| 2 1 1 --------+-----+-----------+-------------+-------- x . . . \| 2 \| 96 * * \| 1 2 0 0 \| 2 1 0 . x . . \| 2 \| * 96 * \| 1 0 2 0 \| 2 0 1 . . x . \| 2 \| * * 192 \| 0 1 1 1 \| 1 1 1 --------+-----+-----------+-------------+-------- x3x . . \| 6 \| 3 3 0 \| 32 * * * \| 2 0 0 x . x . \| 4 \| 2 0 2 \| * 96 * * \| 1 1 0 . x3x . \| 6 \| 0 3 3 \| * * 64 * \| 1 0 1 . . x4o \| 4 \| 0 0 4 \| * * * 48 \| 0 1 1 --------+-----+-----------+-------------+-------- x3x3x . ♦ 24 \| 12 12 12 \| 4 6 4 0 \| 16 * * x . x4o ♦ 8 \| 4 0 8 \| 0 4 0 2 \| * 24 * . x3x4o ♦ 24 \| 0 12 24 \| 0 0 8 6 \| * * 8	x3x3o4x - prit . . . . \| 192 \| 1 2 2 \| 2 2 1 2 1 \| 1 2 1 1 --------+-----+------------+----------------+----------- x . . . \| 2 \| 96 * * \| 2 2 0 0 0 \| 1 2 1 0 . x . . \| 2 \| * 192 * \| 1 0 1 1 0 \| 1 1 0 1 . . . x \| 2 \| * * 192 \| 0 1 0 1 1 \| 0 1 1 1 --------+-----+------------+----------------+----------- x3x . . \| 6 \| 3 3 0 \| 64 * * * * \| 1 1 0 0 x . . x \| 4 \| 2 0 2 \| * 96 * * * \| 0 1 1 0 . x3o . \| 3 \| 0 3 0 \| * * 64 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 2 \| * * * 96 * \| 0 1 0 1 . . o4x \| 4 \| 0 0 4 \| * * * * 48 \| 0 0 1 1 --------+-----+------------+----------------+----------- x3x3o . ♦ 12 \| 6 12 0 \| 4 0 4 0 0 \| 16 * * * x3x . x ♦ 12 \| 6 6 6 \| 2 3 0 3 0 \| * 32 * * x . o4x ♦ 8 \| 4 0 8 \| 0 4 0 0 2 \| * * 24 * . x3o4x ♦ 24 \| 0 24 24 \| 0 0 8 12 6 \| * * * 8	x3o3x4x - proh . . . . \| 192 \| 2 2 1 \| 1 2 2 1 2 \| 1 1 2 1 --------+-----+------------+----------------+----------- x . . . \| 2 \| 192 * * \| 1 1 1 0 0 \| 1 1 1 0 . . x . \| 2 \| * 192 * \| 0 1 0 1 1 \| 1 0 1 1 . . . x \| 2 \| * * 96 \| 0 0 2 0 2 \| 0 1 2 1 --------+-----+------------+----------------+----------- x3o . . \| 3 \| 3 0 0 \| 64 * * * * \| 1 1 0 0 x . x . \| 4 \| 2 2 0 \| * 96 * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 2 \| * * 96 * * \| 0 1 1 0 . o3x . \| 3 \| 0 3 0 \| * * * 64 * \| 1 0 0 1 . . x4x \| 8 \| 0 4 4 \| * * * * 48 \| 0 0 1 1 --------+-----+------------+----------------+----------- x3o3x . ♦ 12 \| 12 12 0 \| 4 6 0 4 0 \| 16 * * * x3o . x ♦ 6 \| 6 0 3 \| 2 0 3 0 0 \| * 32 * * x . x4x ♦ 16 \| 8 8 8 \| 0 4 4 0 2 \| * * 24 * . o3x4x ♦ 24 \| 0 24 12 \| 0 0 0 8 6 \| * * * 8	o3x3x4x - grit . . . . \| 192 \| 2 1 1 \| 1 2 2 1 \| 1 1 2 --------+-----+-----------+-------------+-------- . x . . \| 2 \| 192 * * \| 1 1 1 0 \| 1 1 1 . . x . \| 2 \| * 96 * \| 0 2 0 1 \| 1 0 2 . . . x \| 2 \| * * 96 \| 0 0 2 1 \| 0 1 2 --------+-----+-----------+-------------+-------- o3x . . \| 3 \| 3 0 0 \| 64 * * * \| 1 1 0 . x3x . \| 6 \| 3 3 0 \| * 64 * * \| 1 0 1 . x . x \| 4 \| 2 0 2 \| * * 96 * \| 0 1 1 . . x4x \| 8 \| 0 4 4 \| * * * 24 \| 0 0 2 --------+-----+-----------+-------------+-------- o3x3x . ♦ 12 \| 12 6 0 \| 4 4 0 0 \| 16 * * o3x . x ♦ 6 \| 6 0 3 \| 2 0 3 0 \| * 32 * . x3x4x ♦ 48 \| 24 24 24 \| 0 8 12 6 \| * * 8
x3x3x4x - gidpith . . . . \| 384 \| 1 1 1 1 \| 1 1 1 1 1 1 \| 1 1 1 1 --------+-----+-----------------+-------------------+----------- x . . . \| 2 \| 192 * * * \| 1 1 1 0 0 0 \| 1 1 1 0 . x . . \| 2 \| * 192 * * \| 1 0 0 1 1 0 \| 1 1 0 1 . . x . \| 2 \| * * 192 * \| 0 1 0 1 0 1 \| 1 0 1 1 . . . x \| 2 \| * * * 192 \| 0 0 1 0 1 1 \| 0 1 1 1 --------+-----+-----------------+-------------------+----------- x3x . . \| 6 \| 3 3 0 0 \| 64 * * * * * \| 1 1 0 0 x . x . \| 4 \| 2 0 2 0 \| * 96 * * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 0 2 \| * * 96 * * * \| 0 1 1 0 . x3x . \| 6 \| 0 3 3 0 \| * * * 64 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 0 2 \| * * * * 96 * \| 0 1 0 1 . . x4x \| 8 \| 0 0 4 4 \| * * * * * 48 \| 0 0 1 1 --------+-----+-----------------+-------------------+----------- x3x3x . ♦ 24 \| 12 12 12 0 \| 4 6 0 4 0 0 \| 16 * * * x3x . x ♦ 12 \| 6 6 0 6 \| 2 0 3 0 3 0 \| * 32 * * x . x4x ♦ 16 \| 8 0 8 8 \| 0 4 4 0 0 2 \| * * 24 * . x3x4x ♦ 48 \| 0 24 24 24 \| 0 0 0 8 12 6 \| * * * 8

F4 family

o3x4o3o - rico
. . . . | 96 ♦   6 |  3   6 |  3  2
--------+----+-----+--------+------
. x . . |  2 | 288 |  1   2 |  2  1
--------+----+-----+--------+------
o3x . . |  3 |   3 | 96   * |  2  0
. x4o . |  4 |   4 |  * 144 |  1  1
--------+----+-----+--------+------
o3x4o . ♦ 12 |  24 |  8   6 | 24  *
. x4o3o ♦  8 |  12 |  0   6 |  * 24

x3x4o3o - tico
. . . . | 192 |  1   3 |  3   3 |  3  1
--------+-----+--------+--------+------
x . . . |   2 | 96   * |  3   0 |  3  0
. x . . |   2 |  * 288 |  1   2 |  2  1
--------+-----+--------+--------+------
x3x . . |   6 |  3   3 | 96   * |  2  0
. x4o . |   4 |  0   4 |  * 144 |  1  1
--------+-----+--------+--------+------
x3x4o . ♦  24 | 12  24 |  8   6 | 24  *
. x4o3o ♦   8 |  0  12 |  0   6 |  * 24

x3o4x3o - srico
. . . . | 288 |   2   4 |  1   4   2   2 |  2  2  1
--------+-----+---------+----------------+---------
x . . . |   2 | 288   * |  1   2   0   0 |  2  1  0
. . x . |   2 |   * 576 |  0   1   1   1 |  1  1  1
--------+-----+---------+----------------+---------
x3o . . |   3 |   3   0 | 96   *   *   * |  2  0  0
x . x . |   4 |   2   2 |  * 288   *   * |  1  1  0
. o4x . |   4 |   0   4 |  *   * 144   * |  1  0  1
. . x3o |   3 |   0   3 |  *   *   * 192 |  0  1  1
--------+-----+---------+----------------+---------
x3o4x . ♦  24 |  24  24 |  8  12   6   0 | 24  *  *
x . x3o ♦   6 |   3   6 |  0   3   0   2 |  * 96  *
. o4x3o ♦  12 |   0  24 |  0   0   6   8 |  *  * 24

x3o4o3x - spic
. . . . | 144 ♦   4   4 |   4   8   4 |  1  4  4  1
--------+-----+---------+-------------+------------
x . . . |   2 | 288   * |   2   2   0 |  1  2  1  0
. . . x |   2 |   * 288 |   0   2   2 |  0  1  2  1
--------+-----+---------+-------------+------------
x3o . . |   3 |   3   0 | 192   *   * |  1  1  0  0
x . . x |   4 |   2   2 |   * 288   * |  0  1  1  0
. . o3x |   3 |   0   3 |   *   * 192 |  0  0  1  1
--------+-----+---------+-------------+------------
x3o4o . ♦   6 |  12   0 |   8   0   0 | 24  *  *  *
x3o . x ♦   6 |   6   3 |   2   3   0 |  * 96  *  *
x . o3x ♦   6 |   3   6 |   0   3   2 |  *  * 96  *
. o4o3x ♦   6 |   0  12 |   0   0   8 |  *  *  * 24

o3x4x3o - cont
. . . . | 288 |   2   2 |  1   4  1 |  2  2
--------+-----+---------+-----------+------
. x . . |   2 | 288   * |  1   2  0 |  2  1
. . x . |   2 |   * 288 |  0   2  1 |  1  2
--------+-----+---------+-----------+------
o3x . . |   3 |   3   0 | 96   *  * |  2  0
. x4x . |   8 |   4   4 |  * 144  * |  1  1
. . x3o |   3 |   0   3 |  *   * 96 |  0  2
--------+-----+---------+-----------+------
o3x4x . ♦  24 |  24  12 |  8   6  0 | 24  *
. x4x3o ♦  24 |  12  24 |  0   6  8 |  * 24

x3x4x3o - grico
. . . . | 576 |   1   1   2 |  1   2   2   1 |  2  1  1
--------+-----+-------------+----------------+---------
x . . . |   2 | 288   *   * |  1   2   0   0 |  2  1  0
. x . . |   2 |   * 288   * |  1   0   2   0 |  2  0  1
. . x . |   2 |   *   * 576 |  0   1   1   1 |  1  1  1
--------+-----+-------------+----------------+---------
x3x . . |   6 |   3   3   0 | 96   *   *   * |  2  0  0
x . x . |   4 |   2   0   2 |  * 288   *   * |  1  1  0
. x4x . |   8 |   0   4   4 |  *   * 144   * |  1  0  1
. . x3o |   3 |   0   0   3 |  *   *   * 192 |  0  1  1
--------+-----+-------------+----------------+---------
x3x4x . ♦  48 |  24  24  24 |  8  12   6   0 | 24  *  *
x . x3o ♦   6 |   3   0   6 |  0   3   0   2 |  * 96  *
. x4x3o ♦  24 |   0  12  24 |  0   0   6   8 |  *  * 24

x3x4o3x - prico
. . . . | 576 |   1   2   2 |   2   2   1   2   1 |  1  2  1  1
--------+-----+-------------+---------------------+------------
x . . . |   2 | 288   *   * |   2   2   0   0   0 |  1  2  1  0
. x . . |   2 |   * 576   * |   1   0   1   1   0 |  1  1  0  1
. . . x |   2 |   *   * 576 |   0   1   0   1   1 |  0  1  1  1
--------+-----+-------------+---------------------+------------
x3x . . |   6 |   3   3   0 | 192   *   *   *   * |  1  1  0  0
x . . x |   4 |   2   0   2 |   * 288   *   *   * |  0  1  1  0
. x4o . |   4 |   0   4   0 |   *   * 144   *   * |  1  0  0  1
. x . x |   4 |   0   2   2 |   *   *   * 288   * |  0  1  0  1
. . o3x |   3 |   0   0   3 |   *   *   *   * 192 |  0  0  1  1
--------+-----+-------------+---------------------+------------
x3x4o . ♦  24 |  12  24   0 |   8   0   6   0   0 | 24  *  *  *
x3x . x ♦  12 |   6   6   6 |   2   3   0   3   0 |  * 96  *  *
x . o3x ♦   6 |   3   0   6 |   0   3   0   0   2 |  *  * 96  *
. x4o3x ♦  24 |   0  24  24 |   0   0   6  12   8 |  *  *  * 24

x3x4x3x - gippic
. . . . | 1152 |   1   1   1   1 |   1   1   1   1   1   1 |  1  1  1  1
--------+------+-----------------+-------------------------+------------
x . . . |    2 | 576   *   *   * |   1   1   1   0   0   0 |  1  1  1  0
. x . . |    2 |   * 576   *   * |   1   0   0   1   1   0 |  1  1  0  1
. . x . |    2 |   *   * 576   * |   0   1   0   1   0   1 |  1  0  1  1
. . . x |    2 |   *   *   * 576 |   0   0   1   0   1   1 |  0  1  1  1
--------+------+-----------------+-------------------------+------------
x3x . . |    6 |   3   3   0   0 | 192   *   *   *   *   * |  1  1  0  0
x . x . |    4 |   2   0   2   0 |   * 288   *   *   *   * |  1  0  1  0
x . . x |    4 |   2   0   0   2 |   *   * 288   *   *   * |  0  1  1  0
. x4x . |    8 |   0   4   4   0 |   *   *   * 144   *   * |  1  0  0  1
. x . x |    4 |   0   2   0   2 |   *   *   *   * 288   * |  0  1  0  1
. . x3x |    6 |   0   0   3   3 |   *   *   *   *   * 192 |  0  0  1  1
--------+------+-----------------+-------------------------+------------
x3x4x . ♦   48 |  24  24  24   0 |   8  12   0   6   0   0 | 24  *  *  *
x3x . x ♦   12 |   6   6   0   6 |   2   0   3   0   3   0 |  * 96  *  *
x . x3x ♦   12 |   6   0   6   6 |   0   3   3   0   0   2 |  *  * 96  *
. x4x3x ♦   48 |   0  24  24  24 |   0   0   0   6  12   8 |  *  *  * 24

s3s4o3o - sadi
demi( . . . . ) | 96 ♦   3   6 |  3   9  3 |  3  1  4
----------------+----+---------+-----------+---------
      . s4o .   |  2 | 144   * |  0   2  2 |  1  1  2
sefa( s3s . . ) |  2 |   * 288 |  1   2  0 |  2  0  1
----------------+----+---------+-----------+---------
      s3s . .   ♦  3 |   0   3 | 96   *  * |  2  0  0
sefa( s3s4o . ) |  3 |   1   2 |  * 288  * |  1  0  1
sefa( . s4o3o ) |  3 |   3   0 |  *   * 96 |  0  1  1
----------------+----+---------+-----------+---------
      s3s4o .   ♦ 12 |   6  24 |  8  12  0 | 24  *  *
      . s4o3o   ♦  4 |   6   0 |  0   0  4 |  * 24  *
sefa( s3s4o3o ) ♦  4 |   3   3 |  0   3  1 |  *  * 96

H4 family
o3x3o5o - rox . . . . \| 720 ♦ 10 \| 5 10 \| 5 2 --------+-----+------+-----------+-------- . x . . \| 2 \| 3600 \| 1 2 \| 2 1 --------+-----+------+-----------+-------- o3x . . \| 3 \| 3 \| 1200 * \| 2 0 . x3o . \| 3 \| 3 \| * 2400 \| 1 1 --------+-----+------+-----------+-------- o3x3o . ♦ 6 \| 12 \| 4 4 \| 600 * . x3o5o ♦ 12 \| 30 \| 0 20 \| * 120	o3o3x5o - rahi . . . . \| 1200 ♦ 6 \| 6 3 \| 2 3 --------+------+------+----------+-------- . . x . \| 2 \| 3600 \| 2 1 \| 1 2 --------+------+------+----------+-------- . o3x . \| 3 \| 3 \| 2400 * \| 1 1 . . x5o \| 5 \| 5 \| * 720 \| 0 2 --------+------+------+----------+-------- o3o3x . ♦ 4 \| 6 \| 4 0 \| 600 * . o3x5o ♦ 30 \| 60 \| 20 12 \| * 120	x3x3o5o - tex . . . . \| 1440 \| 1 5 \| 5 5 \| 5 1 --------+------+----------+-----------+-------- x . . . \| 2 \| 720 * \| 5 0 \| 5 0 . x . . \| 2 \| * 3600 \| 1 2 \| 2 1 --------+------+----------+-----------+-------- x3x . . \| 6 \| 3 3 \| 1200 * \| 2 0 . x3o . \| 3 \| 0 3 \| * 2400 \| 1 1 --------+------+----------+-----------+-------- x3x3o . ♦ 12 \| 6 12 \| 4 4 \| 600 * . x3o5o ♦ 12 \| 0 30 \| 0 20 \| * 120
x3o3x5o - srix . . . . \| 3600 \| 2 4 \| 1 4 2 2 \| 2 2 1 --------+------+-----------+---------------------+------------ x . . . \| 2 \| 3600 * \| 1 2 0 0 \| 2 1 0 . . x . \| 2 \| * 7200 \| 0 1 1 1 \| 1 1 1 --------+------+-----------+---------------------+------------ x3o . . \| 3 \| 3 0 \| 1200 * * * \| 2 0 0 x . x . \| 4 \| 2 2 \| * 3600 * * \| 1 1 0 . o3x . \| 3 \| 0 3 \| * * 2400 * \| 1 0 1 . . x5o \| 5 \| 0 5 \| * * * 1440 \| 0 1 1 --------+------+-----------+---------------------+------------ x3o3x . ♦ 12 \| 12 12 \| 4 6 4 0 \| 600 * * x . x5o ♦ 10 \| 5 10 \| 0 5 0 2 \| * 720 * . o3x5o ♦ 30 \| 0 60 \| 0 0 20 12 \| * * 120	x3o3o5x - sidpixhi . . . . \| 2400 \| 3 3 \| 3 6 3 \| 1 3 3 1 --------+------+-----------+----------------+----------------- x . . . \| 2 \| 3600 * \| 2 2 0 \| 1 2 1 0 . . . x \| 2 \| * 3600 \| 0 2 2 \| 0 1 2 1 --------+------+-----------+----------------+----------------- x3o . . \| 3 \| 3 0 \| 2400 * * \| 1 1 0 0 x . . x \| 4 \| 2 2 \| * 3600 * \| 0 1 1 0 . . o5x \| 5 \| 0 5 \| * * 1440 \| 0 0 1 1 --------+------+-----------+----------------+----------------- x3o3o . ♦ 4 \| 6 0 \| 4 0 0 \| 600 * * * x3o . x ♦ 6 \| 6 3 \| 2 3 0 \| * 1200 * * x . o5x ♦ 10 \| 5 10 \| 0 5 2 \| * * 720 * . o3o5x ♦ 20 \| 0 30 \| 0 0 12 \| * * * 120	o3x3x5o - xhi . . . . \| 3600 \| 2 2 \| 1 4 1 \| 2 2 --------+------+-----------+---------------+-------- . x . . \| 2 \| 3600 * \| 1 2 0 \| 2 1 . . x . \| 2 \| * 3600 \| 0 2 1 \| 1 2 --------+------+-----------+---------------+-------- o3x . . \| 3 \| 3 0 \| 1200 * * \| 2 0 . x3x . \| 6 \| 3 3 \| * 2400 * \| 1 1 . . x5o \| 5 \| 0 5 \| * * 720 \| 0 2 --------+------+-----------+---------------+-------- o3x3x . ♦ 12 \| 12 6 \| 4 4 0 \| 600 * . x3x5o ♦ 60 \| 30 60 \| 0 20 12 \| * 120
o3x3o5x - srahi . . . . \| 3600 \| 4 2 \| 2 2 4 1 \| 1 2 2 --------+------+-----------+--------------------+------------- . x . . \| 2 \| 7200 * \| 1 1 1 0 \| 1 1 1 . . . x \| 2 \| * 3600 \| 0 0 2 1 \| 0 1 2 --------+------+-----------+--------------------+------------- o3x . . \| 3 \| 3 0 \| 2400 * * * \| 1 1 0 . x3o . \| 3 \| 3 0 \| * 2400 * * \| 1 0 1 . x . x \| 4 \| 2 2 \| * * 3600 * \| 0 1 1 . . o5x \| 5 \| 0 5 \| * * * 720 \| 0 0 2 --------+------+-----------+--------------------+------------- o3x3o . ♦ 6 \| 12 0 \| 4 4 0 0 \| 600 * * o3x . x ♦ 6 \| 6 3 \| 2 0 3 0 \| * 1200 * . x3o5x ♦ 60 \| 60 60 \| 0 20 30 12 \| * * 120	o3o3x5x - thi . . . . \| 2400 \| 3 1 \| 3 3 \| 1 3 --------+------+-----------+----------+-------- . . x . \| 2 \| 3600 * \| 2 1 \| 1 2 . . . x \| 2 \| * 1200 \| 0 3 \| 0 3 --------+------+-----------+----------+-------- . o3x . \| 3 \| 3 0 \| 2400 * \| 1 1 . . x5x \| 10 \| 5 5 \| * 720 \| 0 2 --------+------+-----------+----------+-------- o3o3x . ♦ 4 \| 6 0 \| 4 0 \| 600 * . o3x5x ♦ 60 \| 60 30 \| 20 12 \| * 120	x3x3x5o - grix . . . . \| 7200 \| 1 1 2 \| 1 2 2 1 \| 2 1 1 --------+------+----------------+---------------------+------------ x . . . \| 2 \| 3600 * * \| 1 2 0 0 \| 2 1 0 . x . . \| 2 \| * 3600 * \| 1 0 2 0 \| 2 0 1 . . x . \| 2 \| * * 7200 \| 0 1 1 1 \| 1 1 1 --------+------+----------------+---------------------+------------ x3x . . \| 6 \| 3 3 0 \| 1200 * * * \| 2 0 0 x . x . \| 4 \| 2 0 2 \| * 3600 * * \| 1 1 0 . x3x . \| 6 \| 0 3 3 \| * * 2400 * \| 1 0 1 . . x5o \| 5 \| 0 0 5 \| * * * 1440 \| 0 1 1 --------+------+----------------+---------------------+------------ x3x3x . ♦ 24 \| 12 12 12 \| 4 6 4 0 \| 600 * * x . x5o ♦ 10 \| 5 0 10 \| 0 5 0 2 \| * 720 * . x3x5o ♦ 60 \| 0 30 60 \| 0 0 20 12 \| * * 120
x3x3o5x - prahi . . . . \| 7200 \| 1 2 2 \| 2 2 1 2 1 \| 1 2 1 1 --------+------+----------------+--------------------------+----------------- x . . . \| 2 \| 3600 * * \| 2 2 0 0 0 \| 1 2 1 0 . x . . \| 2 \| * 7200 * \| 1 0 1 1 0 \| 1 1 0 1 . . . x \| 2 \| * * 7200 \| 0 1 0 1 1 \| 0 1 1 1 --------+------+----------------+--------------------------+----------------- x3x . . \| 6 \| 3 3 0 \| 2400 * * * * \| 1 1 0 0 x . . x \| 4 \| 2 0 2 \| * 3600 * * * \| 0 1 1 0 . x3o . \| 3 \| 0 3 0 \| * * 2400 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 2 \| * * * 3600 * \| 0 1 0 1 . . o5x \| 5 \| 0 0 5 \| * * * * 1440 \| 0 0 1 1 --------+------+----------------+--------------------------+----------------- x3x3o . ♦ 12 \| 6 12 0 \| 4 0 4 0 0 \| 600 * * * x3x . x ♦ 12 \| 6 6 6 \| 2 3 0 3 0 \| * 1200 * * x . o5x ♦ 10 \| 5 0 10 \| 0 5 0 0 2 \| * * 720 * . x3o5x ♦ 60 \| 0 60 60 \| 0 0 20 30 12 \| * * * 120	x3o3x5x - prix . . . . \| 7200 \| 2 2 1 \| 1 2 2 1 2 \| 1 1 2 1 --------+------+----------------+--------------------------+----------------- x . . . \| 2 \| 7200 * * \| 1 1 1 0 0 \| 1 1 1 0 . . x . \| 2 \| * 7200 * \| 0 1 0 1 1 \| 1 0 1 1 . . . x \| 2 \| * * 3600 \| 0 0 2 0 2 \| 0 1 2 1 --------+------+----------------+--------------------------+----------------- x3o . . \| 3 \| 3 0 0 \| 2400 * * * * \| 1 1 0 0 x . x . \| 4 \| 2 2 0 \| * 3600 * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 2 \| * * 3600 * * \| 0 1 1 0 . o3x . \| 3 \| 0 3 0 \| * * * 2400 * \| 1 0 0 1 . . x5x \| 10 \| 0 5 5 \| * * * * 1440 \| 0 0 1 1 --------+------+----------------+--------------------------+----------------- x3o3x . ♦ 12 \| 12 12 0 \| 4 6 0 4 0 \| 600 * * * x3o . x ♦ 6 \| 12 0 6 \| 2 0 3 0 0 \| * 1200 * * x . x5x ♦ 20 \| 10 10 10 \| 0 5 5 0 2 \| * * 720 * . o3x5x ♦ 60 \| 0 60 30 \| 0 0 0 20 12 \| * * * 120	o3x3x5x - grahi . . . . \| 7200 \| 2 1 1 \| 1 2 2 1 \| 1 1 2 --------+------+----------------+--------------------+------------- . x . . \| 2 \| 7200 * * \| 1 1 1 0 \| 1 1 1 . . x . \| 2 \| * 3600 * \| 0 2 0 1 \| 1 0 2 . . . x \| 2 \| * * 3600 \| 0 0 2 1 \| 0 1 2 --------+------+----------------+--------------------+------------- o3x . . \| 3 \| 3 0 0 \| 2400 * * * \| 1 1 0 . x3x . \| 6 \| 3 3 0 \| * 2400 * * \| 1 0 1 . x . x \| 4 \| 2 0 2 \| * * 3600 * \| 0 1 1 . . x5x \| 10 \| 0 5 5 \| * * * 720 \| 0 0 2 --------+------+----------------+--------------------+------------- o3x3x . ♦ 12 \| 12 6 0 \| 4 4 0 0 \| 600 * * o3x . x ♦ 6 \| 6 0 3 \| 2 0 3 0 \| * 1200 * . x3x5x ♦ 120 \| 60 60 60 \| 0 20 30 12 \| * * 120
x3x3x5x - gidpixhi . . . . \| 14400 \| 1 1 1 1 \| 1 1 1 1 1 1 \| 1 1 1 1 --------+-------+---------------------+-------------------------------+----------------- x . . . \| 2 \| 7200 * * * \| 1 1 1 0 0 0 \| 1 1 1 0 . x . . \| 2 \| * 7200 * * \| 1 0 0 1 1 0 \| 1 1 0 1 . . x . \| 2 \| * * 7200 * \| 0 1 0 1 0 1 \| 1 0 1 1 . . . x \| 1 \| * * * 7200 \| 0 0 1 0 1 1 \| 0 1 1 1 --------+-------+---------------------+-------------------------------+----------------- x3x . . \| 6 \| 3 3 0 0 \| 2400 * * * * * \| 1 1 0 0 x . x . \| 4 \| 2 0 2 0 \| * 3600 * * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 0 2 \| * * 3600 * * * \| 0 1 1 0 . x3x . \| 6 \| 0 3 3 0 \| * * * 2400 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 0 2 \| * * * * 3600 * \| 0 1 0 1 . . x5x \| 10 \| 0 0 5 5 \| * * * * * 1440 \| 0 0 1 1 --------+-------+---------------------+-------------------------------+----------------- x3x3x . ♦ 24 \| 12 12 12 0 \| 4 6 0 4 0 0 \| 600 * * * x3x . x ♦ 12 \| 6 6 0 6 \| 2 0 3 0 3 0 \| * 1200 * * x . x5x ♦ 20 \| 10 0 10 10 \| 0 5 5 0 0 2 \| * * 720 * . x3x5x ♦ 120 \| 0 60 60 60 \| 0 0 0 20 30 12 \| * * * 120

5D edit

5D

5-simplex {3,3,3,3} ^[46]

5-orthoplex {3,3,3,4} ^[47]

5-cube {4,3,3,3} ^[48]

x3o3o3o3o
. . . . . | 6 ♦  5 | 10 | 10 | 5
----------+---+----+----+----+--
x . . . . | 2 | 15 ♦  4 |  6 | 4
----------+---+----+----+----+--
x3o . . . | 3 |  3 | 20 |  3 | 3
----------+---+----+----+----+--
x3o3o . . ♦ 4 |  6 |  4 | 15 | 2
----------+---+----+----+----+--
x3o3o3o . ♦ 5 | 10 | 10 |  5 | 6

x3o3o3o4o
. . . . . | 10 ♦  8 | 24 | 32 | 16
----------+----+----+----+----+---
x . . . . |  2 | 40 ♦  6 | 12 |  8
----------+----+----+----+----+---
x3o . . . |  3 |  3 | 80 |  4 |  4
----------+----+----+----+----+---
x3o3o . . ♦  4 |  6 |  4 | 80 |  2
----------+----+----+----+----+---
x3o3o3o . ♦  5 | 10 | 10 |  5 | 32

o3o3o3o4x
. . . . . | 32 ♦  5 | 10 | 10 |  5
----------+----+----+----+----+---
. . . . x |  2 | 80 ♦  4 |  6 |  4
----------+----+----+----+----+---
. . . o4x |  4 |  4 | 80 |  3 |  3
----------+----+----+----+----+---
. . o3o4x ♦  8 | 12 |  6 | 40 |  2
----------+----+----+----+----+---
. o3o3o4x ♦ 16 | 32 | 24 |  8 | 10

5-simplexes edit

5D

5-simplex {3,3,3,3} ^[49]

x3o3o3o3o
. . . . . | 6 ♦  5 | 10 | 10 | 5
----------+---+----+----+----+--
x . . . . | 2 | 15 ♦  4 |  6 | 4
----------+---+----+----+----+--
x3o . . . | 3 |  3 | 20 |  3 | 3
----------+---+----+----+----+--
x3o3o . . ♦ 4 |  6 |  4 | 15 | 2
----------+---+----+----+----+--
x3o3o3o . ♦ 5 | 10 | 10 |  5 | 6

(pt || pen)
o.3o.3o.3o.    | 1 * ♦ 5  0 | 10  0 | 10 0 | 5 0
.o3.o3.o3.o    | * 5 ♦ 1  4 |  4  6 |  6 4 | 4 1
---------------+-----+------+-------+------+----
oo3oo3oo3oo&#x | 1 1 | 5  * ♦  4  0 |  6 0 | 4 0
.x .. .. ..    | 0 2 | * 10 ♦  1  3 |  3 3 | 3 1
---------------+-----+------+-------+------+----
ox .. .. ..&#x | 1 2 | 2  1 | 10  * |  3 0 | 3 0
.x3.o .. ..    | 0 3 | 0  3 |  * 10 |  1 2 | 2 1
---------------+-----+------+-------+------+----
ox3oo .. ..&#x ♦ 1 3 | 3  3 |  3  1 | 10 * | 2 0
.x3.o3.o ..    ♦ 0 4 | 0  6 |  0  4 |  * 5 | 1 1
---------------+-----+------+-------+------+----
ox3oo3oo ..&#x ♦ 1 4 | 4  6 |  6  4 |  4 1 | 5 *
.x3.o3.o3.o    ♦ 0 5 | 0 10 |  0 10 |  0 5 | * 1

(line || perp tet)
o. o.3o.3o.    | 2 * ♦ 1 4 0 | 4  6 0 | 6 4 0 | 4 1
.o .o3.o3.o    | * 4 ♦ 0 2 3 | 1  6 3 | 3 6 1 | 3 2
---------------+-----+-------+--------+-------+----
x. .. .. ..    | 2 0 | 1 * * ♦ 4  0 0 | 6 0 0 | 4 0
oo oo3oo3oo&#x | 1 1 | * 8 * ♦ 1  3 0 | 3 3 0 | 3 1
.. .x .. ..    | 0 2 | * * 6 ♦ 0  2 2 | 1 4 1 | 2 2
---------------+-----+-------+--------+-------+----
xo .. .. ..&#x | 2 1 | 1 2 0 | 4  * * | 3 0 0 | 3 0
.. ox .. ..&#x | 1 2 | 0 2 1 | * 12 * | 1 2 0 | 2 1
.. .x3.o ..    | 0 3 | 0 0 3 | *  * 4 | 0 2 1 | 1 2
---------------+-----+-------+--------+-------+----
xo ox .. ..&#x ♦ 2 2 | 1 4 1 | 2  2 0 | 6 * * | 2 0
.. ox3oo ..&#x ♦ 1 3 | 0 3 3 | 0  3 1 | * 8 * | 1 1
.. .x3.o3.o    ♦ 0 4 | 0 0 6 | 0  0 4 | * * 1 | 0 2
---------------+-----+-------+--------+-------+----
xo ox3oo ..&#x ♦ 2 3 | 1 6 3 | 3  6 1 | 3 2 0 | 4 *
.. ox3oo3oo&#x ♦ 1 4 | 0 4 6 | 0  6 4 | 0 4 1 | * 2

({3} || perp {3})
o.3o. o.3o.    & | 6 ♦ 2 3 | 1  9 | 4 3 | 5
-----------------+---+-----+------+-----+--
x. .. .. ..    & | 2 | 6 * ♦ 1  3 | 3 3 | 4
oo3oo oo3oo&#x   | 2 | * 9 ♦ 0  4 | 2 4 | 4
-----------------+---+-----+------+-----+--
x.3o. .. ..    & | 3 | 3 0 | 2  * | 3 0 | 3
xo .. .. ..&#x & | 3 | 1 2 | * 18 | 1 2 | 3
-----------------+---+-----+------+-----+--
xo3oo .. ..&#x & ♦ 4 | 3 3 | 1  3 | 6 * | 2
xo .. ox ..&#x   ♦ 4 | 2 4 | 0  4 | * 9 | 2
-----------------+---+-----+------+-----+--
xo3oo ox ..&#x & ♦ 5 | 4 6 | 1  9 | 2 3 | 6

o..3o..3o..    | 1 * * ♦ 4 1 0 0 | 6 4 0 0 | 4 6 0 0 | 1 4 0
.o.3.o.3.o.    | * 4 * ♦ 1 0 3 1 | 3 1 3 3 | 3 3 1 3 | 1 3 1
..o3..o3..o    | * * 1 ♦ 0 1 0 4 | 0 4 0 6 | 0 6 0 4 | 0 4 1
---------------+-------+---------+---------+---------+------
oo.3oo.3oo.&#x | 1 1 0 | 4 * * * ♦ 3 1 0 0 | 3 3 0 0 | 1 3 0
o.o3o.o3o.o&#x | 1 0 1 | * 1 * * ♦ 0 4 0 0 | 0 6 0 0 | 0 4 0
.x. ... ...    | 0 2 0 | * * 6 * ♦ 1 0 2 1 | 2 1 1 2 | 1 2 1
.oo3.oo3.oo&#x | 0 1 1 | * * * 4 ♦ 0 1 0 3 | 0 3 0 3 | 0 3 1
---------------+-------+---------+---------+---------+------
ox. ... ...&#x | 1 2 0 | 2 0 1 0 | 6 * * * | 2 1 0 0 | 1 2 0
ooo3ooo3ooo&#x | 1 1 1 | 1 1 0 1 | * 4 * * | 0 3 0 0 | 0 3 0
.x.3.o. ...    | 0 3 0 | 0 0 3 0 | * * 4 * | 1 0 1 1 | 1 1 1
.xo ... ...&#x | 0 2 1 | 0 0 1 2 | * * * 6 | 0 1 0 2 | 0 2 1
---------------+-------+---------+---------+---------+------
ox.3oo. ...&#x ♦ 1 3 0 | 3 0 3 0 | 3 0 1 0 | 4 * * * | 1 1 0
oxo ... ...&#x ♦ 1 2 1 | 2 1 1 2 | 1 2 0 1 | * 6 * * | 0 2 0
.x.3.o.3.o.    ♦ 0 4 0 | 0 0 6 0 | 0 0 4 0 | * * 1 * | 1 0 1
.xo3.oo ...&#x ♦ 0 3 1 | 0 0 3 3 | 0 0 1 3 | * * * 4 | 0 1 1
---------------+-------+---------+---------+---------+------
ox.3oo.3oo.&#x ♦ 1 4 0 | 4 0 6 0 | 6 0 4 0 | 4 0 1 0 | 1 * *
oxo3ooo ...&#x ♦ 1 3 1 | 3 1 3 3 | 3 3 1 3 | 1 3 0 1 | * 4 *
.xo3.oo3.oo&#x ♦ 0 4 1 | 0 0 6 4 | 0 0 4 6 | 0 0 1 4 | * * 1

( (pt || {3}) || line )
o..3o.. o..    | 1 * * ♦ 3 2 0 0 0 | 3 1 6 0 0 0 | 1 6 3 0 0 | 2 3 0
.o.3.o. .o.    | * 3 * ♦ 1 0 2 2 0 | 2 0 2 1 4 1 | 1 4 1 2 2 | 2 2 1
..o3..o ..o    | * * 2 ♦ 0 1 0 3 1 | 0 1 3 0 3 3 | 0 3 3 1 3 | 1 3 1
---------------+-------+-----------+-------------+-----------+------
oo.3oo. oo.&#x | 1 1 0 | 3 * * * * ♦ 2 0 2 0 0 0 | 1 4 1 0 0 | 2 2 0
o.o3o.o o.o&#x | 1 0 1 | * 2 * * * ♦ 0 1 3 0 0 0 | 0 3 3 0 0 | 1 3 0
.x. ... ...    | 0 2 0 | * * 3 * * ♦ 1 0 0 1 2 0 | 1 2 0 2 1 | 2 1 1
.oo3.oo .oo&#x | 0 1 1 | * * * 6 * ♦ 0 0 1 0 2 1 | 0 2 1 1 2 | 1 2 1
... ... ..x    | 0 0 2 | * * * * 1 ♦ 0 1 0 0 0 3 | 0 0 3 0 3 | 0 3 1
---------------+-------+-----------+-------------+-----------+------
ox. ... ...&#x | 1 2 0 | 2 0 1 0 0 | 3 * * * * * | 1 2 0 0 0 | 2 1 0
... ... o.x&#x | 1 0 2 | 0 2 0 0 1 | * 1 * * * * | 0 0 3 0 0 | 0 3 0
ooo3ooo ooo&#x | 1 1 1 | 1 1 0 1 0 | * * 6 * * * | 0 2 1 0 0 | 1 2 0
.x.3.o. ...    | 0 3 0 | 0 0 3 0 0 | * * * 1 * * | 1 0 0 2 0 | 2 0 1
.xo ... ...&#x | 0 2 1 | 0 0 1 2 0 | * * * * 6 * | 0 1 0 1 1 | 1 1 1
... ... .ox&#x | 0 1 2 | 0 0 0 2 1 | * * * * * 3 | 0 0 1 0 2 | 0 2 1
---------------+-------+-----------+-------------+-----------+------
ox.3oo. ...&#x ♦ 1 3 0 | 3 0 3 0 0 | 3 0 0 1 0 0 | 1 * * * * | 2 0 0
oxo ... ...&#x ♦ 1 2 1 | 2 1 1 2 0 | 1 0 2 0 1 0 | * 6 * * * | 1 1 0
... ... oox&#x ♦ 1 1 2 | 1 2 0 2 1 | 0 1 2 0 0 1 | * * 3 * * | 0 2 0
.xo3.oo ...&#x ♦ 0 3 1 | 0 0 3 3 0 | 0 0 0 1 3 0 | * * * 2 * | 1 0 1
.xo ... .ox&#x ♦ 0 2 2 | 0 0 1 4 1 | 0 0 0 0 2 2 | * * * * 3 | 0 1 1
---------------+-------+-----------+-------------+-----------+------
oxo3ooo ...&#x ♦ 1 3 1 | 3 1 3 3 0 | 3 0 3 1 3 0 | 1 3 0 1 0 | 2 * *
oxo ... oox&#x ♦ 1 2 2 | 2 2 1 4 1 | 1 1 4 0 2 2 | 0 2 2 0 1 | * 3 *
.xo3.oo .ox&#x ♦ 0 3 2 | 0 0 3 6 1 | 0 0 0 1 6 3 | 0 0 0 2 3 | * * 1

( (line || perp line) || perp line)
o.. o.. o..    | 2 * * ♦ 1 2 2 0 0 0 | 2 2 1 1 4 0 0 | 4 1 1 2 2 0 | 2 2 1
.o. .o. .o.    | * 2 * ♦ 0 2 0 1 2 0 | 1 0 2 0 4 2 1 | 2 1 0 4 2 1 | 2 1 2
..o ..o ..o    | * * 2 ♦ 0 0 2 0 2 1 | 0 1 0 2 4 1 2 | 2 0 1 2 4 1 | 1 2 2
---------------+-------+-------------+---------------+-------------+------
x.. ... ...    | 2 0 0 | 1 * * * * * ♦ 2 2 0 0 0 0 0 | 4 1 1 0 0 0 | 2 2 0
oo. oo. oo.&#x | 1 1 0 | * 4 * * * * ♦ 1 0 1 0 2 0 0 | 2 1 0 2 1 0 | 2 1 1
o.o o.o o.o&#x | 1 0 1 | * * 4 * * * ♦ 0 1 0 1 2 0 0 | 2 0 1 1 2 0 | 1 2 1
... .x. ...    | 0 2 0 | * * * 1 * * ♦ 0 0 2 0 0 2 0 | 0 1 0 4 0 1 | 2 0 2
.oo .oo .oo&#x | 0 1 1 | * * * * 4 * ♦ 0 0 0 0 2 1 1 | 1 0 0 2 2 1 | 1 1 2
... ... ..x    | 0 0 2 | * * * * * 1 ♦ 0 0 0 2 0 0 2 | 0 0 1 0 4 1 | 0 2 2
---------------+-------+-------------+---------------+-------------+------
xo. ... ...&#x | 2 1 0 | 1 2 0 0 0 0 | 2 * * * * * * | 2 1 0 0 0 0 | 2 1 0
x.o ... ...&#x | 2 0 1 | 1 0 2 0 0 0 | * 2 * * * * * | 2 0 1 0 0 0 | 1 2 0
... ox. ...&#x | 1 2 0 | 0 2 0 1 0 0 | * * 2 * * * * | 0 1 0 2 0 0 | 2 0 1
... ... o.x&#x | 1 0 2 | 0 0 2 0 0 1 | * * * 2 * * * | 0 0 1 0 2 0 | 0 2 1
ooo ooo ooo&#x | 1 1 1 | 0 1 1 0 1 0 | * * * * 8 * * | 1 0 0 1 1 0 | 1 1 1
... .xo ...&#x | 0 2 1 | 0 0 0 1 2 0 | * * * * * 2 * | 0 0 0 2 0 1 | 1 0 2
... ... .ox&#x | 0 1 2 | 0 0 0 0 2 1 | * * * * * * 2 | 0 0 0 0 2 1 | 0 1 2
---------------+-------+-------------+---------------+-------------+------
xoo ... ...&#x ♦ 2 1 1 | 1 2 2 0 1 0 | 1 1 0 0 2 0 0 | 4 * * * * * | 1 1 0
xo. ox. ...&#x ♦ 2 2 0 | 1 4 0 1 0 0 | 2 0 2 0 0 0 0 | * 1 * * * * | 2 0 0
x.o ... o.x&#x ♦ 2 0 2 | 1 0 4 0 0 1 | 0 2 0 2 0 0 0 | * * 1 * * * | 0 2 0
... oxo ...&#x ♦ 1 2 1 | 0 2 1 1 2 0 | 0 0 1 0 2 1 0 | * * * 4 * * | 1 0 1
... ... oox&#x ♦ 1 1 2 | 0 1 2 0 2 1 | 0 0 0 1 2 0 1 | * * * * 4 * | 0 1 1
... .xo .ox&#x ♦ 0 2 2 | 0 0 0 1 4 1 | 0 0 0 0 0 2 2 | * * * * * 1 | 0 0 2
---------------+-------+-------------+---------------+-------------+------
xoo oxo ...&#x ♦ 2 2 1 | 1 4 2 1 2 0 | 2 1 2 0 4 1 0 | 2 1 0 2 0 0 | 2 * *
xoo ... oox&#x ♦ 2 1 2 | 1 2 4 0 2 1 | 1 2 0 2 4 0 1 | 2 0 1 0 2 0 | * 2 *
... oxo oox&#x ♦ 1 2 2 | 0 2 2 1 4 1 | 0 0 1 1 4 2 2 | 0 0 0 2 2 1 | * * 2

Uniform 5D edit

5D

5-demicube
h{4,3,3,3}^[50]

r{3,3,3,3}^[51]

2r{3,3,3,3}^[52]

2r{4,3,3,3}^[53]

x3o3o *b3o3o - hin
. . .    . . | 16 ♦ 10 |  30 | 10 20 |  5  5
-------------+----+----+-----+-------+------
x . .    . . |  2 | 80 ♦   6 |  3  6 |  3  2
-------------+----+----+-----+-------+------
x3o .    . . |  3 |  3 | 160 |  1  2 |  2  1
-------------+----+----+-----+-------+------
x3o3o    . . ♦  4 |  6 |   4 | 40  * |  2  0
x3o . *b3o . ♦  4 |  6 |   4 |  * 80 |  1  1
-------------+----+----+-----+-------+------
x3o3o *b3o . ♦  8 | 24 |  32 |  8  8 | 10  *
x3o . *b3o3o ♦  5 | 10 |  10 |  0  5 |  * 16

o3x3o3o3o - rix
. . . . . | 15 ♦  8 |  4 12 |  6  8 | 4 2
----------+----+----+-------+-------+----
. x . . . |  2 | 60 |  1  3 |  3  3 | 3 1
----------+----+----+-------+-------+----
o3x . . . |  3 |  3 | 20  * |  3  0 | 3 0
. x3o . . |  3 |  3 |  * 60 |  1  2 | 2 1
----------+----+----+-------+-------+----
o3x3o . . ♦  6 | 12 |  4  4 | 15  * | 2 0
. x3o3o . ♦  4 |  6 |  0  4 |  * 30 | 1 1
----------+----+----+-------+-------+----
o3x3o3o . ♦ 10 | 30 | 10 20 |  5  5 | 6 *
. x3o3o3o ♦  5 | 10 |  0 10 |  0  5 | * 6

o3o3x3o3o - dot
. . . . . | 20 ♦  9 |  9  9 |  3  9  3 | 3 3
----------+----+----+-------+----------+----
. . x . . |  2 | 90 |  2  2 |  1  4  1 | 2 2
----------+----+----+-------+----------+----
. o3x . . |  3 |  3 | 60  * |  1  2  0 | 2 1
. . x3o . |  3 |  3 |  * 60 |  0  2  1 | 1 2
----------+----+----+-------+----------+----
o3o3x . . ♦  4 |  6 |  4  0 | 15  *  * | 2 0
. o3x3o . ♦  6 | 12 |  4  4 |  * 30  * | 1 1
. . x3o3o ♦  4 |  6 |  0  4 |  *  * 15 | 0 2
----------+----+----+-------+----------+----
o3o3x3o . ♦ 10 | 30 | 20 10 |  5  5  0 | 6 *
. o3x3o3o ♦ 10 | 30 | 10 20 |  0  5  5 | * 6

o3x3o *b3o3o - nit
. . .    . . | 80 ♦  12 |   6   6  12 |  3  6  6  4 |  3  2  2
-------------+----+-----+-------------+-------------+---------
. x .    . . |  2 | 480 |   1   1   2 |  1  2  2  1 |  2  1  1
-------------+----+-----+-------------+-------------+---------
o3x .    . . |  3 |   3 | 160   *   * |  1  2  0  0 |  2  1  0
. x3o    . . |  3 |   3 |   * 160   * |  1  0  2  0 |  2  0  1
. x . *b3o . |  3 |   3 |   *   * 320 |  0  1  1  1 |  1  1  1
-------------+----+-----+-------------+-------------+---------
o3x3o    . . ♦  6 |  12 |   4   4   0 | 40  *  *  * |  2  0  0
o3x . *b3o . ♦  6 |  12 |   4   0   4 |  * 80  *  * |  1  1  0
. x3o *b3o . ♦  6 |  12 |   0   4   4 |  *  * 80  * |  1  0  1
. x . *b3o3o ♦  4 |   6 |   0   0   4 |  *  *  * 80 |  0  1  1
-------------+----+-----+-------------+-------------+---------
o3x3o *b3o . ♦ 24 |  96 |  32  32  32 |  8  8  8  0 | 10  *  *
o3x . *b3o3o ♦ 10 |  30 |  10   0  20 |  0  5  0  5 |  * 16  *
. x3o *b3o3o ♦ 10 |  30 |   0  10  20 |  0  0  5  5 |  *  * 16

6D edit

6D regular

6-simplex {3,3,3,3,3} ^[54]

6-orthoplex {3,3,3,3,4} ^[55]

6-cube {4,3,3,3,3} ^[56]

x3o3o3o3o3o
. . . . . . | 7 ♦  6 | 15 | 20 | 15 | 6
------------+---+----+----+----+----+--
x . . . . . | 2 | 21 ♦  5 | 10 | 10 | 5
------------+---+----+----+----+----+--
x3o . . . . | 3 |  3 | 35 ♦  4 |  6 | 4
------------+---+----+----+----+----+--
x3o3o . . . ♦ 4 |  6 |  4 | 35 |  3 | 3
------------+---+----+----+----+----+--
x3o3o3o . . ♦ 5 | 10 | 10 |  5 | 21 | 2
------------+---+----+----+----+----+--
x3o3o3o3o . ♦ 6 | 15 | 20 | 15 |  6 | 7

x3o3o3o3o4o
. . . . . . | 12 ♦ 10 |  40 |  80 |  80 | 32
------------+----+----+-----+-----+-----+---
x . . . . . |  2 | 60 ♦   8 |  24 |  32 | 16
------------+----+----+-----+-----+-----+---
x3o . . . . |  3 |  3 | 160 ♦   6 |  12 |  8
------------+----+----+-----+-----+-----+---
x3o3o . . . ♦  4 |  6 |   4 | 240 |   4 |  4
------------+----+----+-----+-----+-----+---
x3o3o3o . . ♦  5 | 10 |  10 |   5 | 192 |  2
------------+----+----+-----+-----+-----+---
x3o3o3o3o . ♦  6 | 15 |  20 |  15 |   6 | 64

o3o3o3o3o4x
. . . . . . | 64 ♦   6 |  15 |  20 | 15 |  6
------------+----+-----+-----+-----+----+---
. . . . . x |  2 | 192 ♦   5 |  10 | 10 |  5
------------+----+-----+-----+-----+----+---
. . . . o4x |  4 |   4 | 240 ♦   4 |  6 |  4
------------+----+-----+-----+-----+----+---
. . . o3o4x ♦  8 |  12 |   6 | 160 |  3 |  3
------------+----+-----+-----+-----+----+---
. . o3o3o4x ♦ 16 |  32 |  24 |   8 | 60 |  2
------------+----+-----+-----+-----+----+---
. o3o3o3o4x ♦ 32 |  80 |  80 |  40 | 10 | 12

Uniform 6D edit

6D

6-demicube h{4,3,3,3,3} ^[57]

2₂₁ {3,3,3^2,1} ^[58]

1₂₂ {3,3^2,2} ^[59]

x3o3o *b3o3o3o
. . .    . . . | 32 ♦  15 |  60 |  20  60 | 15  30 |  6  6
---------------+----+-----+-----+---------+--------+------
x . .    . . . |  2 | 240 ♦   8 |   4  12 |  6   8 |  4  2
---------------+----+-----+-----+---------+--------+------
x3o .    . . . |  3 |   3 | 640 |   1   3 |  3   3 |  3  1
---------------+----+-----+-----+---------+--------+------
x3o3o    . . . ♦  4 |   6 |   4 | 160   * |  3   0 |  3  0
x3o . *b3o . . ♦  4 |   6 |   4 |   * 480 |  1   2 |  2  1
---------------+----+-----+-----+---------+--------+------
x3o3o *b3o . . ♦  8 |  24 |  32 |   8   8 | 60   * |  2  0
x3o . *b3o3o . ♦  5 |  10 |  10 |   0   5 |  * 192 |  1  1
---------------+----+-----+-----+---------+--------+------
x3o3o *b3o3o . ♦ 16 |  80 | 160 |  40  80 | 10  16 | 12  *
x3o . *b3o3o3o ♦  6 |  15 |  20 |   0  15 |  0   6 |  * 32

x3o3o3o3o *c3o
. . . . .    . | 27 ♦  16 |  80 |  160 |  80  40 | 16 10
---------------+----+-----+-----+------+---------+------
x . . . .    . |  2 | 216 ♦  10 |   30 |  20  10 |  5  5
---------------+----+-----+-----+------+---------+------
x3o . . .    . |  3 |   3 | 720 ♦    6 |   6   3 |  2  3
---------------+----+-----+-----+------+---------+------
x3o3o . .    . ♦  4 |   6 |   4 | 1080 |   2   1 |  1  2
---------------+----+-----+-----+------+---------+------
x3o3o3o .    . ♦  5 |  10 |  10 |    5 | 432   * |  1  1
x3o3o . . *c3o ♦  5 |  10 |  10 |    5 |   * 216 |  0  2
---------------+----+-----+-----+------+---------+------
x3o3o3o3o    . ♦  6 |  15 |  20 |   15 |   6   0 | 72  *
x3o3o3o . *c3o ♦ 10 |  40 |  80 |   80 |  16  16 |  * 27

o3o3o3o3o *c3x
. . . . .    . | 72 ♦  20 |   90 |   60   60 |  15  30  15 |  6  6
---------------+----+-----+------+-----------+-------------+------
. . . . .    x |  2 | 720 ♦    9 |    9    9 |   3   9   3 |  3  3
---------------+----+-----+------+-----------+-------------+------
. . o . . *c3x |  3 |   3 | 2160 |    2    2 |   1   4   1 |  2  2
---------------+----+-----+------+-----------+-------------+------
. o3o . . *c3x ♦  4 |   6 |    4 | 1080    * |   1   2   0 |  2  1
. . o3o . *c3x ♦  4 |   6 |    4 |    * 1080 |   0   2   1 |  1  2
---------------+----+-----+------+-----------+-------------+------
o3o3o . . *c3x ♦  5 |  10 |   10 |    5    0 | 216   *   * |  2  0
. o3o3o . *c3x ♦  8 |  24 |   32 |    8    8 |   * 270   * |  1  1
. . o3o3o *c3x ♦  5 |  10 |   10 |    0    5 |   *   * 216 |  0  2
---------------+----+-----+------+-----------+-------------+------
o3o3o3o . *c3x ♦ 16 |  80 |  160 |   80   40 |  16  10   0 | 27  *
. o3o3o3o *c3x ♦ 16 |  80 |  160 |   40   80 |   0  10  16 |  * 27

rectified 6-simplex
r{3,3,3,3,3} ^[60]

birectified 6-simplex
r{3,3,3,3,3} ^[61]

rectified 1_22
r{3,3^2,2} ^[62]

o3x3o3o3o3o - ril
. . . . . . | 21 ♦  10 |  5  20 | 10  20 | 10 10 | 5 2
------------+----+-----+--------+--------+-------+----
. x . . . . |  2 | 105 |  1   4 |  4   6 |  6  4 | 4 1
------------+----+-----+--------+--------+-------+----
o3x . . . . |  3 |   3 | 35   * ♦  4   0 |  6  0 | 4 0
. x3o . . . |  3 |   3 |  * 140 |  1   3 |  3  3 | 3 1
------------+----+-----+--------+--------+-------+----
o3x3o . . . ♦  6 |  12 |  4   4 | 35   * |  3  0 | 3 0
. x3o3o . . ♦  4 |   6 |  0   4 |  * 105 |  1  2 | 2 1
------------+----+-----+--------+--------+-------+----
o3x3o3o . . ♦ 10 |  30 | 10  20 |  5   5 | 21  * | 2 0
. x3o3o3o . ♦  5 |  10 |  0  10 |  0   5 |  * 42 | 1 1
------------+----+-----+--------+--------+-------+----
o3x3o3o3o . ♦ 15 |  60 | 20  60 | 15  30 |  6  6 | 7 *
. x3o3o3o3o ♦  6 |  15 |  0  20 |  0  15 |  0  6 | * 7

o3o3x3o3o3o - bril
. . . . . . | 35 ♦  12 |  12  18 |  4  18  12 |  6 12  3 | 4 3
------------+----+-----+---------+------------+----------+----
. . x . . . |  2 | 210 |   2   3 |  1   6   3 |  3  6  1 | 3 2
------------+----+-----+---------+------------+----------+----
. o3x . . . |  3 |   3 | 140   * |  1   3   0 |  3  3  0 | 3 1
. . x3o . . |  3 |   3 |   * 210 |  0   2   2 |  1  4  1 | 2 2
------------+----+-----+---------+------------+----------+----
o3o3x . . . ♦  4 |   6 |   4   0 | 35   *   * |  3  0  0 | 3 0
. o3x3o . . ♦  6 |  12 |   4   4 |  * 105   * |  1  2  0 | 2 1
. . x3o3o . ♦  4 |   6 |   0   4 |  *   * 105 |  0  2  1 | 1 2
------------+----+-----+---------+------------+----------+----
o3o3x3o . . ♦ 10 |  30 |  20  10 |  5   5   0 | 21  *  * | 2 0
. o3x3o3o . ♦ 10 |  30 |  10  20 |  0   5   5 |  * 42  * | 1 1
. . x3o3o3o ♦  5 |  10 |   0  10 |  0   0   5 |  *  * 21 | 0 2
------------+----+-----+---------+------------+----------+----
o3o3x3o3o . ♦ 20 |  90 |  60  60 | 15  30  15 |  6  6  0 | 7 *
. o3x3o3o3o ♦ 15 |  60 |  20  60 |  0  15  30 |  0  6  6 | * 7

o3o3x3o3o *c3o - ram
. . . . .    . | 720 ♦   18 |   18   18    9 |    6   18    9    6    9 |   6   3   6   9   3 |  2  3  3
---------------+-----+------+----------------+--------------------------+---------------------+---------
. . x . .    . |   2 | 6480 |    2    2    1 |    1    4    2    1    2 |   2   1   2   4   1 |  1  2  2
---------------+-----+------+----------------+--------------------------+---------------------+---------
. o3x . .    . |   3 |    3 | 4320    *    * |    1    2    1    0    0 |   2   1   1   2   0 |  1  2  1
. . x3o .    . |   3 |    3 |    * 4320    * |    0    2    0    1    1 |   1   0   2   2   1 |  1  1  2
. . x . . *c3o |   3 |    3 |    *    * 2160 |    0    0    2    0    2 |   0   1   0   4   1 |  0  2  2
---------------+-----+------+----------------+--------------------------+---------------------+---------
o3o3x . .    . ♦   4 |    6 |    4    0    0 | 1080    *    *    *    * |   2   1   0   0   0 |  1  2  0
. o3x3o .    . ♦   6 |   12 |    4    4    0 |    * 2160    *    *    * |   1   0   1   1   0 |  1  1  1
. o3x . . *c3o ♦   6 |   12 |    4    0    4 |    *    * 1080    *    * |   0   1   0   2   0 |  0  2  1
. . x3o3o    . ♦   4 |    6 |    0    4    0 |    *    *    * 1080    * |   0   0   2   0   1 |  1  0  2
. . x3o . *c3o ♦   6 |   12 |    0    4    4 |    *    *    *    * 1080 |   0   0   0   2   1 |  0  1  2
---------------+-----+------+----------------+--------------------------+---------------------+---------
o3o3x3o .    . ♦  10 |   30 |   20   10    0 |    5    5    0    0    0 | 432   *   *   *   * |  1  1  0
o3o3x . . *c3o ♦  10 |   30 |   20    0   10 |    5    0    5    0    0 |   * 216   *   *   * |  0  2  0
. o3x3o3o    . ♦  10 |   30 |   10   20    0 |    0    5    0    5    0 |   *   * 432   *   * |  1  0  1
. o3x3o . *c3o ♦  24 |   96 |   32   32   32 |    0    8    8    0    8 |   *   *   * 270   * |  0  1  1
. . x3o3o *c3o ♦  10 |   30 |    0   20   10 |    0    0    0    5    5 |   *   *   *   * 216 |  0  0  2
---------------+-----+------+----------------+--------------------------+---------------------+---------
o3o3x3o3o    . ♦  20 |   90 |   60   60    0 |   15   30    0   15    0 |   6   0   6   0   0 | 72  *  *
o3o3x3o . *c3o ♦  80 |  480 |  320  160  160 |   80   80   80    0   40 |  16  16   0  10   0 |  * 27  *
. o3x3o3o *c3o ♦  80 |  480 |  160  320  160 |    0   80   40   80   80 |   0   0  16  10  16 |  *  * 27

7D edit

7-simplex {3,3,3,3,3,3} ^[63]

7-orthoplex {3,3,3,3,3,4} ^[64]

7-cube {4,3,3,3,3,3} ^[65]

x3o3o3o3o3o3o
. . . . . . . | 8 ♦  7 | 21 | 35 | 35 | 21 | 7
--------------+---+----+----+----+----+----+--
x . . . . . . | 2 | 28 ♦  6 | 15 | 20 | 15 | 6
--------------+---+----+----+----+----+----+--
x3o . . . . . | 3 |  3 | 56 ♦  5 | 10 | 10 | 5
--------------+---+----+----+----+----+----+--
x3o3o . . . . ♦ 4 |  6 |  4 | 70 ♦  4 |  6 | 4
--------------+---+----+----+----+----+----+--
x3o3o3o . . . ♦ 5 | 10 | 10 |  5 | 56 |  3 | 3
--------------+---+----+----+----+----+----+--
x3o3o3o3o . . ♦ 6 | 15 | 20 | 15 |  6 | 28 | 2
--------------+---+----+----+----+----+----+--
x3o3o3o3o3o . ♦ 7 | 21 | 35 | 35 | 21 |  7 | 8

x3o3o3o3o3o4o
. . . . . . . | 14 ♦ 12 |  60 | 160 | 240 | 192 |  64
--------------+----+----+-----+-----+-----+-----+----
x . . . . . . |  2 | 84 ♦  10 |  40 |  80 |  80 |  32
--------------+----+----+-----+-----+-----+-----+----
x3o . . . . . |  3 |  3 | 280 ♦   8 |  24 |  32 |  16
--------------+----+----+-----+-----+-----+-----+----
x3o3o . . . . ♦  4 |  6 |   4 | 560 ♦   6 |  12 |   8
--------------+----+----+-----+-----+-----+-----+----
x3o3o3o . . . ♦  5 | 10 |  10 |   5 | 672 |   4 |   4
--------------+----+----+-----+-----+-----+-----+----
x3o3o3o3o . . ♦  6 | 15 |  20 |  15 |   6 | 448 |   2
--------------+----+----+-----+-----+-----+-----+----
x3o3o3o3o3o . ♦  7 | 21 |  35 |  35 |  21 |   7 | 128

o3o3o3o3o3o4x
. . . . . . . | 128 ♦   7 |  21 |  35 |  35 | 21 |  7
--------------+-----+-----+-----+-----+-----+----+---
. . . . . . x |   2 | 448 ♦   6 |  15 |  20 | 15 |  6
--------------+-----+-----+-----+-----+-----+----+---
. . . . . o4x |   4 |   4 | 672 ♦   5 |  10 | 10 |  5
--------------+-----+-----+-----+-----+-----+----+---
. . . . o3o4x ♦   8 |  12 |   6 | 560 ♦   4 |  6 |  4
--------------+-----+-----+-----+-----+-----+----+---
. . . o3o3o4x ♦  16 |  32 |  24 |   8 | 280 |  3 |  3
--------------+-----+-----+-----+-----+-----+----+---
. . o3o3o3o4x ♦  32 |  80 |  80 |  40 |  10 | 84 |  2
--------------+-----+-----+-----+-----+-----+----+---
. o3o3o3o3o4x ♦  64 | 192 | 240 | 160 |  60 | 12 | 14

Uniform 7D edit

7-demicube h{4,3,3,3,3,3} ^[66]	3₂₁ {3,3,3,3^2,1} ^[67]
x3o3o b3o3o3o3o . . . . . . . \| 64 ♦ 21 \| 105 \| 35 140 \| 35 105 \| 21 42 \| 7 7 -----------------+----+-----+------+----------+----------+--------+------ x . . . . . . \| 2 \| 672 ♦ 10 \| 5 20 \| 10 20 \| 10 10 \| 5 2 -----------------+----+-----+------+----------+----------+--------+------ x3o . . . . . \| 3 \| 3 \| 2240 \| 1 4 \| 4 6 \| 6 4 \| 4 1 -----------------+----+-----+------+----------+----------+--------+------ x3o3o . . . . ♦ 4 \| 6 \| 4 \| 560 ♦ 4 0 \| 6 0 \| 4 0 x3o . b3o . . . ♦ 4 \| 6 \| 4 \| 2240 \| 1 3 \| 3 3 \| 3 1 -----------------+----+-----+------+----------+----------+--------+------ x3o3o b3o . . . ♦ 8 \| 24 \| 32 \| 8 8 \| 280 \| 3 0 \| 3 0 x3o . b3o3o . . ♦ 5 \| 10 \| 10 \| 0 5 \| 1344 \| 1 2 \| 2 1 -----------------+----+-----+------+----------+----------+--------+------ x3o3o b3o3o . . ♦ 16 \| 80 \| 160 \| 40 80 \| 10 16 \| 84 \| 2 0 x3o . b3o3o3o . ♦ 6 \| 15 \| 20 \| 0 15 \| 0 6 \| 448 \| 1 1 -----------------+----+-----+------+----------+----------+--------+------ x3o3o b3o3o3o . ♦ 32 \| 240 \| 640 \| 160 480 \| 60 192 \| 12 32 \| 14 x3o . b3o3o3o3o ♦ 7 \| 21 \| 35 \| 0 35 \| 0 21 \| 0 7 \| 64	o3o3o3o c3o3o3x . . . . . . . \| 56 ♦ 27 \| 216 \| 720 \| 1080 \| 432 216 \| 72 27 -----------------+----+-----+------+-------+-------+-----------+-------- . . . . . . x \| 2 \| 756 ♦ 16 \| 80 \| 160 \| 80 40 \| 16 10 -----------------+----+-----+------+-------+-------+-----------+-------- . . . . . o3x \| 3 \| 3 \| 4032 ♦ 10 \| 30 \| 20 10 \| 5 5 -----------------+----+-----+------+-------+-------+-----------+-------- . . . . o3o3x ♦ 4 \| 6 \| 4 \| 10080 ♦ 6 \| 6 3 \| 2 3 -----------------+----+-----+------+-------+-------+-----------+-------- . . o . c3o3o3x ♦ 5 \| 10 \| 10 \| 5 \| 12096 \| 2 1 \| 1 2 -----------------+----+-----+------+-------+-------+-----------+-------- . o3o . c3o3o3x ♦ 6 \| 15 \| 20 \| 15 \| 6 \| 4032 \| 1 1 . . o3o c3o3o3x ♦ 6 \| 15 \| 20 \| 15 \| 6 \| 2016 \| 0 2 -----------------+----+-----+------+-------+-------+-----------+-------- o3o3o . c3o3o3x ♦ 7 \| 21 \| 35 \| 35 \| 21 \| 10 0 \| 576 . o3o3o c3o3o3x ♦ 12 \| 60 \| 160 \| 240 \| 192 \| 32 32 \| 126
2₃₁ {3,3,3^3,1} ^[68]	1₃₂ {3,3^3,2} ^[69]
x3o3o3o c3o3o3o . . . . . . . \| 126 ♦ 32 \| 240 \| 640 \| 160 480 \| 60 192 \| 12 32 -----------------+-----+------+-------+-------+------------+----------+------- x . . . . . . \| 2 \| 2016 ♦ 15 \| 60 \| 20 60 \| 15 30 \| 6 6 -----------------+-----+------+-------+-------+------------+----------+------- x3o . . . . . \| 3 \| 3 \| 10080 ♦ 8 \| 4 12 \| 6 8 \| 4 2 -----------------+-----+------+-------+-------+------------+----------+------- x3o3o . . . . ♦ 4 \| 6 \| 4 \| 20160 \| 1 3 \| 3 3 \| 3 1 -----------------+-----+------+-------+-------+------------+----------+------- x3o3o3o . . . ♦ 5 \| 10 \| 10 \| 5 \| 4032 \| 3 0 \| 3 0 x3o3o . c3o . . ♦ 5 \| 10 \| 10 \| 5 \| 12096 \| 1 2 \| 2 1 -----------------+-----+------+-------+-------+------------+----------+------- x3o3o3o c3o . . ♦ 10 \| 40 \| 80 \| 80 \| 16 16 \| 756 \| 2 0 x3o3o . c3o3o . ♦ 6 \| 15 \| 20 \| 15 \| 0 6 \| 4032 \| 1 1 -----------------+-----+------+-------+-------+------------+----------+------- x3o3o3o c3o3o . ♦ 27 \| 216 \| 720 \| 1080 \| 216 432 \| 27 72 \| 56 x3o3o . c3o3o3o ♦ 7 \| 21 \| 35 \| 35 \| 0 21 \| 0 7 \| 576	o3o3o3x c3o3o3o . . . . . . . \| 576 ♦ 35 \| 210 \| 140 210 \| 35 105 105 \| 21 42 21 \| 7 7 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- . . . x . . . \| 2 \| 10080 ♦ 12 \| 12 18 \| 4 12 12 \| 6 12 3 \| 4 3 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- . . o3x . . . \| 3 \| 3 \| 40320 \| 2 3 \| 1 6 3 \| 3 6 1 \| 3 2 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- . o3o3x . . . ♦ 4 \| 6 \| 4 \| 20160 \| 1 3 0 \| 3 3 0 \| 3 1 . . o3x c3o . . ♦ 4 \| 6 \| 4 \| 30240 \| 0 2 2 \| 1 4 1 \| 2 2 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- o3o3o3x . . . ♦ 5 \| 10 \| 10 \| 5 0 \| 4032 * * \| 3 0 0 \| 3 0 . o3o3x c3o . . ♦ 8 \| 24 \| 32 \| 8 8 \| 7560 * \| 1 2 0 \| 2 1 . . o3x c3o3o . ♦ 5 \| 10 \| 10 \| 0 5 \| * 12096 \| 0 2 1 \| 1 2 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- o3o3o3x c3o . . ♦ 16 \| 80 \| 160 \| 80 40 \| 16 10 0 \| 756 * \| 2 0 . o3o3x c3o3o . ♦ 16 \| 80 \| 160 \| 40 80 \| 0 10 16 \| 1512 * \| 1 1 . . o3x c3o3o3o ♦ 6 \| 15 \| 20 \| 0 15 \| 0 0 6 \| * 2016 \| 0 2 -----------------+-----+-------+-------+-------------+-----------------+---------------+------- o3o3o3x c3o3o . ♦ 72 \| 720 \| 2160 \| 1080 1080 \| 216 270 216 \| 27 27 0 \| 56 . o3o3x c3o3o3o ♦ 32 \| 240 \| 640 \| 160 480 \| 0 60 192 \| 0 12 32 \| 126
0₅₁ r{3,3,3,3,3,3} ^[70]	0₄₂ 2r{3,3,3,3,3,3} ^[71]
o3x3o3o3o3o3o - roc . . . . . . . \| 28 ♦ 12 \| 6 30 \| 15 40 \| 20 30 \| 15 12 \| 6 2 --------------+----+-----+--------+--------+--------+-------+---- . x . . . . . \| 2 \| 168 \| 1 5 \| 5 10 \| 10 10 \| 10 5 \| 5 1 --------------+----+-----+--------+--------+--------+-------+---- o3x . . . . . \| 3 \| 3 \| 56 * ♦ 5 0 \| 10 0 \| 10 0 \| 5 0 . x3o . . . . \| 3 \| 3 \| * 280 \| 1 4 \| 4 6 \| 6 4 \| 4 1 --------------+----+-----+--------+--------+--------+-------+---- o3x3o . . . . ♦ 6 \| 12 \| 4 4 \| 70 * ♦ 4 0 \| 6 0 \| 4 0 . x3o3o . . . ♦ 4 \| 6 \| 0 4 \| * 280 \| 1 3 \| 3 3 \| 3 1 --------------+----+-----+--------+--------+--------+-------+---- o3x3o3o . . . ♦ 10 \| 30 \| 10 20 \| 5 5 \| 56 * \| 3 0 \| 3 0 . x3o3o3o . . ♦ 5 \| 10 \| 0 10 \| 0 5 \| * 168 \| 1 2 \| 2 1 --------------+----+-----+--------+--------+--------+-------+---- o3x3o3o3o . . ♦ 15 \| 60 \| 20 60 \| 15 30 \| 6 6 \| 28 * \| 2 0 . x3o3o3o3o . ♦ 6 \| 15 \| 0 20 \| 0 15 \| 0 6 \| * 56 \| 1 1 --------------+----+-----+--------+--------+--------+-------+---- o3x3o3o3o3o . ♦ 21 \| 105 \| 35 140 \| 35 105 \| 21 42 \| 7 7 \| 8 * . x3o3o3o3o3o ♦ 7 \| 21 \| 0 35 \| 0 35 \| 0 21 \| 0 7 \| * 8	o3o3x3o3o3o3o - broc . . . . . . . \| 56 ♦ 15 \| 15 30 \| 5 30 30 \| 10 30 15 \| 10 15 3 \| 5 3 --------------+----+-----+---------+------------+------------+----------+---- . . x . . . . \| 2 \| 420 \| 2 4 \| 1 8 6 \| 4 12 4 \| 6 8 1 \| 4 2 --------------+----+-----+---------+------------+------------+----------+---- . o3x . . . . \| 3 \| 3 \| 280 * \| 1 4 0 \| 4 6 0 \| 6 4 0 \| 4 1 . . x3o . . . \| 3 \| 3 \| * 560 \| 0 2 3 \| 1 6 3 \| 3 6 1 \| 3 2 --------------+----+-----+---------+------------+------------+----------+---- o3o3x . . . . ♦ 4 \| 6 \| 4 0 \| 70 * * ♦ 4 0 0 \| 6 0 0 \| 4 0 . o3x3o . . . ♦ 6 \| 12 \| 4 4 \| * 280 * \| 1 3 0 \| 3 3 0 \| 3 1 . . x3o3o . . ♦ 4 \| 6 \| 0 4 \| * * 420 \| 0 2 2 \| 1 4 1 \| 2 2 --------------+----+-----+---------+------------+------------+----------+---- o3o3x3o . . . ♦ 10 \| 30 \| 20 10 \| 5 5 0 \| 56 * * \| 3 0 0 \| 3 0 . o3x3o3o . . ♦ 10 \| 30 \| 10 20 \| 0 5 5 \| * 168 * \| 1 2 0 \| 2 1 . . x3o3o3o . ♦ 5 \| 10 \| 0 10 \| 0 0 5 \| * * 168 \| 0 2 1 \| 1 2 --------------+----+-----+---------+------------+------------+----------+---- o3o3x3o3o . . ♦ 20 \| 90 \| 60 60 \| 15 30 15 \| 6 6 0 \| 28 * * \| 2 0 . o3x3o3o3o . ♦ 15 \| 60 \| 20 60 \| 0 15 30 \| 0 6 6 \| * 56 * \| 1 1 . . x3o3o3o3o ♦ 6 \| 15 \| 0 20 \| 0 0 15 \| 0 0 6 \| * * 28 \| 0 2 --------------+----+-----+---------+------------+------------+----------+---- o3o3x3o3o3o . ♦ 35 \| 210 \| 140 210 \| 35 105 105 \| 21 42 21 \| 7 7 0 \| 8 * . o3x3o3o3o3o ♦ 21 \| 105 \| 35 140 \| 0 35 105 \| 0 21 42 \| 0 7 7 \| * 8
0₃₃ 3r{3,3,3,3,3,3} ^[72]
o3o3o3x3o3o3o - he . . . . . . . \| 70 ♦ 16 \| 24 24 \| 16 36 16 \| 4 24 24 4 \| 6 16 6 \| 4 4 --------------+----+-----+---------+-------------+---------------+----------+---- . . . x . . . \| 2 \| 560 \| 3 3 \| 3 9 3 \| 1 9 9 1 \| 3 9 3 \| 3 3 --------------+----+-----+---------+-------------+---------------+----------+---- . . o3x . . . \| 3 \| 3 \| 560 * \| 2 3 0 \| 1 6 3 0 \| 3 6 1 \| 3 2 . . . x3o . . \| 3 \| 3 \| * 560 \| 0 3 2 \| 0 3 6 1 \| 1 6 3 \| 2 3 --------------+----+-----+---------+-------------+---------------+----------+---- . o3o3x . . . ♦ 4 \| 6 \| 4 0 \| 280 * * \| 1 3 0 0 \| 3 3 0 \| 3 1 . . o3x3o . . ♦ 6 \| 12 \| 4 4 \| * 420 * \| 0 2 2 0 \| 1 4 1 \| 2 2 . . . x3o3o . ♦ 4 \| 6 \| 0 4 \| * * 280 \| 0 0 3 1 \| 0 3 3 \| 1 3 --------------+----+-----+---------+-------------+---------------+----------+---- o3o3o3x . . . ♦ 5 \| 10 \| 10 0 \| 5 0 0 \| 56 * * * \| 3 0 0 \| 3 0 . o3o3x3o . . ♦ 10 \| 30 \| 20 10 \| 5 5 0 \| * 168 * * \| 1 2 0 \| 2 1 . . o3x3o3o . ♦ 10 \| 30 \| 10 20 \| 0 5 5 \| * * 168 * \| 0 2 1 \| 1 2 . . . x3o3o3o ♦ 5 \| 10 \| 0 10 \| 0 0 5 \| * * * 56 \| 0 0 3 \| 0 3 --------------+----+-----+---------+-------------+---------------+----------+---- o3o3o3x3o . . ♦ 15 \| 60 \| 60 20 \| 30 15 0 \| 6 6 0 0 \| 28 * * \| 2 0 . o3o3x3o3o . ♦ 20 \| 90 \| 60 60 \| 15 30 15 \| 0 6 6 0 \| * 56 * \| 1 1 . . o3x3o3o3o ♦ 15 \| 60 \| 20 60 \| 0 15 30 \| 0 0 6 6 \| * * 28 \| 0 2 --------------+----+-----+---------+-------------+---------------+----------+---- o3o3o3x3o3o . ♦ 35 \| 210 \| 210 140 \| 105 105 35 \| 21 42 21 0 \| 7 7 0 \| 8 * . o3o3x3o3o3o ♦ 35 \| 210 \| 140 210 \| 35 105 105 \| 0 21 42 21 \| 0 7 7 \| * 8
0₃₂₁ r{3,3^3,2} ^[73]
o3o3x3o c3o3o3o - rolin . . . . . . . \| 10080 ♦ 24 \| 24 12 36 \| 8 12 36 18 24 \| 4 12 18 24 12 6 \| 6 8 12 6 3 \| 4 2 3 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- . . x . . . . \| 2 \| 120960 \| 2 1 3 \| 1 2 6 3 3 \| 1 3 6 6 3 1 \| 3 3 6 2 1 \| 3 1 2 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- . o3x . . . . \| 3 \| 3 \| 80640 * \| 1 1 3 0 0 \| 1 3 3 3 0 0 \| 3 3 3 1 0 \| 3 1 1 . . x3o . . . \| 3 \| 3 \| * 40320 * \| 0 2 0 3 0 \| 1 0 6 0 3 0 \| 3 0 6 0 1 \| 3 0 2 . . x . c3o . . \| 3 \| 3 \| * 120960 \| 0 0 2 1 2 \| 0 1 2 4 2 1 \| 1 2 4 2 1 \| 2 1 2 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- o3o3x . . . . ♦ 4 \| 6 \| 4 0 0 \| 20160 * * * * \| 1 3 0 0 0 0 \| 3 3 0 0 0 \| 3 1 0 . o3x3o . . . ♦ 6 \| 12 \| 4 4 0 \| * 20160 * * * \| 1 0 3 0 0 0 \| 3 0 3 0 0 \| 3 0 1 . o3x . c3o . . ♦ 6 \| 12 \| 4 0 4 \| * 60480 * * \| 0 1 1 2 0 0 \| 1 2 2 1 0 \| 2 1 1 . . x3o c3o . . ♦ 6 \| 12 \| 0 4 4 \| * * 30240 * \| 0 0 2 0 2 0 \| 1 0 4 0 1 \| 2 0 2 . . x . c3o3o . ♦ 4 \| 6 \| 0 0 4 \| * * * 60480 \| 0 0 0 2 1 1 \| 0 1 2 2 1 \| 1 1 2 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- o3o3x3o . . . ♦ 10 \| 30 \| 20 10 0 \| 5 5 0 0 0 \| 4032 * * * * * \| 3 0 0 0 0 \| 3 0 0 o3o3x . c3o . . ♦ 10 \| 30 \| 20 0 10 \| 5 0 5 0 0 \| 12096 * * * * \| 1 2 0 0 0 \| 2 1 0 . o3x3o c3o . . ♦ 24 \| 96 \| 32 32 32 \| 0 8 8 8 0 \| * 7560 * * * \| 1 0 2 0 0 \| 2 0 1 . o3x . c3o3o . ♦ 10 \| 30 \| 10 0 20 \| 0 0 5 0 5 \| * * 24192 * * \| 0 1 1 1 0 \| 1 1 1 . . x3o c3o3o . ♦ 10 \| 30 \| 0 10 20 \| 0 0 0 5 5 \| * * * 12096 * \| 0 0 2 0 1 \| 1 0 2 . . x . c3o3o3o ♦ 5 \| 10 \| 0 0 10 \| 0 0 0 0 5 \| * * * * 12096 \| 0 0 0 2 1 \| 0 1 2 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- o3o3x3o c3o . . ♦ 80 \| 480 \| 320 160 160 \| 80 80 80 40 0 \| 16 16 10 0 0 0 \| 756 * * * \| 2 0 0 o3o3x . c3o3o . ♦ 20 \| 90 \| 60 0 60 \| 15 0 30 0 15 \| 0 6 0 6 0 0 \| 4032 * * * \| 1 1 0 . o3x3o c3o3o . ♦ 80 \| 480 \| 160 160 320 \| 0 40 80 80 80 \| 0 0 10 16 16 0 \| * 1512 * * \| 1 0 1 . o3x . c3o3o3o ♦ 15 \| 60 \| 20 0 60 \| 0 0 15 0 30 \| 0 0 0 6 0 6 \| * * 4032 * \| 0 1 1 . . x3o c3o3o3o ♦ 15 \| 60 \| 0 20 60 \| 0 0 0 15 30 \| 0 0 0 0 6 6 \| * * * 2016 \| 0 0 2 -----------------+-------+--------+--------------------+-------------------------------+-----------------------------------+-------------------------+----------- o3o3x3o c3o3o . ♦ 720 \| 6480 \| 4320 2160 4320 \| 1080 1080 2160 1080 1080 \| 216 432 270 432 216 0 \| 27 72 27 0 0 \| 56 * o3o3x . c3o3o3o ♦ 35 \| 210 \| 140 0 210 \| 35 0 105 0 105 \| 0 21 0 42 0 21 \| 0 7 0 7 0 \| 576 * . o3x3o c3o3o3o ♦ 240 \| 1920 \| 640 640 1920 \| 0 160 480 480 960 \| 0 0 60 192 192 192 \| 0 0 12 32 32 \| * 126

8D edit

8D regular

8-simplex {3,3,3,3,3,3,3} ^[74]

8-orthoplex {3,3,3,3,3,3,4} ^[75]

8-cube {4,3,3,3,3,3,3} ^[76]

x3o3o3o3o3o3o3o
. . . . . . . . | 9 ♦  8 | 28 |  56 |  70 | 56 | 28 | 8
----------------+---+----+----+-----+-----+----+----+--
x . . . . . . . | 2 | 36 ♦  7 |  21 |  35 | 35 | 21 | 7
----------------+---+----+----+-----+-----+----+----+--
x3o . . . . . . | 3 |  3 | 84 ♦   6 |  15 | 20 | 15 | 6
----------------+---+----+----+-----+-----+----+----+--
x3o3o . . . . . ♦ 4 |  6 |  4 | 126 ♦   5 | 10 | 10 | 5
----------------+---+----+----+-----+-----+----+----+--
x3o3o3o . . . . ♦ 5 | 10 | 10 |   5 | 126 ♦  4 |  6 | 4
----------------+---+----+----+-----+-----+----+----+--
x3o3o3o3o . . . ♦ 6 | 15 | 20 |  15 |   6 | 84 |  3 | 3
----------------+---+----+----+-----+-----+----+----+--
x3o3o3o3o3o . . ♦ 7 | 21 | 35 |  35 |  21 |  7 | 36 | 2
----------------+---+----+----+-----+-----+----+----+--
x3o3o3o3o3o3o . ♦ 8 | 28 | 56 |  70 |  56 | 28 |  8 | 9

x3o3o3o3o3o3o4o
. . . . . . . . | 16 ♦  14 |  84 |  280 |  560 |  672 |  448 | 128
----------------+----+-----+-----+------+------+------+------+----
x . . . . . . . |  2 | 112 ♦  12 |   60 |  160 |  240 |  192 |  64
----------------+----+-----+-----+------+------+------+------+----
x3o . . . . . . |  3 |   3 | 448 ♦   10 |   40 |   80 |   80 |  32
----------------+----+-----+-----+------+------+------+------+----
x3o3o . . . . . ♦  4 |   6 |   4 | 1120 ♦    8 |   24 |   32 |  16
----------------+----+-----+-----+------+------+------+------+----
x3o3o3o . . . . ♦  5 |  10 |  10 |    5 | 1792 ♦    6 |   12 |   8
----------------+----+-----+-----+------+------+------+------+----
x3o3o3o3o . . . ♦  6 |  15 |  20 |   15 |    6 | 1792 |    4 |   4
----------------+----+-----+-----+------+------+------+------+----
x3o3o3o3o3o . . ♦  7 |  21 |  35 |   35 |   21 |    7 | 1024 |   2
----------------+----+-----+-----+------+------+------+------+----
x3o3o3o3o3o3o . ♦  8 |  28 |  56 |   70 |   56 |   28 |    8 | 256

o3o3o3o3o3o3o4x
. . . . . . . . | 256 ♦    8 |   28 |   56 |   70 |  56 |  28 |  8
----------------+-----+------+------+------+------+-----+-----+---
. . . . . . . x |   2 | 1024 ♦    7 |   21 |   35 |  35 |  21 |  7
----------------+-----+------+------+------+------+-----+-----+---
. . . . . . o4x |   4 |    4 | 1792 ♦    6 |   15 |  20 |  15 |  6
----------------+-----+------+------+------+------+-----+-----+---
. . . . . o3o4x ♦   8 |   12 |    6 | 1792 ♦    5 |  10 |  10 |  5
----------------+-----+------+------+------+------+-----+-----+---
. . . . o3o3o4x ♦  16 |   32 |   24 |    8 | 1120 ♦   4 |   6 |  4
----------------+-----+------+------+------+------+-----+-----+---
. . . o3o3o3o4x ♦  32 |   80 |   80 |   40 |   10 | 448 |   3 |  3
----------------+-----+------+------+------+------+-----+-----+---
. . o3o3o3o3o4x ♦  64 |  192 |  240 |  160 |   60 |  12 | 112 |  2
----------------+-----+------+------+------+------+-----+-----+---
. o3o3o3o3o3o4x ♦ 128 |  448 |  672 |  560 |  280 |  84 |  14 | 16

Uniform 8D edit

8-demicube h{4,3,3,3,3,3,3} ^[77]	4₂₁ {3,3,3,3,3^2,1} ^[78]
x3o3o b3o3o3o3o3o . . . . . . . . \| 128 ♦ 28 \| 168 \| 56 280 \| 70 280 \| 56 168 \| 28 56 \| 8 8 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x . . . . . . . \| 2 \| 1792 ♦ 12 \| 6 30 \| 15 40 \| 20 30 \| 15 12 \| 6 2 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o . . . . . . \| 3 \| 3 \| 7168 \| 1 5 \| 5 10 \| 10 10 \| 10 5 \| 5 1 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o3o . . . . . ♦ 4 \| 6 \| 4 \| 1792 ♦ 5 0 \| 10 0 \| 10 0 \| 5 0 x3o . b3o . . . . ♦ 4 \| 6 \| 4 \| 8960 \| 1 4 \| 4 6 \| 6 4 \| 4 1 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o3o b3o . . . . ♦ 8 \| 24 \| 32 \| 8 8 \| 1120 ♦ 4 0 \| 6 0 \| 4 0 x3o . b3o3o . . . ♦ 5 \| 10 \| 10 \| 0 5 \| 7168 \| 1 3 \| 3 3 \| 3 1 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o3o b3o3o . . . ♦ 16 \| 80 \| 160 \| 40 80 \| 10 16 \| 448 \| 3 0 \| 3 0 x3o . b3o3o3o . . ♦ 6 \| 15 \| 20 \| 0 15 \| 0 6 \| 3584 \| 1 2 \| 2 1 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o3o b3o3o3o . . ♦ 32 \| 240 \| 640 \| 160 480 \| 60 192 \| 12 32 \| 112 \| 2 0 x3o . b3o3o3o3o . ♦ 7 \| 21 \| 35 \| 0 35 \| 0 21 \| 0 7 \| 1024 \| 1 1 -------------------+-----+------+------+-----------+-----------+----------+----------+------- x3o3o b3o3o3o3o . ♦ 64 \| 672 \| 2240 \| 560 2240 \| 280 1344 \| 84 448 \| 14 64 \| 16 x3o . b3o3o3o3o3o ♦ 8 \| 28 \| 56 \| 0 70 \| 0 56 \| 0 28 \| 0 8 \| 128	o3o3o3o c3o3o3o3x . . . . . . . . \| 240 ♦ 56 \| 756 \| 4032 \| 10080 \| 12096 \| 4032 2016 \| 576 126 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . . . . . . . x \| 2 \| 6720 ♦ 27 \| 216 \| 720 \| 1080 \| 432 216 \| 72 27 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . . . . . . o3x \| 3 \| 3 \| 60480 ♦ 16 \| 80 \| 160 \| 80 40 \| 16 10 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . . . . . o3o3x ♦ 4 \| 6 \| 4 \| 241920 ♦ 10 \| 30 \| 20 10 \| 5 5 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . . . . o3o3o3x ♦ 5 \| 10 \| 10 \| 5 \| 483840 ♦ 6 \| 6 3 \| 2 3 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . . o . c3o3o3o3x ♦ 6 \| 15 \| 20 \| 15 \| 6 \| 483840 \| 2 1 \| 1 2 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- . o3o . c3o3o3o3x ♦ 7 \| 21 \| 35 \| 35 \| 21 \| 7 \| 138240 \| 1 1 . . o3o c3o3o3o3x ♦ 7 \| 21 \| 35 \| 35 \| 21 \| 7 \| 69120 \| 0 2 -------------------+-----+------+-------+--------+--------+--------+--------------+----------- o3o3o . c3o3o3o3x ♦ 8 \| 28 \| 56 \| 70 \| 56 \| 28 \| 8 0 \| 17280 . o3o3o c3o3o3o3x ♦ 14 \| 84 \| 280 \| 560 \| 672 \| 448 \| 64 64 \| 2160
2₄₁ {3,3,3^4,1} ^[79]	1₄₂ {3,3^4,2} ^[80]
x3o3o3o c3o3o3o3o . . . . . . . . \| 2160 ♦ 64 \| 672 \| 2240 \| 560 2240 \| 280 1344 \| 84 448 \| 14 64 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x . . . . . . . \| 2 \| 69120 ♦ 21 \| 105 \| 35 140 \| 35 105 \| 21 42 \| 7 7 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o . . . . . . \| 3 \| 3 \| 483840 ♦ 10 \| 5 20 \| 10 20 \| 10 10 \| 5 2 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o3o . . . . . ♦ 4 \| 6 \| 4 \| 1209600 \| 1 4 \| 4 6 \| 6 4 \| 4 1 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o3o3o . . . . ♦ 5 \| 10 \| 10 \| 5 \| 241920 \| 4 0 \| 6 0 \| 4 0 x3o3o . c3o . . . ♦ 5 \| 10 \| 10 \| 5 \| 967680 \| 1 3 \| 3 3 \| 3 1 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o3o3o c3o . . . ♦ 10 \| 40 \| 80 \| 80 \| 16 16 \| 60480 \| 3 0 \| 3 0 x3o3o . c3o3o . . ♦ 6 \| 15 \| 20 \| 15 \| 0 6 \| 483840 \| 1 2 \| 2 1 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o3o3o c3o3o . . ♦ 27 \| 216 \| 720 \| 1080 \| 216 432 \| 27 72 \| 6720 \| 2 0 x3o3o . c3o3o3o . ♦ 7 \| 21 \| 35 \| 35 \| 0 21 \| 0 7 \| 138240 \| 1 1 -------------------+------+-------+--------+---------+---------------+--------------+-------------+--------- x3o3o3o c3o3o3o . ♦ 126 \| 2016 \| 10080 \| 20160 \| 4032 12096 \| 756 4032 \| 56 576 \| 240 x3o3o . c3o3o3o3o ♦ 8 \| 28 \| 56 \| 70 \| 0 56 \| 0 28 \| 0 8 \| 17280	o3o3o3x c3o3o3o3o . . . . . . . . \| 17280 ♦ 56 \| 420 \| 280 560 \| 70 280 420 \| 56 168 168 \| 28 56 28 \| 8 8 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- . . . x . . . . \| 2 \| 483840 ♦ 15 \| 15 30 \| 5 30 30 \| 10 30 15 \| 10 15 3 \| 5 3 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- . . o3x . . . . \| 3 \| 3 \| 2419200 \| 2 4 \| 1 8 6 \| 4 12 4 \| 6 8 1 \| 4 2 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- . o3o3x . . . . ♦ 4 \| 6 \| 4 \| 1209600 \| 1 4 0 \| 4 6 0 \| 6 4 0 \| 4 1 . . o3x c3o . . . ♦ 4 \| 6 \| 4 \| 2419200 \| 0 2 3 \| 1 6 3 \| 3 6 1 \| 3 2 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- o3o3o3x . . . . ♦ 5 \| 10 \| 10 \| 5 0 \| 241920 * * \| 4 0 0 \| 6 0 0 \| 4 0 . o3o3x c3o . . . ♦ 8 \| 24 \| 32 \| 8 8 \| 604800 * \| 1 3 0 \| 3 3 0 \| 3 1 . . o3x c3o3o . . ♦ 5 \| 10 \| 10 \| 0 5 \| * 1451520 \| 0 2 2 \| 1 4 1 \| 2 2 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- o3o3o3x c3o . . . ♦ 16 \| 80 \| 160 \| 80 40 \| 16 10 0 \| 60480 * \| 3 0 0 \| 3 0 . o3o3x c3o3o . . ♦ 16 \| 80 \| 160 \| 40 80 \| 0 10 16 \| 181440 * \| 1 2 0 \| 2 1 . . o3x c3o3o3o . ♦ 6 \| 15 \| 20 \| 0 15 \| 0 0 6 \| * 483840 \| 0 2 1 \| 1 2 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- o3o3o3x c3o3o . . ♦ 72 \| 720 \| 2160 \| 1080 1080 \| 216 270 216 \| 27 27 0 \| 6720 * \| 2 0 . o3o3x c3o3o3o . ♦ 32 \| 240 \| 640 \| 160 480 \| 0 60 192 \| 0 12 32 \| 30240 * \| 1 1 . . o3x c3o3o3o3o ♦ 7 \| 21 \| 35 \| 0 35 \| 0 0 21 \| 0 0 7 \| * 69120 \| 0 2 -------------------+-------+--------+---------+-----------------+------------------------+---------------------+------------------+--------- o3o3o3x c3o3o3o . ♦ 576 \| 10080 \| 40320 \| 20160 30240 \| 4032 7560 12096 \| 756 1512 2016 \| 56 126 0 \| 240 . o3o3x c3o3o3o3o ♦ 64 \| 672 \| 2240 \| 560 2240 \| 0 280 1344 \| 0 84 448 \| 0 14 64 \| 2160
0₆₁ r{3,3,3,3,3,3,3} ^[81]	0₅₂ 2r{3,3,3,3,3,3,3} ^[82]
o3x3o3o3o3o3o3o - rene . . . . . . . . \| 36 ♦ 14 \| 7 42 \| 21 70 \| 35 70 \| 35 42 \| 21 14 \| 7 2 ----------------+----+-----+--------+---------+---------+--------+-------+---- . x . . . . . . \| 2 \| 252 \| 1 6 \| 6 15 \| 15 20 \| 20 15 \| 15 6 \| 6 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x . . . . . . \| 3 \| 3 \| 84 * ♦ 6 0 \| 15 0 \| 20 0 \| 15 0 \| 6 0 . x3o . . . . . \| 3 \| 3 \| * 504 \| 1 5 \| 5 10 \| 10 10 \| 10 5 \| 5 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x3o . . . . . ♦ 6 \| 12 \| 4 4 \| 126 * ♦ 5 0 \| 10 0 \| 10 0 \| 5 0 . x3o3o . . . . ♦ 4 \| 6 \| 0 4 \| * 630 \| 1 4 \| 4 6 \| 6 4 \| 4 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x3o3o . . . . ♦ 10 \| 30 \| 10 20 \| 5 5 \| 126 * ♦ 4 0 \| 6 0 \| 4 0 . x3o3o3o . . . ♦ 5 \| 10 \| 0 10 \| 0 5 \| * 504 \| 1 3 \| 3 3 \| 3 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x3o3o3o . . . ♦ 15 \| 60 \| 20 60 \| 15 30 \| 6 6 \| 84 * \| 3 0 \| 3 0 . x3o3o3o3o . . ♦ 6 \| 15 \| 0 20 \| 0 15 \| 0 6 \| * 252 \| 1 2 \| 2 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x3o3o3o3o . . ♦ 21 \| 105 \| 35 140 \| 35 105 \| 21 42 \| 7 7 \| 36 * \| 2 0 . x3o3o3o3o3o . ♦ 7 \| 21 \| 0 35 \| 0 35 \| 0 21 \| 0 7 \| * 72 \| 1 1 ----------------+----+-----+--------+---------+---------+--------+-------+---- o3x3o3o3o3o3o . ♦ 28 \| 168 \| 56 280 \| 70 280 \| 56 168 \| 28 56 \| 8 8 \| 9 * . x3o3o3o3o3o3o ♦ 8 \| 28 \| 0 56 \| 0 70 \| 0 56 \| 0 28 \| 0 8 \| * 9	o3o3x3o3o3o3o3o - brene . . . . . . . . \| 84 ♦ 18 \| 18 45 \| 6 45 60 \| 15 60 45 \| 20 45 18 \| 15 18 3 \| 6 3 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- . . x . . . . . \| 2 \| 756 \| 2 5 \| 1 10 10 \| 5 20 10 \| 10 20 5 \| 10 10 1 \| 5 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- . o3x . . . . . \| 3 \| 3 \| 504 * \| 1 5 0 \| 5 10 0 \| 10 10 0 \| 10 5 0 \| 5 1 . . x3o . . . . \| 3 \| 3 \| * 1260 \| 0 2 4 \| 1 8 6 \| 6 12 4 \| 6 8 1 \| 4 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- o3o3x . . . . . ♦ 4 \| 6 \| 4 0 \| 126 * * ♦ 5 0 0 \| 10 0 0 \| 10 0 0 \| 5 0 . o3x3o . . . . ♦ 6 \| 12 \| 4 4 \| * 630 * \| 1 4 0 \| 4 6 0 \| 6 4 0 \| 4 1 . . x3o3o . . . ♦ 4 \| 6 \| 0 4 \| * * 1260 \| 0 2 3 \| 1 6 3 \| 3 6 1 \| 3 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- o3o3x3o . . . . ♦ 10 \| 30 \| 20 10 \| 5 5 0 \| 126 * * ♦ 4 0 0 \| 6 0 0 \| 4 0 . o3x3o3o . . . ♦ 10 \| 30 \| 10 20 \| 0 5 5 \| * 504 * \| 1 3 0 \| 3 3 0 \| 3 1 . . x3o3o3o . . ♦ 5 \| 10 \| 0 10 \| 0 0 5 \| * * 756 \| 0 2 2 \| 1 4 1 \| 2 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- o3o3x3o3o . . . ♦ 20 \| 90 \| 60 60 \| 15 30 15 \| 6 6 0 \| 84 * * \| 3 0 0 \| 3 0 . o3x3o3o3o . . ♦ 15 \| 60 \| 20 60 \| 0 15 30 \| 0 6 6 \| * 252 * \| 1 2 0 \| 2 1 . . x3o3o3o3o . ♦ 6 \| 15 \| 0 20 \| 0 0 15 \| 0 0 6 \| * * 252 \| 0 2 1 \| 1 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- o3o3x3o3o3o . . ♦ 35 \| 210 \| 140 210 \| 35 105 105 \| 21 42 21 \| 7 7 0 \| 36 * * \| 2 0 . o3x3o3o3o3o . ♦ 21 \| 105 \| 35 140 \| 0 35 105 \| 0 21 42 \| 0 7 7 \| * 72 * \| 1 1 . . x3o3o3o3o3o ♦ 7 \| 21 \| 0 35 \| 0 0 35 \| 0 0 21 \| 0 0 7 \| * * 36 \| 0 2 ----------------+----+-----+----------+--------------+-------------+------------+----------+---- o3o3x3o3o3o3o . ♦ 56 \| 420 \| 280 560 \| 70 280 420 \| 56 168 168 \| 28 56 28 \| 8 8 0 \| 9 * . o3x3o3o3o3o3o ♦ 28 \| 168 \| 56 280 \| 0 70 280 \| 0 56 168 \| 0 28 56 \| 0 8 8 \| * 9
0₄₃ 3r{3,3,3,3,3,3,3} ^[83]
o3o3o3x3o3o3o3o - trene . . . . . . . . \| 126 ♦ 20 \| 30 40 \| 20 60 40 \| 5 40 60 20 \| 10 40 30 4 \| 10 20 6 \| 5 4 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- . . . x . . . . \| 2 \| 1260 \| 3 4 \| 3 12 6 \| 1 12 18 4 \| 4 18 12 1 \| 6 12 3 \| 4 3 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- . . o3x . . . . \| 3 \| 3 \| 1260 * \| 2 4 0 \| 1 8 6 0 \| 4 12 4 0 \| 6 8 1 \| 4 2 . . . x3o . . . \| 3 \| 3 \| * 1680 \| 0 3 3 \| 0 3 9 3 \| 1 9 9 1 \| 3 9 3 \| 3 3 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- . o3o3x . . . . ♦ 4 \| 6 \| 4 0 \| 630 * * \| 1 4 0 0 \| 4 6 0 0 \| 6 4 0 \| 4 1 . . o3x3o . . . ♦ 6 \| 12 \| 4 4 \| * 1260 * \| 0 2 3 0 \| 1 6 3 0 \| 3 6 1 \| 3 2 . . . x3o3o . . ♦ 4 \| 6 \| 0 4 \| * * 1260 \| 0 0 3 2 \| 0 3 6 1 \| 1 6 3 \| 2 3 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- o3o3o3x . . . . ♦ 5 \| 10 \| 10 0 \| 5 0 0 \| 126 * * * ♦ 4 0 0 0 \| 6 0 0 \| 4 0 . o3o3x3o . . . ♦ 10 \| 30 \| 20 10 \| 5 5 0 \| * 504 * * \| 1 3 0 0 \| 3 3 0 \| 3 1 . . o3x3o3o . . ♦ 10 \| 30 \| 10 20 \| 0 5 5 \| * * 756 * \| 0 2 2 0 \| 1 4 1 \| 2 2 . . . x3o3o3o . ♦ 5 \| 10 \| 0 10 \| 0 0 5 \| * * * 504 \| 0 0 3 1 \| 0 3 3 \| 1 3 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- o3o3o3x3o . . . ♦ 15 \| 60 \| 60 20 \| 30 15 0 \| 6 6 0 0 \| 84 * * * \| 3 0 0 \| 3 0 . o3o3x3o3o . . ♦ 20 \| 90 \| 60 60 \| 15 30 15 \| 0 6 6 0 \| * 252 * * \| 1 2 0 \| 2 1 . . o3x3o3o3o . ♦ 15 \| 60 \| 20 60 \| 0 15 30 \| 0 0 6 6 \| * * 252 * \| 0 2 1 \| 1 2 . . . x3o3o3o3o ♦ 6 \| 15 \| 0 20 \| 0 0 15 \| 0 0 0 6 \| * * * 84 \| 0 0 3 \| 0 3 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- o3o3o3x3o3o . . ♦ 35 \| 210 \| 210 140 \| 105 105 35 \| 21 42 21 0 \| 7 7 0 0 \| 36 * * \| 2 0 . o3o3x3o3o3o . ♦ 35 \| 210 \| 140 210 \| 35 105 105 \| 0 21 42 21 \| 0 7 7 0 \| * 72 * \| 1 1 . . o3x3o3o3o3o ♦ 21 \| 105 \| 35 140 \| 0 35 105 \| 0 0 21 42 \| 0 0 7 7 \| * * 36 \| 0 2 ----------------+-----+------+-----------+---------------+-----------------+---------------+----------+---- o3o3o3x3o3o3o . ♦ 70 \| 560 \| 560 560 \| 280 420 280 \| 56 168 168 56 \| 28 56 28 0 \| 8 8 0 \| 9 * . o3o3x3o3o3o3o ♦ 56 \| 420 \| 280 560 \| 70 280 420 \| 0 56 168 168 \| 0 28 56 28 \| 0 8 8 \| * 9
0₄₂₁ r{3,3^4,2} ^[84]
o3o3x3o c3o3o3o3o - buffy . . . . . . . . \| 483840 ♦ 30 \| 30 15 60 \| 10 15 60 30 60 \| 5 20 30 60 30 30 \| 10 20 30 30 15 6 \| 10 10 15 6 3 \| 5 2 3 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- . . x . . . . . \| 2 \| 7257600 \| 2 1 4 \| 1 2 8 4 6 \| 1 4 8 12 6 4 \| 4 6 12 8 4 1 \| 6 4 8 2 1 \| 4 1 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- . o3x . . . . . \| 3 \| 3 \| 4838400 * \| 1 1 4 0 0 \| 1 4 4 6 0 0 \| 4 6 6 4 0 0 \| 6 4 4 1 0 \| 4 1 1 . . x3o . . . . \| 3 \| 3 \| * 2419200 * \| 0 2 0 4 0 \| 1 0 8 0 6 0 \| 4 0 12 0 4 0 \| 6 0 8 0 1 \| 4 0 2 . . x . c3o . . . \| 3 \| 3 \| * 9676800 \| 0 0 2 1 3 \| 0 1 2 6 3 3 \| 1 3 6 6 3 1 \| 3 3 6 2 1 \| 3 1 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- o3o3x . . . . . ♦ 4 \| 6 \| 4 0 0 \| 1209600 * * * * \| 1 4 0 0 0 0 \| 4 6 0 0 0 0 \| 6 4 0 0 0 \| 4 1 0 . o3x3o . . . . ♦ 6 \| 12 \| 4 4 0 \| * 1209600 * * * \| 1 0 4 0 0 0 \| 4 0 6 0 0 0 \| 6 0 4 0 0 \| 4 0 1 . o3x . c3o . . . ♦ 6 \| 12 \| 4 0 4 \| * 4838400 * * \| 0 1 1 3 0 0 \| 1 3 3 3 0 0 \| 3 3 3 1 0 \| 3 1 1 . . x3o c3o . . . ♦ 6 \| 12 \| 0 4 4 \| * * 2419200 * \| 0 0 2 0 3 0 \| 1 0 6 0 3 0 \| 3 0 6 0 1 \| 3 0 2 . . x . c3o3o . . ♦ 4 \| 6 \| 0 0 4 \| * * * 7257600 \| 0 0 0 2 1 2 \| 0 1 2 4 2 1 \| 1 2 4 2 1 \| 2 1 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- o3o3x3o . . . . ♦ 10 \| 30 \| 20 10 0 \| 5 5 0 0 0 \| 241920 * * * * * ♦ 4 0 0 0 0 0 \| 6 0 0 0 0 \| 4 0 0 o3o3x . c3o . . . ♦ 10 \| 30 \| 20 0 10 \| 5 0 5 0 0 \| 967680 * * * * \| 1 3 0 0 0 0 \| 3 3 0 0 0 \| 3 1 0 . o3x3o c3o . . . ♦ 24 \| 96 \| 32 32 32 \| 0 8 8 8 0 \| * 604800 * * * \| 1 0 3 0 0 0 \| 3 0 3 0 0 \| 3 0 1 . o3x . c3o3o . . ♦ 10 \| 30 \| 10 0 20 \| 0 0 5 0 5 \| * * 2903040 * * \| 0 1 1 2 0 0 \| 1 2 2 1 0 \| 2 1 1 . . x3o c3o3o . . ♦ 10 \| 30 \| 0 10 20 \| 0 0 0 5 5 \| * * * 1451520 * \| 0 0 2 0 2 0 \| 1 0 4 0 1 \| 2 0 2 . . x . c3o3o3o . ♦ 5 \| 10 \| 0 0 10 \| 0 0 0 0 5 \| * * * * 2903040 \| 0 0 0 2 1 1 \| 0 1 2 2 1 \| 1 1 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- o3o3x3o c3o . . . ♦ 80 \| 480 \| 320 160 160 \| 80 80 80 40 0 \| 16 16 10 0 0 0 \| 60480 * * * * \| 3 0 0 0 0 \| 3 0 0 o3o3x . c3o3o . . ♦ 20 \| 90 \| 60 0 60 \| 15 0 30 0 15 \| 0 6 0 6 0 0 \| 483840 * * * * \| 1 2 0 0 0 \| 2 1 0 . o3x3o c3o3o . . ♦ 80 \| 480 \| 160 160 320 \| 0 40 80 80 80 \| 0 0 10 16 16 0 \| * 181440 * * * \| 1 0 2 0 0 \| 2 0 1 . o3x . c3o3o3o . ♦ 15 \| 60 \| 20 0 60 \| 0 0 15 0 30 \| 0 0 0 6 0 6 \| * * 967680 * * \| 0 1 1 1 0 \| 1 1 1 . . x3o c3o3o3o . ♦ 15 \| 60 \| 0 20 60 \| 0 0 0 15 30 \| 0 0 0 0 6 6 \| * * * 483840 * \| 0 0 2 0 1 \| 1 0 2 . . x . c3o3o3o3o ♦ 6 \| 15 \| 0 0 20 \| 0 0 0 0 15 \| 0 0 0 0 0 6 \| * * * * 483840 \| 0 0 0 2 1 \| 0 1 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- o3o3x3o c3o3o . . ♦ 720 \| 6480 \| 4320 2160 4320 \| 1080 1080 2160 1080 1080 \| 216 432 270 432 216 0 \| 27 72 27 0 0 0 \| 6720 * * * \| 2 0 0 o3o3x . c3o3o3o . ♦ 35 \| 210 \| 140 0 210 \| 35 0 105 0 105 \| 0 21 0 42 0 21 \| 0 7 0 7 0 0 \| 138240 * * * \| 1 1 0 . o3x3o c3o3o3o . ♦ 240 \| 1920 \| 640 640 1920 \| 0 160 480 480 960 \| 0 0 60 192 192 192 \| 0 0 12 32 32 0 \| * 30240 * * \| 1 0 1 . o3x . c3o3o3o3o ♦ 21 \| 105 \| 35 0 140 \| 0 0 35 0 105 \| 0 0 0 21 0 42 \| 0 0 0 7 0 7 \| * * 138240 * \| 0 1 1 . . x3o c3o3o3o3o ♦ 21 \| 105 \| 0 35 140 \| 0 0 0 35 105 \| 0 0 0 0 21 42 \| 0 0 0 0 7 7 \| * * * 69120 \| 0 0 2 -------------------+--------+---------+-------------------------+-----------------------------------------+----------------------------------------------+------------------------------------------+--------------------------------+--------------- o3o3x3o c3o3o3o . ♦ 10080 \| 120960 \| 80640 40320 120960 \| 20160 20160 60480 30240 60480 \| 4032 12096 7560 24192 12096 12096 \| 756 4032 1512 4032 2016 0 \| 56 576 126 0 0 \| 240 * o3o3x . c3o3o3o3o ♦ 56 \| 420 \| 280 0 560 \| 70 0 280 0 420 \| 0 56 0 168 0 168 \| 0 28 0 56 0 28 \| 0 8 0 8 0 \| 17280 * . o3x3o c3o3o3o3o ♦ 672 \| 6720 \| 2240 2240 8960 \| 0 560 2240 2240 6720 \| 0 0 280 1344 1344 2688 \| 0 0 84 448 448 448 \| 0 0 14 64 64 \| * 2160

8-honeycombs edit

o3o3o3o *c3o3o3o3o3x - goh

o3o3o3o *c3o3o3o3o3x   (N → ∞)

. . . .    . . . . . |  N ♦  240 |  6720 |  60480 | 241920 | 483840 | 483840 | 138240 69120 | 17280 2160
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . . .    . . . . x |  2 | 120N ♦    56 |    756 |   4032 |  10080 |  12096 |   4032  2016 |   576  126
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . . .    . . . o3x |  3 |    3 | 2240N ♦     27 |    216 |    720 |   1080 |    432   216 |    72   27
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . . .    . . o3o3x ♦  4 |    6 |     4 | 15120N ♦     16 |     80 |    160 |     80    40 |    16   10
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . . .    . o3o3o3x ♦  5 |   10 |    10 |      5 | 48384N ♦     10 |     30 |     20    10 |     5    5
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . . .    o3o3o3o3x ♦  6 |   15 |    20 |     15 |      6 | 80640N ♦      6 |      6     3 |     2    3
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. . o . *c3o3o3o3o3x ♦  7 |   21 |    35 |     35 |     21 |      7 | 69120N |      2     1 |     1    2
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
. o3o . *c3o3o3o3o3x ♦  8 |   28 |    56 |     70 |     56 |     28 |      8 | 17280N     * |     1    1
. . o3o *c3o3o3o3o3x ♦  8 |   28 |    56 |     70 |     56 |     28 |      8 |      * 8640N |     0    2
---------------------+----+------+-------+--------+--------+--------+--------+--------------+-----------
o3o3o . *c3o3o3o3o3x ♦  9 |   36 |    84 |    126 |    126 |     84 |     36 |      8     0 | 1920N    *
. o3o3o *c3o3o3o3o3x ♦ 16 |  112 |   448 |   1120 |   1792 |   1792 |   1024 |    128   128 |     * 135N

Computation edit

The f-vector values, seen on the diagonal, are computed by systematically removing nodes (mirrors) from the Kaleidoscope. The element of a given set of removals is defined by the set of nodes connected to at least one ringed nodes. The number of elements of that type is computed from the full order of the Coxeter group divided by the order of the remaining mirrors. If groups of mirrors are not connected, the order is the product of all such connected groups remaining.

Polyhedra edit

Truncated cuboctahedron edit

Example truncated cuboctahedron, with all mirrors active, all 1+3+3+1 fundamental domain simplex positions contain elements.

Truncated cuboctahedron
B₃	k-face	f_k	f₀	f₁			f₂			k-fig	Notes
	( )	f₀	48	1	1	1	1	1	1	( )∨( )∨( )	B₃ = 48
A₁	{ }	f₁	2	24	*	*	1	1	0	{ }	B₃/A₁ = 24
A₁			2	*	24	*	1	0	1		B₃/A₁ = 24
A₁			2	*	*	24	0	1	1		B₃/A₁ = 24
A₂	{6}	f₂	6	3	3	0	8	*	*	( )	B₃/A₂ = 8*6/6 = 8
A₁A₁	{4}		4	2	0	2	*	12	*		B₃/A₁/A₁ = 48/4 = 12
B₂	{8}		8	0	4	4	*	*	6		B₃/B₂ = 48/8 = 6

4-polytopes edit

5-cell family edit

5-cell edit

x3o3o3o - pen

A₄	k-face	f_k	f₀	f₁	f₂	f₃	k-fig	Notes
A₃	( )	f₀	5	4	6	4	{3,3}	A₄/A₃ = 5!/4! = 5
A₂A₁	{ }	f₁	2	10	3	3	{3}	A₄/A₂A₁ = 5!/3!/2 = 10
A₂A₁	{3}	f₂	3	3	10	2	{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₃	{3,3}	f₃	4	6	4	5	( )	A₄/A₃ = 5!/4! = 5

rectified 5-cell edit

o3x3o3o - rap

A₄	k-face	f_k	f₀	f₁	f₂		f₃		k-fig	Notes
A₂A₁	( )	f₀	10	6	3	6	3	2	{3}×{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₁A₁	{ }	f₁	2	30	1	2	2	1	{ }∨( )	A₄/A₁A₁ = 5!/4 = 30
A₂A₁	{3}	f₂	3	3	10	*	2	0	{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₂	{3}	f₂	3	3	*	20	1	1	{ }	A₄/A₂ = 5!/3! = 20
A₃	r{3,3}	f₃	6	12	4	4	5	*	( )	A₄/A₃ = 5!/4! = 5
A₃	{3,3}	f₃	4	6	0	4	*	5	( )	A₄/A₃ = 5!/4! = 5

Truncated 5-cell edit

x3x3o3o - tip

A₄	k-face	f_k	f₀	f₁		f₂		f₃		k-fig	Notes
A₂	( )	f₀	20	1	3	3	3	3	1	{3}∨( )	A₄/A₂ = 5!/3! = 20
A₂A₁	{ }	f₁	2	10	*	3	0	3	0	{3}	A₄/A₂A₁ = 5!/3!/2 = 10
A₁A₁	{ }	f₁	2	*	30	1	2	2	1	{ }∨( )	A₄/A₁A₁ = 5!/4 = 30
A₂A₁	t{3}	f₂	6	3	3	10	*	2	0	{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₂	{3}	f₂	3	0	3	*	20	1	1	{ }	A₄/A₂ = 5!/3! = 20
A₃	t{3,3}	f₃	12	6	12	4	4	5	*	( )	A₄/A₃ = 5!/4! = 5
A₃	{3,3}	f₃	4	0	6	0	4	*	5	( )	A₄/A₃ = 5!/4! = 5

Cantellated 5-cell edit

x3o3x3o - srip

A₄	k-face	f_k	f₀	f₁		f₂				f₃			k-fig	Notes
A₁A₁	( )	f₀	30	2	4	1	4	2	2	2	2	1	Irr {3}×{ }	A₄/A₁A₁ = 5!/4 = 30
A₂A₁	{ }	f₁	2	30	*	1	2	0	0	2	1	0	{ }∨( )	A₄/A₂A₁ = 5!/3!/2 = 30
A₁	{ }	f₁	2	*	60	0	1	1	1	1	1	1	( )∨( )∨( )	A₄/A₁ = 5!/2 = 60
A₂A₁	{3}	f₂	3	3	0	10	*	*	*	2	0	0	{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₁A₁	{ }×{ }		4	2	2	*	30	*	*	1	1	0		A₄/A₁A₁ = 5!/4 = 30
A₂	{3}		3	0	3	*	*	20	*	1	0	1		A₄/A₂ = 5!/3! = 20
A₂	{3}		3	0	3	*	*	*	20	0	1	1		A₄/A₂ = 5!/3! =20
A₃	rr{3,3}	f₃	12	12	12	4	6	4	0	5	*	*	( )	A₄/A₃ = 5!/4! = 5
A₂A₁	{3}×{ }		6	3	6	0	3	0	2	*	10	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	r{3,3}		6	0	12	0	0	4	4	*	*	5		A₄/A₃ = 5!/4! = 5

runcinated 5-cell edit

x3o3o3x - spid

A₄	k-face	f_k	f₀	f₁		f₂			f₃				k-fig	Notes
A₂	( )	f₀	20	3	3	3	6	3	1	3	3	1	s{2,6}	A₄/A₂ = 5!/3! = 20
A₁A₁	{ }	f₁	2	30	*	2	2	0	1	2	1	0	{ }×{ }	A₄/A₁A₁ = 5!/4 = 30
A₁A₁	{ }	f₁	2	*	30	0	2	2	0	1	2	1	{ }×{ }	A₄/A₁A₁ = 5!/4 = 30
A₂	{3}	f₂	3	3	0	20	*	*	1	1	0	0	{ }	A₄/A₂ = 5!/3! =20
A₁A₁	{ }×{ }		4	2	2	*	30	*	0	1	1	0		A₄/A₁A₁ = 5!/4 = 30
A₂	{3}		3	0	3	*	*	20	0	0	1	1		A₄/A₂ = 5!/3! = 20
A₃	{3,3}	f₃	4	6	0	4	0	0	5	*	*	*	( )	A₄/A₃ = 5!/4! = 5
A₂A₁	{3}×{ }		6	6	3	2	3	0	*	10	*	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₂A₁	{3}×{ }		6	3	6	0	3	2	*	*	10	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	{3,3}		4	0	6	0	0	4	*	*	*	5		A₄/A₃ = 5!/4! = 5

Bitruncated 5-cell edit

o3x3x3o - deca

A₄	k-face	f_k	f₀	f₁		f₂			f₃		k-fig	Notes
A₁A₁	( )	f₀	30	2	2	1	4	1	2	2	s{2,4}	A₄/A₁A₁ = 5!/4 = 30
	{ }	f₁	2	30	*	1	2	0	2	1	{ }∨( )
	{ }	f₁	2	*	30	0	2	1	1	2	{ }∨( )
A₂A₁	{3}	f₂	3	3	0	10	*	*	2	0	{ }	A₄/A₂A₁ = 5!/3!/2 = 10
A₂	t{3}		6	3	3	*	20	*	1	1		A₄/A₂ = 5!/3! = 20
A₂A₁	{3}		3	0	3	*	*	10	0	2		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	t{3,3}	f₃	12	12	6	4	4	0	5	*	( )	A₄/A₃ = 5!/4! = 5
A₃	t{3,3}	f₃	12	6	12	0	4	4	*	5	( )	A₄/A₃ = 5!/4! = 5

Runcitruncated 5-cell edit

x3x3o3x - prip

A₄	k-face	f_k	f₀	f₁			f₂					f₃				k-fig	Notes
A₁	( )	f₀	60	1	2	2	2	2	1	2	1	1	2	1	1	irr. { }×{ }∨( )	A₄/A₁ = 5!/2 = 60
A₁A₁	{ }	f₁	2	30	*	*	2	2	0	0	0	1	2	1	0	{ }×{ }	A₄/A₁A₁ = 5!/4 = 30
A₁			2	*	60	*	1	0	1	1	0	1	1	0	1	( )∨( )∨( )	A₄/A₁ = 5!/2 = 60
A₁			2	*	*	60	0	1	0	1	1	0	1	1	1	( )∨( )∨( )	A₄/A₁ = 5!/2 = 60
A₂	t{3}	f₂	6	3	3	0	20	*	*	*	*	1	1	0	0	{ }	A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	2	0	2	*	30	*	*	*	0	1	1	0		A₄/A₁A₁ = 5!/4 = 30
A₂	{3}		3	0	3	0	*	*	20	*	*	1	0	0	1		A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	0	2	2	*	*	*	30	*	0	1	0	1		A₄/A₁A₁ = 5!/4 = 30
A₂	{3}		3	0	0	3	*	*	*	*	20	0	0	1	1		A₄/A₂ = 5!/3! = 20
A₃	t{3,3}	f₃	12	6	12	0	4	0	4	0	0	5	*	*	*	( )	A₄/A₃ = 5!/4! = 5
A₂A₁	t{3}×{ }		12	6	6	6	2	3	0	3	0	*	10	*	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₂A₁	{3}×{ }		6	3	0	6	0	3	0	0	2	*	*	10	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	rr{3,3}		12	0	12	12	0	0	4	6	4	*	*	*	5		A₄/A₃ = 5!/4! = 5

Runcitruncated 5-cell edit

x3x3o3x - prip

A₄	k-face	f_k	f₀	f₁			f₂					f₃				k-fig	Notes
A₁	( )	f₀	60	1	2	2	2	2	1	2	1	1	2	1	1	irr. { }×{ }∨( )	A₄/A₁ = 5!/2 = 60
A₁A₁	{ }	f₁	2	30	*	*	2	2	0	0	0	1	2	1	0	{ }×{ }	A₄/A₁A₁ = 5!/4 = 30
A₁			2	*	60	*	1	0	1	1	0	1	1	0	1	{ }∨( )	A₄/A₁ = 5!/2 = 60
A₁			2	*	*	60	0	1	0	1	1	0	1	1	1	{ }∨( )	A₄/A₁ = 5!/2 = 60
A₂	t{3}	f₂	6	3	3	0	20	*	*	*	*	1	1	0	0	{ }	A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	2	0	2	*	30	*	*	*	0	1	1	0		A₄/A₁A₁ = 5!/4 = 30
A₂	{3}		3	0	3	0	*	*	20	*	*	1	0	0	1		A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	0	2	2	*	*	*	30	*	0	1	0	1		A₄/A₁A₁ = 5!/4 = 30
A₃	{3}		3	0	0	3	*	*	*	*	20	0	0	1	1		A₄/A₁A₁ = 5!/4 = 30
A₃	t{3,3}	f₃	12	6	12	0	4	0	4	0	0	5	*	*	*	( )	A₄/A₃ = 5!/4! = 5
A₂A₁	t{3}×{ }		12	6	6	6	2	3	0	3	0	*	10	*	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₂A₁	{3}×{ }		6	3	0	6	0	3	0	0	2	*	*	10	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	rr{3,3}		12	0	12	12	0	0	4	6	4	*	*	*	5		A₄/A₃ = 5!/4! = 5

Omnitruncated 5-cell edit

x3x3x3x - gippid

A₄	k-face	f_k	f₀	f₁				f₂						f₃				k-fig	Notes
	( )	f₀	120	1	1	1	1	1	1	1	1	1	1	1	1	1	1	irr {3,3}	A₄ = 5! = 120
A₁	{ }	f₁	2	60	*	*	*	1	1	1	0	0	0	1	1	1	0	{ }∨( )	A₄/A₁ = 5!/2 = 60
			2	*	60	*	*	1	0	0	1	1	0	1	1	0	1
			2	*	*	60	*	0	1	0	1	0	1	1	0	1	1
			2	*	*	*	60	0	0	1	0	1	1	0	1	1	1
A₂	t{3}	f₂	6	3	3	0	0	20	*	*	*	*	*	1	1	0	0	{ }	A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	2	0	2	0	*	30	*	*	*	*	1	0	1	0		A₄/A₁A₁ = 5!/4 = 30
A₁A₁	{ }×{ }		4	2	0	0	2	*	*	30	*	*	*	0	1	1	0		A₄/A₁A₁ = 5!/4 = 30
A₂	t{3}		6	0	3	3	0	*	*	*	20	*	*	1	0	0	1		A₄/A₂ = 5!/3! = 20
A₁A₁	{ }×{ }		4	0	2	0	2	*	*	*	*	30	*	0	1	0	1		A₄/A₁A₁ = 5!/4 = 30
A₂	t{3}		6	0	0	3	3	*	*	*	*	*	20	0	0	1	1		A₄/A₂ = 5!/3! = 20
A₃	tr{3,3}	f₃	24	12	12	12	0	4	6	0	4	0	0	5	*	*	*	( )	A₄/A₃ = 5!/4! = 5
A₂A₁	t{3}×{ }		12	6	6	0	6	2	0	3	0	3	0	*	10	*	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₂A₁	t{3}×{ }		12	6	0	6	6	0	3	3	0	0	2	*	*	10	*		A₄/A₂A₁ = 5!/3!/2 = 10
A₃	tr{3,3}		24	0	12	12	12	0	0	0	4	6	4	*	*	*	5		A₄/A₃ = 5!/4! = 5

24-cell family edit

24-cell edit

x3o4o3o - ico

F₄	k-face	f_k	f₀	f₁	f₂	f₃	k-fig	Notes
B₃	( )	f₀	24	8	12	6	{4,3}	F₄/B₃ = 1152/48 = 24
A₂A₁	{ }	f₁	2	96	3	3	{3}	F₄/A₂A₁ = 1152/3!/2 = 96
A₂A₁	{3}	f₂	3	3	96	2	{ }	F₄/A₂A₁ = 1152/3!/2 = 96
B₃	{3,4}	f₃	6	12	8	24	( )	F₄/B₃ = 1152/48 = 24

Rectified 24-cell edit

o3x4o3o - rico

F₄	k-face	f_k	f₀	f₁	f₂		f₃		k-fig	Notes
A₂A₁	( )	f₀	96	6	3	6	3	2	{3}×{ }	F₄/A₂A₁ = 1152/3!/2 = 96
A₁A₁	{ }	f₁	2	288	1	2	2	1	{ }∨( )	F₄/A₁A₁ = 1152/4 = 288
A₂A₁	{3}	f₂	3	3	96	*	2	0	{ }	F₄/A₂A₁ = 1152/3!/2 = 96
B₂	{4}	f₂	4	4	*	144	1	1	{ }	F₄/B₂ = 1152/8 = 144
B₃	r{4,3}	f₃	12	24	8	6	24	*	( )	F₄/B₃ = 1152/48 = 24
B₃	{4,3}	f₃	8	12	0	6	*	24	( )	F₄/B₃ = 1152/48 = 24

Truncated 24-cell edit

x3x4o3o - tico

F₄	k-face	f_k	f₀	f₁		f₂		f₃		k-fig	Notes
A₂	( )	f₀	192	1	3	3	3	3	1	{3}∨( )	F₄/A₂ = 1152/3! = 192
A₂A₁	{ }	f₁	2	96	*	3	0	3	0	{3}	F₄/A₂A₁ = 1152/3!/2 = 96
A₁A₁	{ }	f₁	2	*	288	1	2	2	1	{ }∨( )	F₄/A₁A₁ = 1152/4 = 288
A₂A₁	t{3}	f₂	6	3	3	96	*	2	0	{ }	F₄/A₂A₁ = 1152/3!/2 = 96
B₂	{4}	f₂	4	0	4	*	144	1	1	{ }	F₄/B₂ = 1152/8 = 144
B₃	t{3,4}	f₃	24	12	24	8	6	24	*	( )	F₄/B₃ = 1152/48 = 24
B₃	{4,3}	f₃	8	0	12	0	6	*	24	( )	F₄/B₃ = 1152/48 = 24

Cantellated 24-cell edit

x3o4x3o - sric

F₄	k-face	f_k	f₀	f₁		f₂				f₃			k-fig	Notes
A₁A₁	( )	f₀	288	2	4	1	4	2	2	2	2	1	irr {3}×{ }	F₄/A₁A₁ = 1152/4 = 288
A₁A₁	{ }	f₁	2	288	*	1	2	0	0	2	1	0	{ }∨( )	F₄/A₁A₁ = 1152/4 = 288
A₁		f₁	2	*	576	0	1	1	1	1	1	1	( )∨( )∨( )	F₄/A₁ = 1152/2 = 576
A₂A₁		f₂	3	3	0	96	*	*	*	2	0	0	{ }	F₄/A₂A₁ = 1152/3!/2 = 96
A₁A₁	{ }×{ }		4	2	2	*	288	*	*	1	1	0		F₄/A₁A₁ = 1152/4 = 288
B₂	{4}		4	0	4	*	*	144	*	1	0	1		F₄/B₂ = 1152/8 = 144
A₂	{3}		3	0	3	*	*	*	192	0	1	1		F₄/A₂ = 1152/3! = 192
B₃	rr{4,3}	f₃	24	24	24	8	12	6	0	24	*	*	( )	F₄/B₃ = 1152/48 = 24
A₂A₁	{3}×{ }		6	3	6	0	3	0	2	*	96	*		F₄/A₂A₁ = 1152/3!/2 = 96
B₃	r{4,3}		12	0	24	0	0	6	8	*	*	24		F₄/B₃ = 1152/48 = 24

Runcinated 24-cell edit

x3o4o3x - spic

F₄	k-face	f_k	f₀	f₁		f₂			f₃				k-fig	Notes
B₂	( )	f₀	144	4	4	4	8	4	1	4	4	1	elong s{2,8}	F₄/B₂ = 1152/8 = 144
A₁A₁	{ }	f₁	2	288	*	2	2	0	1	2	1	0	{ }∨( )	F₄/A₁A₁ = 1152/4 = 288
A₁A₁	{ }	f₁	2	*	288	0	2	2	0	1	2	1	{ }∨( )	F₄/A₁A₁ = 1152/4 = 288
A₂	{3}	f₂	3	3	0	192	*	*	1	1	0	0	{ }	F₄/A₁ = 1152/3! = 192
A₁A₁	{ }×{ }		4	2	2	*	288	*	0	1	1	0		F₄/A₁A₁ = 1152/4 = 288
A₂	{3}		3	0	3	*	*	192	0	0	1	1		F₄/A₂ = 1152/3! = 192
B₃	{3,4}	f₃	6	12	0	8	0	0	24	*	*	*	( )	F₄/B₃ = 1152/48 = 24
A₂A₁	{3}×{ }		6	6	3	2	3	0	*	96	*	*		F₄/A₂A₁ = 1152/3!/2 = 96
A₂A₁	{3}×{ }		6	3	6	0	3	2	*	*	96	*		F₄/A₂A₁ = 1152/3!/2 = 96
B₃	{3,4}		6	0	12	0	0	8	*	*	*	24		F₄/B₃ = 1152/48 = 24

Bitruncated 24-cell edit

o3x4x3o - cont

F₄	k-face	f_k	f₀	f₁		f₂			f₃		k-fig	Notes
A₁A₁	( )	f₀	288	2	2	1	4	1	2	2	s{2,4}	F₄/A₁A₁ = 288
	{ }	f₁	2	288	*	1	2	0	2	1	{ }∨( )
	{ }	f₁	2	*	288	0	2	1	1	2	{ }∨( )
A₂A₁	{3}	f₂	3	3	0	96	*	*	2	0	{ }	F₄/A₂A₁ = 1152/6/2 = 96
B₂	t{4}		8	4	4	*	144	*	1	1		F₄/B₂ = 1152/8 = 144
A₂A₁	{3}		3	0	3	*	*	96	0	2		F₄/A₂A₁ = 1152/6/2 = 96
B₃	t{4,3}	f₃	24	24	12	8	6	0	24	*	( )	F₄/B₃ = 1152/48 = 24
B₃	t{4,3}	f₃	24	12	24	0	6	8	*	24	( )	F₄/B₃ = 1152/48 = 24

Cantitruncated 24-cell edit

x3x4x3o - grico

F₄	f_k	f₀	f₁			f₂				f₃			Notes
A₁	f₀	576	1	1	2	1	2	2	1	2	1	1	F₄/A₁ = 1152/2 = 576
A₁A₁	f₁	2	288	*	*	1	2	0	0	2	1	0	F₄/A₁A₁A₁A₁ = 1152/4 = 288
A₁A₁		2	*	288	*	1	0	2	0	2	0		F₄/A₁A₁A₁A₁ = 1152/4 = 288
A₁		2	*	*	576	0	1	1	1	1	1	1	F₄/A₁ = 1152/2 = 576
A₂A₁	f₂	6	3	3	0	96	*	*	*	2	0	0	F₄/A₂A₁ = 1152/3!/2 = 96
A₁A₁		4	2	0	2	*	288	*	*	1	1	0	F₄/A₁A₁ = 1152/4 = 288
B₂		8	0	4	4	*	*	144	*	1	0	1	F₄/B₂ = 1152/8 = 144
A₂		3	0	0	3	*	*	*	192	0	1	1	F₄/A₂ = 1152/3! = 192
B₃	f₃	48	24	24	24	8	12	6	0	24	*	*	F₄/B₃ = 1152/48 = 24
A₂A₁		6	3	0	6	0	3	0	2	*	96	*	F₄/A₂A₁ = 1152/3!/2 = 96
B₃		24	0	12	24	0	0	6	8	*	*	24	F₄/B₃ = 1152/48 = 24

Runcitruncated 24-cell edit

x3x4o3x - prico

F₄	f_k	f₀	f₁			f₂					f₃				Notes
A₁	f₀	576	1	2	2	2	2	1	2	1	1	2	1	1	F₄ = 1152
A₁A₁	f₁	2	288	*	*	2	2	0	0	0	1	2	1	0	F₄/A₁ = 1152/2 = 288
A₁		2	*	576	*	1	0	1	1	0	1	1	0	1	F₄/A₁ = 1152/2 = 576
A₁		2	*	*	576	0	1	0	1	1	0	1	1	1	F₄/A₁ = 1152/2 = 576
A₂	f₂	6	3	3	0	192	*	*	*	*	1	1	0	0	F₄/A₂ = 1152/3! = 192
A₁A₁		4	2	0	2	*	288	*	*	*	0	1	1	0	F₄/A₁A₁ = 1152/4 = 288
B₂		4	0	4	0	*	*	144	*	*	1	0	0	1	F₄/B₂ = 1152/8 = 144
A₁A₁		4	0	2	2	*	*	*	288	*	0	1	0	1	F₄/A₁A₁ = 1152/4 = 288
A₂		3	0	0	3	*	*	*	*	192	0	0	1	1	F₄/A₂ = 1152/3! = 192
B₃	f₃	24	12	24	0	8	0	6	0	0	24	*	*	*	F₄/B₃ = 1152/48 = 24
A₂A₁		12	6	6	6	2	3	0	3	0	*	96	*	*	F₄/A₂A₁ = 1152/3!/2 = 96
A₂A₁		6	3	0	6	0	3	0	0	2	*	*	96	*	F₄/A₂A₁ = 1152/3!/2 = 96
B₃		24	0	24	24	0	0	6	12	8	*	*	*	24	F₄/B₃ = 1152/48 = 24

Omnitruncated 24-cell edit

x3x4x3x - gippic

F₄	k-face	f_k	f₀	f₁				f₂						f₃				k-fig	Notes
	( )	f₀	1152	1	1	1	1	1	1	1	1	1	1	1	1	1	1	Irr. {3,3}	F₄ = 1152
A₁	{ }	f₁	2	576	*	*	*	1	1	1	0	0	0	1	1	1	0	( )∨( )∨( )	F₄/A₁ = 1152/2 = 576
			2	*	576	*	*	1	0	0	1	1	0	1	1	0	1
			2	*	*	576	*	0	1	0	1	0	1	1	0	1	1
			2	*	*	*	576	0	0	1	0	1	1	0	1	1	1
A₂	t{3}	f₂	6	3	3	0	0	192	*	*	*	*	*	1	1	0	0	{ }	F₄/A₂ = 1152/3! = 192
A₁A₁	{ }×{ }		4	2	0	2	0	*	288	*	*	*	*	1	0	1	0		F₄/A₁A₁ = 1152/4 = 288
A₁A₁	{ }×{ }		4	2	0	0	2	*	*	288	*	*	*	0	1	1	0		F₄/A₁A₁ = 1152/4 = 288
B₂	t{4}		8	0	4	4	0	*	*	*	144	*	*	1	0	0	1		F₄/B₂ = 1152/8 = 144
A₁A₁	{ }×{ }		4	0	2	0	2	*	*	*	*	288	*	0	1	0	1		F₄/A₁A₁ = 1152/4 = 288
A₂	t{3}		6	0	0	3	3	*	*	*	*	*	192	0	0	1	1		F₄/A₂ = 1152/3! = 192
B₃	tr{4,3}	f₃	48	24	24	24	0	8	12	0	6	0	0	24	*	*	*	( )	F₄/B₃ = 1152/48 = 24
A₂A₁	t{3}×{ }		12	6	6	0	6	2	0	3	0	3	0	*	96	*	*		F₄/A₂A₁ = 1152/3!/2 = 96
A₂A₁	t{3}×{ }		12	6	0	6	6	0	3	3	0	0	2	*	*	96	*		F₄/A₂A₁ = 1152/3!/2 = 96
B₃	tr{4,3}		48	0	24	24	24	0	0	0	6	12	8	*	*	*	24		F₄/B₃ = 1152/ 48 = 24

Snub 24-cell edit

Example: snub 24-cell

	k-face	f_k	f₀	f₁		f₂			f₃			k-fig
demi( )	( )	f₀	96	3	6	3	9	3	3	1	4	I-3
( )	{ }	f₁	2	144	*	0	2	2	1	1	2	{ }\|\|{ }
sefa( )	{ }	f₁	2	*	288	1	2	0	2	0	1	{ }∨( )
( )	{3}	f₂	3	0	3	96	*	*	2	0	0	{ }
sefa( )			3	1	2	*	288	*	1	0	1
sefa( )			3	3	0	*	*	96	0	1	1
( )	{3,5}	f₃	12	6	24	8	12	0	24	*	*	( )
( )	{3,3}		4	6	0	0	0	4	*	24	*
sefa( )	{3,3}		4	3	3	0	3	1	*	*	96

Omnitruncated tesseract edit

Example on omnitruncated tesseract. An omnitruncated 4-polytope will have 2^4-1 or 15 types of elements.

B₄	k-face	f_k	f₀	f₁				f₂						f₃				k-fig	Notes
	( )	f₀	384	1	1	1	1	1	1	1	1	1	1	1	1	1	1	{3,3}	B₄ = 384
A₁	{ }	f₁	2	192	*	*	*	1	1	1	0	0	0	1	1	1	0	( )∨( )∨( )	B₄/A₁ = 192
A₁	{ }		2	*	192	*	*	1	0	0	1	1	0	1	1	0	1		B₄/A₁ = 192
A₁	{ }		2	*	*	192	*	0	1	0	1	0	1	1	0	1	1		B₄/A₁ = 192
A₁	{ }		2	*	*	*	192	0	0	1	0	1	1	0	1	1	1		B₄/A₁ = 192
A₂	{6}	f₂	6	3	3	0	0	64	*	*	*	*	*	1	1	0	0	{ }	B₄/A₂ = 64
A₁A₁	{4}		4	2	0	2	0	*	96	*	*	*	*	1	0	1	0		B₄/A₁A₁ = 96
A₁A₁	{4}		4	2	0	0	2	*	*	96	*	*	*	0	1	1	0		B₄/A₁A₁ = 96
A₂	{6}		6	0	3	3	0	*	*	*	64	*	*	1	0	0	1		B₄/A₂ = 64
A₁A₁	{4}		4	0	2	0	2	*	*	*	*	96	*	0	1	0	1		B₄/A₁A₁ = 96
B₂	{8}		8	0	0	4	4	*	*	*	*	*	48	0	0	1	1		B₄/B₂ = 48
A₃	tr{3,3}	f₃	24	12	12	12	0	4	6	0	4	0	0	16	*	*	*	( )	B₄/A₃ = 16
A₂A₁	{6}×{ }		12	6	6	0	6	2	0	3	0	3	0	*	32	*	*		B₄/A₂A₁ = 32
B₂A₁	{8}×{ }		16	8	0	8	8	0	4	4	0	0	2	*	*	24	*		B₄/B₂A₁ = 24
B₃	tr{4,3}		48	0	24	24	24	0	0	0	8	12	6	*	*	*	8		B₄/B₃ = 8

600-cell edit

H₄	k-face	f_k	f₀	f₁	f₂	f₃	k-fig	Notes
H₃	( )	f₀	120	12	30	20	{3,5}	H₄/H₃ = 14400/120 = 120
A₁H₂	{ }	f₁	2	720	5	5	{5}	H₄/H₂A₁ = 14400/10/2 = 720
A₂A₁	{3}	f₂	3	3	1200	2	{ }	H₄/A₂A₁ = 14400/6/2 = 1200
A₃	{3,3}	f₃	4	6	4	600	( )	H₄/A₃ = 14400/24 = 600

120-cell edit

H₄	k-face	f_k	f₀	f₁	f₂	f₃	k-fig	Notes
A₃	( )	f₀	600	4	6	4	{3,3}	H₄/A₃ = 14400/24 = 600
A₁A₂	{ }	f₁	2	720	3	3	{3}	H₄/A₂A₁ = 14400/6/2 = 1200
H₂A₁	{5}	f₂	5	5	1200	2	{ }	H₄/H₂A₁ = 14400/10/2 = 720
H₃	{5,3}	f₃	20	30	12	120	( )	H₄/H₃ = 14400/120 = 120

5-polytopes edit

0_31 edit

Example rectified 5-simplex

A₅	k-face	f_k	f₀	f₁	f₂		f₃		f₄		k-fig	notes
A₃A₁	( )	f₀	15	8	4	12	6	8	4	2	{ }×{3,3}	A₅/A₃A₁ = 6!/4!/2 = 15
A₂A₁	{ }	f₁	2	60	1	3	3	3	3	1	( )∨{3}	A₅/A₂A₁ = 6!/3!/2 = 60
A₂A₂	r{3}	f₂	3	3	20	*	3	0	3	0	{3}	A₅/A₂A₂ = 6!/3!/3! =20
A₂A₁	{3}	f₂	3	3	*	60	1	2	2	1	( )×{ }	A₅/A₂A₁ = 6!/3!/2 = 60
A₃A₁	r{3,3}	f₃	6	12	4	4	15	*	2	0	{ }	A₅/A₃A₁ = 6!/4!/2 = 15
A₃	{3,3}	f₃	4	6	0	4	*	30	1	1	( )∨( )	A₅/A₃ = 6!/4! = 30
A₄	r{3,3,3}	f₄	10	30	10	20	5	5	6	*	( )	A₅/A₄ = 6!/5! = 6
A₄	{3,3,3}	f₄	5	10	0	10	0	5	*	6	( )	A₅/A₄ = 6!/5! = 6

0_22 edit

Example birectified 5-simplex

A₅	k-face	f_k	f₀	f₁	f₂		f₃			f₄		k-fig	notes
A₂A₂	( )	f₀	20	9	9	9	3	9	3	3	3	{3}×{3}	A₅/A₂A₂ = 6!/3!/3! = 20
A₁A₁A₁	{ }	f₁	2	90	2	2	1	4	1	2	2	{ }∨{ }	A₅/A₁A₁A₁ = 6!/8 = 90
A₂A₁	{3}	f₂	3	3	60	*	1	2	0	2	1	{ }∨( )	A₅/A₂A₁ = 6!/3!/2 = 60
A₂A₁	{3}	f₂	3	3	*	60	0	2	1	1	2	( )∨{ }	A₅/A₂A₁ = 6!/3!/2 = 60
A₃A₁	{3,3}	f₃	4	6	4	0	15	*	*	2	0	{ }	A₅/A₃A₁ = 6!/4!/2 = 15
A₃	r{3,3}		6	12	4	4	*	30	*	1	1		A₅/A₃ = 6!/4! = 30
A₃A₁	{3,3}		4	6	0	4	*	*	15	0	2		A₅/A₃A₁ = 6!/4!/2 = 15
A₄	r{3,3,3}	f₄	10	30	20	10	5	5	0	6	*	( )	A₅/A₄ = 6!/5! = 6
A₄	r{3,3,3}	f₄	10	30	10	20	0	5	5	*	6	( )	A₅/A₄ = 6!/5! = 6

1_21 edit

Example 5-demicube:

D₅	k-face	f_k	f₀	f₁	f₂	f₃		f₄		k-fig	notes
A₄	( )	f₀	16	10	30	10	20	5	5	r{3,3,3}	D₅/A₄ = 16*5!/5! = 16
A₂A₁A₁	{ }	f₁	2	80	6	3	6	3	2	{3}×{ }	D₅/A₂A₁A₁ = 16*5!/3!/4 = 80
A₂A₁	{3}	f₂	3	3	160	1	2	2	1	{ }∨( )	D₅/A₂A₁ = 16*5!/3!/2 = 160
A₃A₁	h{4,3}	f₃	4	6	4	40	*	2	0	{ }	D₅/A₃A₁ = 16*5!/4!/2 = 40
A₃	{3,3}	f₃	4	6	4	*	80	1	1	{ }	D₅/A₃ = 16*5!/4! = 80
D₄	h{4,3,3}	f₄	8	24	32	8	8	10	*	( )	D₅/D₄ = 16*5!/8/4! = 10
A₄	{3,3,3}	f₄	5	10	10	0	5	*	16	( )	D₅/A₄ = 16*5!/5! = 16

6-polytopes edit

1_31 edit

Example 6-demicube

D₆	k-face	f_k	f₀	f₁	f₂	f₃		f₄		f₅		k-fig	notes
A₄	( )	f₀	32	15	60	20	60	15	30	6	6	r{3,3,3,3}	D₆/A₄ = 32*6!/5! = 32
A₃A₁A₁	{ }	f₁	2	240	8	4	12	6	8	4	2	{}×{3,3}	D₆/A₃A₁A₁ = 32*6!/4!/4 = 240
A₃A₂	{3}	f₂	3	3	640	1	3	3	3	3	1	{3}∨( )	D₆/A₃A₂ = 32*6!/4!/3! = 640
A₃A₁	h{4,3}	f₃	4	6	4	160	*	3	0	3	0	{3}	D₆/A₃A₁ = 32*6!/4!/2 = 160
A₃A₂	{3,3}	f₃	4	6	4	*	480	1	2	2	1	{}∨( )	D₆/A₃A₂ = 32*6!/4!/3! = 480
D₄A₁	h{4,3,3}	f₄	8	24	32	8	8	60	*	2	0	{ }	D₆/D₄A₁ = 32*6!/8/4!/2 = 60
A₄	{3,3,3}	f₄	5	10	10	0	5	*	192	1	1	{ }	D₆/A₄ = 32*6!/5! = 192
D₅	h{4,3,3,3}	f₅	16	80	160	40	80	10	16	12	*	( )	D₆/D₅ = 32*6!/16/5! = 12
A₅	{3,3,3,3}	f₅	6	15	20	0	15	0	6	*	32	( )	D₆/A₅ = 32*6!/6! = 32

2_21 edit

Example on 2_21 polytope:

E₆	k-face	f_k	f₀	f₁	f₂	f₃	f₄		f₅		k-fig	notes
D₅	( )	f₀	27	16	80	160	80	40	16	10	h{4,3,3,3}	E₆/D₅ = 51840/1920 = 27
A₄A₁	{ }	f₁	2	216	10	30	20	10	5	5	r{3,3,3}	E₆/A₄A₁ = 51840/120/2 = 216
A₂A₂A₁	{3}	f₂	3	3	720	6	6	3	2	3	{3}×{ }	E₆/A₂A₂A₁ = 51840/6/6/2 = 720
A₃A₁	{3,3}	f₃	4	6	4	1080	2	1	1	2	{ }∨( )	E₆/A₃A₁ = 51840/24/2 = 1080
A₄	{3,3,3}	f₄	5	10	10	5	432	*	1	1	{ }	E₆/A₄ = 51840/120 = 432
A₄A₁	{3,3,3}	f₄	5	10	10	5	*	216	0	2	{ }	E₆/A₄A₁ = 51840/120/2 = 216
A₅	{3,3,3,3}	f₅	6	15	20	15	6	0	72	*	( )	E₆/A₅ = 51840/720 = 72
D₅	{3,3,3,4}	f₅	10	40	80	80	16	16	*	27	( )	E₆/D₅ = 51840/1920 = 27

1_22 edit

Example on 1_22 polytope:

E₆	k-face	f_k	f₀	f₁	f₂	f₃		f₄			f₅		k-fig	notes
A₅	( )	f₀	72	20	90	60	60	15	15	30	6	6	r{3,3,3}	E₆/A₅ = 72*6!/6! = 72
A₂A₂A₁	{ }	f₁	2	720	9	9	9	3	3	9	3	3	{3}×{3}	E₆/A₂A₂A₁ = 72*6!/3!/3!/2 = 720
A₂A₁A₁	{3}	f₂	3	3	2160	2	2	1	1	4	2	2	{ }∨{ }	E₆/A₂A₁A₁ = 72*6!/3!/4 = 2160
A₃A₁	{3,3}	f₃	4	6	4	1080	*	1	0	2	2	1	{ }∨( )	E₆/A₃A₁ = 72*6!/4!/2 = 1080
A₃A₁	{3,3}	f₃	4	6	4	*	1080	0	1	2	1	2	{ }∨( )	E₆/A₃A₁ = 72*6!/4!/2 = 1080
A₄A₁	{3,3,3}	f₄	5	10	10	5	0	216	*	*	2	0	{ }	E₆/A₄A₁ = 72*6!/5!/2 = 216
A₄A₁	{3,3,3}		5	10	10	0	5	*	216	*	0	2		E₆/A₄A₁ = 72*6!/5!/2 = 216
D₄	{3,3,4}		8	24	32	8	8	*	*	270	1	1		E₆/D₄ = 72*6!/8/4! = 270
D₅	h{4,3,3,3}	f₅	16	80	160	80	40	16	0	10	27	*	( )	E₆/D₅ = 72*6!/16/5! = 27
D₅	h{4,3,3,3}	f₅	16	80	160	40	80	0	16	10	*	27	( )	E₆/D₅ = 72*6!/16/5! = 27

0_221 edit

Example Rectified 1_22 polytope

E₆	k-face	f_k	f₀	f₁	f₂			f₃					f₄					f₅			k-fig	notes
A₂A₂A₁	( )	f₀	720	18	18	18	9	6	18	9	6	9	6	3	6	9	3	2	3	3	{3}×{3}×{ }	E₆/A₂A₂A₁ = 72*6!/3!/3!/2 = 720
A₁A₁A₁	{ }	f₁	2	6480	2	2	1	1	4	2	1	2	2	1	2	4	1	1	2	2	{ }∨{ }∨( )	E₆/A₁A₁A₁ = 72*6!/8 = 6480
A₂A₁	{3}	f₂	3	3	4320	*	*	1	2	1	0	0	2	1	1	2	0	1	2	1	Sphenoid	E₆/A₂A₁ = 72*6!/3!/2 = 4320
A₂A₁			3	3	*	4320	*	0	2	0	1	1	1	0	2	2	1	1	1	2	Sphenoid	E₆/A₂A₁ = 72*6!/3!/2 = 4320
A₂A₁A₁			3	3	*	*	2160	0	0	2	0	2	0	1	0	4	1	0	2	2	{ }∨{ }	E₆/A₂A₁A₁ = 72*6!/3!/4 = 2160
A₂A₁	{3,3}	f₃	4	6	4	0	0	1080	*	*	*	*	2	1	0	0	0	1	2	0	{ }∨( )	E₆/A₂A₁ = 72*6!/3!/2 = 1080
A₃	r{3,3}		6	12	4	4	0	*	2160	*	*	*	1	0	1	1	0	1	1	1	{3}	E₆/A₃ = 72*6!/4! = 2160
A₃A₁	r{3,3}		6	12	4	0	4	*	*	1080	*	*	0	1	0	2	0	0	2	1	{ }∨( )	E₆/A₃A₁ = 72*6!/4!/2 = 1080
	{3,3}		4	6	0	4	0	*	*	*	1080	*	0	0	2	0	1	1	0	2
	r{3,3}		6	12	0	4	4	*	*	*	*	1080	0	0	0	2	1	0	1	2
A₄	r{3,3,3}	f₄	10	30	20	10	0	5	5	0	0	0	432	*	*	*	*	1	1	0	{ }	E₆/A₄ = 72*6!/5! = 432
A₄A₁			10	30	20	0	10	5	0	5	0	0	*	216	*	*	*	0	2	0		E₆/A₄A₁ = 72*6!/5!/2 = 216
A₄			10	30	10	20	0	0	5	0	5	0	*	*	432	*	*	1	0	1		E₆/A₄ = 72*6!/5! = 432
D₄	h{4,3,3}		24	96	32	32	32	0	8	8	0	8	*	*	*	270	*	0	1	1		E₆/D₄ = 72*6!/8/4! = 270
A₄A₁	r{3,3,3}		10	30	0	20	10	0	0	0	5	5	*	*	*	*	216	0	0	2		E₆/A₄A₁ = 72*6!/5!/2 = 216
A₅	2r{3,3,3,3}	f₅	20	90	60	60	0	15	30	0	15	0	6	0	6	0	0	72	*	*	( )	E₆/A₅ = 72*6!/6! = 72
D₅	rh{4,3,3,3}		80	480	320	160	160	80	80	80	0	40	16	16	0	10	0	*	27	*		E₆/D₅ = 72*6!/16/5! = 27
D₅	rh{4,3,3,3}		80	480	160	320	160	0	80	40	80	80	0	0	16	10	16	*	*	27		E₆/D₅ = 72*6!/16/5! = 27

Omnitruncated 6-simplex edit

Example: Omnitruncated 6-simplex BIG TEST!

f₀	f₁			f₂									f₃										f₄									f₅			k-fig
5040	2	2	2	2	2	2	2	1	2	2	1	1	2	2	2	2	2	2	2	2	2	2	2	2	2	2	2	1	2	1	1	2	2	2
2	5040	*	*	1	1	1	1	1	0	0	0	0	1	1	1	2	1	1	2	1	0	0	1	1	2	1	2	1	1	1	0	1	2	2
2	*	5040	*	1	0	0	1	0	1	1	1	0	1	1	2	1	0	1	0	1	1	2	1	2	1	2	1	1	1	0	1	2	1	2
2	*	*	5040	0	1	1	0	0	1	1	0	1	1	1	0	0	2	1	1	1	2	1	2	1	1	1	1	0	2	1	1	2	2	1
6	3	3	0	1680	*	*	*	*	*	*	*	*	1	1	1	1	0	0	0	0	0	0	1	1	1	1	1	1	0	0	0	1	1	2
4	2	0	2	*	2520	*	*	*	*	*	*	*	1	0	0	0	1	1	1	0	0	0	1	1	1	0	1	0	1	1	0	1	2	1
4	2	0	2	*	*	2520	*	*	*	*	*	*	0	1	0	0	1	0	1	1	0	0	1	0	1	1	1	0	1	1	0	1	2	1
4	2	2	0	*	*	*	2520	*	*	*	*	*	0	0	1	1	0	1	0	1	0	0	0	1	1	1	1	1	1	0	0	1	1	2
4	4	0	0	*	*	*	*	1260	*	*	*	*	0	0	0	2	0	0	2	0	0	0	0	0	2	0	2	1	0	1	0	0	2	2
6	0	3	3	*	*	*	*	*	1680	*	*	*	1	0	0	0	0	0	0	1	1	1	1	1	1	1	0	0	1	0	1	2	1	1
4	0	2	2	*	*	*	*	*	*	2520	*	*	0	1	0	0	0	1	0	0	1	1	1	1	0	1	1	0	1	0	1	2	1	1
4	0	4	0	*	*	*	*	*	*	*	1260	*	0	0	2	0	0	0	0	0	0	2	0	2	0	2	0	1	0	0	1	2	0	2
6	0	0	6	*	*	*	*	*	*	*	*	840	0	0	0	0	2	0	0	0	2	0	2	0	0	0	0	0	2	1	1	2	2	0
24	12	12	12	4	6	0	0	0	4	0	0	0	420	*	*	*	*	*	*	*	*	*	1	1	1	0	0	0	0	0	0	1	1	1
12	6	6	6	2	0	3	0	0	0	3	0	0	*	840	*	*	*	*	*	*	*	*	1	0	0	1	1	0	0	0	0	1	1	1
12	6	12	0	2	0	0	3	0	0	0	3	0	*	*	840	*	*	*	*	*	*	*	0	1	0	1	0	1	0	0	0	1	0	2
12	12	6	0	2	0	0	3	3	0	0	0	0	*	*	*	840	*	*	*	*	*	*	0	0	1	0	1	1	0	0	0	0	1	2
12	6	0	12	0	3	3	0	0	0	0	0	2	*	*	*	*	840	*	*	*	*	*	1	0	0	0	0	0	1	1	0	1	2	0
8	4	4	4	0	2	0	2	0	0	2	0	0	*	*	*	*	*	1260	*	*	*	*	0	1	0	0	1	0	1	0	0	1	1	1
8	8	0	4	0	2	2	0	2	0	0	0	0	*	*	*	*	*	*	1260	*	*	*	0	0	1	0	1	0	0	1	0	0	2	1
12	6	6	6	0	0	3	3	0	2	0	0	0	*	*	*	*	*	*	*	840	*	*	0	0	1	1	0	0	1	0	0	1	1	1
24	0	12	24	0	0	0	0	0	4	6	0	4	*	*	*	*	*	*	*	*	420	*	1	0	0	0	0	0	1	0	1	2	1	0
12	0	12	6	0	0	0	0	0	2	3	3	0	*	*	*	*	*	*	*	*	*	8	40	0	1	0	1	0	0	0	0	1	2	0	1
120	60	60	120	20	30	30	0	0	20	30	0	20	5	10	0	0	10	0	0	0	5	0	84	*	*	*	*	*	*	*	*	1	1	0
48	24	48	24	8	12	0	12	0	8	12	12	0	2	0	4	0	0	6	0	0	0	4	*	210	*	*	*	*	*	*	*	1	0	1
48	48	24	24	8	12	12	12	12	8	0	0	0	2	0	0	4	0	0	6	4	0	0	*	*	210	*	*	*	*	*	*	0	1	1
36	18	36	18	6	0	9	9	0	6	9	9	0	0	3	3	0	0	0	0	3	0	3	*	*	*	280	*	*	*	*	*	1	0	1
24	24	12	12	4	6	6	6	6	0	6	0	0	0	2	0	2	0	3	3	0	0	0	*	*	*	*	420	*	*	*	*	0	1	1
36	36	36	0	12	0	0	18	9	0	0	9	0	0	0	6	6	0	0	0	0	0	0	*	*	*	*	*	140	*	*	*	0	0	2
48	24	24	48	0	12	12	12	0	8	12	0	8	0	0	0	0	4	6	0	4	2	0	*	*	*	*	*	*	210	*	*	1	1	0
24	24	0	24	0	12	12	0	6	0	0	0	4	0	0	0	0	4	0	6	0	0	0	*	*	*	*	*	*	*	210	*	0	2	0
120	0	120	120	0	0	0	0	0	40	60	30	20	0	0	0	0	0	0	0	0	10	20	*	*	*	*	*	*	*	*	42	2	0	0
720	360	720	720	120	180	180	180	0	240	360	180	120	30	60	60	0	60	90	0	60	60 1	20	6	15	0	20	0	0	15	0	6	14	*	*
240	240	120	240	40	120	120	60	60	40	60	0	40	10	20	0	20	40	30	60	20	10	0	2	0	5	0	10	0	5	10	0	*	42	*
144	144	144	72	48	36	36	72	36	24	36	36	0	6	12	24	24	0	18	18	12	0	12	0	3	3	4	6	4	0	0	0	*	*	70

7-polytopes edit

1_41 edit

Example on 7-demicube:

D₇	k-face	f_k	f₀	f₁	f₂	f₃		f₄		f₅		f₆		k-fig	notes
A₆	( )	f₀	64	21	105	35	140	35	105	21	42	7	7	r{3,3,3,3,3}	D₇/A₆ = 64*7!/7! = 64
A₄A₁A₁	{ }	f₁	2	672	10	5	20	10	20	10	10	5	2	{ }×{3,3,3}	D₇/A₄A₁A₁ = 64*7!/5!/4 = 672
A₃A₂	{3}	f₂	3	3	2240	1	4	4	6	6	4	4	1	{3,3}∨( )	D₇/A₃A₂ = 64*7!/4!/3! = 2240
A₃A₃	h{4,3}	f₃	4	6	4	560	*	4	0	6	0	4	0	{3,3}	D₇/A₃A₃ = 64*7!/4!/4! = 560
A₃A₂	{3,3}	f₃	4	6	4	*	2240	1	3	3	3	3	1	{3}∨( )	D₇/A₃A₂ = 64*7!/4!/3! = 2240
D₄A₂	h{4,3,3}	f₄	8	24	32	8	8	280	*	3	0	3	0	{3}	D₇/D₄A₂ = 64*7!/8/4!/2 = 280
A₄A₁	{3,3,3}	f₄	5	10	10	0	5	*	1344	1	2	2	1	{ }∨( )	D₇/A₄A₁ = 64*7!/5!/2 = 1344
D₅A₁	h{4,3,3,3}	f₅	16	80	160	40	80	10	16	84	*	2	0	{ }	D₇/D₅A₁ = 64*7!/16/5!/2 = 84
A₅	{3,3,3,3}	f₅	6	15	20	0	15	0	6	*	448	1	1	{ }	D₇/A₅ = 64*7!/6! = 448
D₆	h{4,3,3,3,3}	f₆	32	240	640	160	480	60	192	12	32	14	*	( )	D₇/D₆ = 64*7!/32/6! = 14
A₆	{3,3,3,3,3}	f₆	7	21	35	0	35	0	21	0	7	*	64	( )	D₇/A₆ = 64*7!/7! = 64

3_21 edit

Example on 3_21 polytope:

E₇	k-face	f_k	f₀	f₁	f₂	f₃	f₄	f₅		f₆		k-fig	notes
E₆	( )	f₀	56	27	216	720	1080	432	216	72	27	2₂₁	E₇/E₆ = 72x8!/72x6! = 56
D₅A₁	{ }	f₁	2	756	16	80	160	80	40	16	10	5-demicube	E₇/D₅A₁ = 72x8!/16/5!/2 = 756
A₄A₂	{3}	f₂	3	3	4032	10	30	20	10	5	5	rectified 5-cell	E₇/A₄A₂ = 72x8!/5!/2 = 4032
A₃A₂A₁	{3,3}	f₃	4	6	4	10080	6	6	3	2	3	triangular prism	E₇/A₃A₂A₁ = 72x8!/4!/3!/2 = 10080
A₄A₁	{3,3,3}	f₄	5	10	10	5	12096	2	1	1	2	isosceles triangle	E₇/A₄A₁ = 72x8!/5!/2 = 12096
A₅A₁	{3,3,3,3}	f₅	6	15	20	15	6	4032	*	1	1	{ }	E₇/A₅A₁ = 72x8!/6!/2 = 4032
A₅	{3,3,3,3}	f₅	6	15	20	15	6	*	2016	0	2	{ }	E₇/A₅ = 72x8!/6! = 2016
A₆	{3,3,3,3,3}	f₆	7	21	35	35	21	10	0	576	*	( )	E₇/A₆ = 72x8!/7! = 576
D₆	{3,3,3,3,4}	f₆	12	60	160	240	192	32	32	*	126	( )	E₇/D₆ = 72x8!/32/6! = 126

2_31 edit

Example on 2_31 polytope:

E₇	k-face	f_k	f₀	f₁	f₂	f₃	f₄		f₅		f₆		k-fig	notes
D₆	( )	f₀	126	32	240	640	160	480	60	192	12	32	6-demicube	E₇/D₆ = 72x8!/32/6! = 126
A₅A₁	{ }	f₁	2	2016	15	60	20	60	15	30	6	6	rectified 5-simplex	E₇/A₅A₁ = 72x8!/6!/2 = 2016
A₃A₂A₁	{3}	f₂	3	3	10080	8	4	12	6	8	4	2	tetrahedral prism	E₇/A₃A₂A₁ = 72x8!/4!/3!/2 = 10080
A₃A₂	{3,3}	f₃	4	6	4	20160	1	3	3	3	3	1	tetrahedron	E₇/A₃A₂ = 72x8!/4!/3! = 20160
A₄A₂	{3,3,3}	f₄	5	10	10	5	4032	*	3	0	3	0	{3}	E₇/A₄A₂ = 72x8!/5!/3! = 4032
A₄A₁	{3,3,3}	f₄	5	10	10	5	*	12096	1	2	2	1	Isosceles triangle	E₇/A₄A₁ = 72x8!/5!/2 = 12096
D₅A₁	{3,3,3,4}	f₅	10	40	80	80	16	16	756	*	2	0	{ }	E₇/D₅A₁ = 72x8!/32/5! = 756
A₅	{3,3,3,3}	f₅	6	15	20	15	0	6	*	4032	1	1	{ }	E₇/A₅ = 72x8!/6! = 7287 = 4032
E₆	{3,3,3^2,1}	f₆	27	216	720	1080	216	432	27	72	56	*	( )	E₇/E₆ = 72x8!/72x6! = 8*7 = 56
A₆	{3,3,3,3,3}	f₆	7	21	35	35	0	21	0	7	*	576	( )	E₇/A₆ = 72x8!/7! = 72×8 = 576

1_32 edit

Example on 1_32 polytope:

E₇	k-face	f_k	f₀	f₁	f₂	f₃		f₄			f₅			f₆		k-fig	notes
A₆	( )	f₀	576	35	210	140	210	35	105	105	21	42	21	7	7	2r{3,3,3,3,3}	E₇/A₆ = 72*8!/7! = 576
A₃A₂A₁	{ }	f₁	2	10080	12	12	18	4	12	12	6	12	3	4	3	{3,3}×{3}	E₇/A₃A₂A₁ = 72*8!/4!/3!/2 = 10080
A₂A₂A₁	{3}	f₂	3	3	40320	2	3	1	6	3	3	6	1	3	2	{ }∨{3}	E₇/A₂A₂A₁ = 72*8!/3!/3!/2 = 40320
A₃A₂	{3,3}	f₃	4	6	4	20160	*	1	3	0	3	3	0	3	1	{3}∨( )	E₇/A₃A₂ = 72*8!/4!/3! = 20160
A₃A₁A₁	{3,3}	f₃	4	6	4	*	30240	0	2	2	1	4	1	2	2	Phyllic disphenoid	E₇/A₃A₁A₁ = 72*8!/4!/4 = 30240
A₄A₂	{3,3,3}	f₄	5	10	10	5	0	4032	*	*	3	0	0	3	0	{3}	E₇/A₄A₂ = 72*8!/5!/3! = 4032
D₄A₁	{3,3,4}		8	24	32	8	8	*	7560	*	1	2	0	2	1	{ }∨( )	E₇/D₄A₁ = 72*8!/8/4!/2 = 7560
A₄A₁	{3,3,3}		5	10	10	0	5	*	*	12096	0	2	1	1	2	{ }∨( )	E₇/A₄A₁ = 72*8!/5!/2 = 12096
D₅A₁	h{4,3,3,3}	f₅	16	80	160	80	40	16	10	0	756	*	*	2	0	{ }	E₇/D₅A₁ = 72*8!/16/5!/2 = 756
D₅	h{4,3,3,3}		16	80	160	40	80	0	10	16	*	1512	*	1	1		E₇/D₅ = 72*8!/16/5! = 1512
A₅A₁	{3,3,3,3,3}		6	15	20	0	15	0	0	6	*	*	2016	0	2		E₇/A₅A₁ = 72*8!/6!/2 = 2016
E₆	{3,3^2,2}	f₆	72	720	2160	1080	1080	216	270	216	27	27	0	56	*	( )	E₇/E₆ = 72*8!/72/6! = 56
D₆	h{4,3,3,3,3}	f₆	32	240	640	160	480	0	60	192	0	12	32	*	126	( )	E₇/D₆ = 72*8!/32/6! = 126

0_321 edit

Example on rectified 1_32 polytope:

E₇	k-face	f_k	f₀	f₁	f₂			f₃					f₄						f₅					f₆			k-fig	notes
A₃A₂A₁	( )	f₀	10080	24	24	12	36	8	12	36	18	24	4	12	18	24	12	6	6	8	12	6	3	4	2	3	{3,3}×{3}×{ }	E₇/A₃A₂A₁ = 72*8!/4!/3!/2 = 10080
A₂A₁A₁	{ }	f₁	2	120960	2	1	3	1	2	6	3	3	1	3	6	6	3	1	3	3	6	2	1	3	1	2	( )∨{3}∨{ }	E₇/A₂A₁A₁ = 72*8!/3!/4 = 120960
A₂A₂	0₁	f₂	3	3	80640	*	*	1	1	3	0	0	1	3	3	3	0	0	3	3	3	1	0	3	1	1	{3}∨( )∨( )	E₇/A₂A₂ = 72*8!/3!/3! = 80640
A₂A₂A₁			3	3	*	40320	*	0	2	0	3	0	1	0	6	0	3	0	3	0	6	0	1	3	0	2	{3}∨{ }	E₇/A₂A₂A₁ = 72*8!/3!/3!/2 = 40320
A₂A₁A₁			3	3	*	*	120960	0	0	2	1	2	0	1	2	4	2	1	1	2	4	2	1	2	1	2	{ }∨{ }∨( )	E₇/A₂A₁A₁ = 72*8!/3!/4 = 120960
A₃A₂	0₂	f₃	4	6	4	0	0	20160	*	*	*	*	1	3	0	0	0	0	3	3	0	0	0	3	1	0	{3}∨( )	E₇/A₃A₂ = 72*8!/4!/3! = 20160
A₃A₂	0₁₁		6	12	4	4	0	*	20160	*	*	*	1	0	3	0	0	0	3	0	3	0	0	3	0	1	{3}∨( )	E₇/A₃A₂ = 72*8!/4!/3! = 20160
A₃A₁			6	12	4	0	4	*	*	60480	*	*	0	1	1	2	0	0	1	2	2	1	0	2	1	1	Sphenoid	E₇/A₃A₁ = 72*8!/4!/2 = 60480
A₃A₁A₁			6	12	0	4	4	*	*	*	30240	*	0	0	2	0	2	0	1	0	4	0	1	2	0	2	{ }∨{ }	E₇/A₃A₁A₁ = 72*8!/4!/2/2 = 30240
A₃A₁	0₂		4	6	0	0	4	*	*	*	*	60480	0	0	0	2	1	1	0	1	2	2	1	1	1	2	Sphenoid	E₇/A₃A₁ = 72*8!/4!/2 = 60480
A₄A₂	0₂₁	f₄	10	30	20	10	0	5	5	0	0	0	4032	*	*	*	*	*	3	0	0	0	0	3	0	0	{3}	E₇/A₄A₂ = 72*8!/5!/3! = 4032
A₄A₁	0₂₁		10	30	20	0	10	5	0	5	0	0	*	12096	*	*	*	*	1	2	0	0	0	2	1	0	{ }∨()	E₇/A₄A₁ = 72*8!/5!/2 = 12096
D₄A₁	0₁₁₁		24	96	32	32	32	0	8	8	8	0	*	*	7560	*	*	*	1	0	2	0	0	2	0	1	{ }∨()	E₇/D₄A₁ = 72*8!/8/4!/2 = 7560
A₄	0₂₁		10	30	10	0	20	0	0	5	0	5	*	*	*	24192	*	*	0	1	1	1	0	1	1	1	( )∨( )∨( )	E₇/A₄ = 72*8!/5! = 34192
A₄A₁	0₂₁		10	30	0	10	20	0	0	0	5	5	*	*	*	*	12096	*	0	0	2	0	1	1	0	2	{ }∨()	E₇/A₄A₁ = 72*8!/5!/2 = 12096
A₄A₁	0₃		5	10	0	0	10	0	0	0	0	5	*	*	*	*	*	12096	0	0	0	2	1	0	1	2	{ }∨()	E₇/A₄A₁ = 72*8!/5!/2 = 12096
D₅A₁	0₂₁₁	f₅	80	480	320	160	160	80	80	80	40	0	16	16	10	0	0	0	756	*	*	*	*	2	0	0	{ }	E₇/D₅A₁ = 72*8!/16/5!/2 = 756
A₅	0₂₂		20	90	60	0	60	15	0	30	0	15	0	6	0	6	0	0	*	4032	*	*	*	1	1	0		E₇/A₅ = 72*8!/6! = 4032
D₅	0₂₁₁		80	480	160	160	320	0	40	80	80	80	0	0	10	16	16	0	*	*	1512	*	*	1	0	1		E₇/D₅ = 72*8!/16/5! = 1512
A₅	0₃₁		15	60	20	0	60	0	0	15	0	30	0	0	0	6	0	6	*	*	*	4032	*	0	1	1		E₇/A₅ = 72*8!/6! = 4032
A₅A₁	0₃₁		15	60	0	20	60	0	0	0	15	30	0	0	0	0	6	6	*	*	*	*	2016	0	0	2		E₇/A₅A₁ = 72*8!/6!/2 = 2016
E₆	0₂₂₁	f₆	720	6480	4320	2160	4320	1080	1080	2160	1080	1080	216	432	270	432	216	0	27	72	27	0	0	56	*	*	( )	E₇/E₆ = 72*8!/72/6! = 56
A₆	0₃₂		35	210	140	0	210	35	0	105	0	105	0	21	0	42	0	21	0	7	0	7	0	*	576	*		E₇/A₆ = 72*8!/7! = 576
D₆	0₃₁₁		240	1920	640	640	1920	0	160	480	480	960	0	0	60	192	192	192	0	0	12	32	32	*	*	126		E₇/D₆ = 72*8!/32/6! = 126

8-polytopes edit

8-cube edit

Example on 8-cube. A regular n-polytope will have n types of elements, one for each dimension.

B₈	k-face	f_k	f₀	f₁	f₂	f₃	f₄	f₅	f₆	f₇	k-fig	notes
A₇	( )	f₀	256	8	28	56	70	56	28	8	{3,3,3,3,3,3}	B₈/A₇ = 2^8*8!/8! = 256
A₆A₁	{ }	f₁	2	1024	7	21	35	35	21	7	{3,3,3,3,3}	B₈/A₆A₁ = 2^8*8!/7!/2 = 1024
A₅B₂	{4}	f₂	4	4	1792	6	15	20	15	6	{3,3,3,3}	B₈/A₅B₂ = 2^8*8!/6!/4/2 = 1792
A₄B₃	{4,3}	f₃	8	12	6	1792	5	10	10	5	{3,3,3}	B₈/A₄B₃ = 2^8*8!/5!/8/3! = 1792
A₃B₄	{4,3,3}	f₄	16	32	24	8	1120	4	6	4	{3,3}	B₈/A₃B₄ = 2^8*8!/4!/2^4/4! = 1120
A₂B₅	{4,3,3,3}	f₅	32	80	80	40	10	448	3	3	{3}	B₈/A₂B₅ = 2^8*8!/3!/2^5/5! = 448
A₁B₆	{4,3,3,3,3}	f₆	64	192	240	160	60	12	112	2	{ }	B₈/A₁B₆ = 2^8*8!/2/2^6/6!= 112
B₇	{4,3,3,3,3,3}	f₇	128	448	672	560	280	84	14	16	( )	B₈/B₇ = 2^8*8!/2^7/7! = 16

8-orthoplex edit

B₈	k-face	f_k	f₀	f₁	f₂	f₃	f₄	f₅	f₆	f₇	k-fig	notes
B₇	( )	f₀	16	14	84	280	560	672	448	128	{3,3,3,3,3,4}	B₈/B₇ = 2^8*8!/2^7/7! = 16
A₁B₆	{ }	f₁	2	112	12	60	160	240	192	64	{3,3,3,3,4}	B₈/A₁B₆ = 2^8*8!/2/2^6/6! = 112
A₂B₅	{3}	f₂	3	3	448	10	40	80	80	32	{3,3,3,4}	B₈/A₂B₅ = 2^8*8!/3!/2^5/5! = 448
A₃B₄	{3,3}	f₃	4	6	4	1120	8	24	32	16	{3,3,4}	B₈/A₃B₄ = 2^8*8!/4!/2^4/4! = 1120
A₄B₃	{3,3,3}	f₄	5	10	10	5	1792	6	12	8	{3,4}	B₈/A₄B₃ = 2^8*8!/5!/8/3! = 1792
A₅B₂	{3,3,3,3}	f₅	6	15	20	15	6	1792	4	4	{4}	B₈/A₅B₂ = 2^8*8!/6!/4/2 = 1792
A₆A₁	{3,3,3,3,3}	f₆	7	21	35	35	21	7	1024	2	{ }	B₈/A₆A₁ = 2^8*8!/7!/2 = 1024
A₇	{3,3,3,3,3,3}	f₇	8	28	56	70	56	28	8	256	( )	B₈/A₇ = 2^8*8!/8! = 256

4_21 edit

Example on 4_21 polytope:

E₈	k-face	f_k	f₀	f₁	f₂	f₃	f₄	f₅	f₆		f₇		k-fig	notes
E₇	( )	f₀	240	56	756	4032	10080	12096	4032	2016	576	126	3₂₁	E₈/E₇ = 192x10!/72x8! = 240
A₁E₆	{ }	f₁	2	6720	27	216	720	1080	432	216	72	27	2₂₁	E₈/A₁E₆ = 192x10!/2/72x6! = 6720
A₂D₅	{3}	f₂	3	3	60480	16	80	160	80	40	16	10	1₂₁	E₈/A₂D₅ = 192x10!/6/2^4/5! = 60480
A₃A₄	{3,3}	f₃	4	6	4	241920	10	30	20	10	5	5	0₂₁	E₈/A₃A₄ = 192x10!/4!/5! = 241920
A₄A₂A₁	{3,3,3}	f₄	5	10	10	5	483840	6	6	3	2	3	{3}×{ }	E₈/A₄A₂A₁ = 192x10!/5!/3!/2 = 483840
A₅A₁	{3,3,3,3}	f₅	6	15	20	15	6	483840	2	1	1	2	{ }∨( )	E₈/A₅A₁ = 192x10!/6!/2 = 483840
A₆	{3,3,3,3,3}	f₆	7	21	35	35	21	7	138240	*	1	1	{ }	E₈/A₆ = 192x10!/7! = 138240
A₆A₁	{3,3,3,3,3}	f₆	7	21	35	35	21	7	*	69120	0	2	{ }	E₈/A₆A₁ = 192x10!/7!/2 = 69120
A₇	{3,3,3,3,3,3}	f₇	8	28	56	70	56	28	8	0	17280	*	( )	E₈/A₇ = 192x10!/8! = 17280
D₇	{3,3,3,3,3,4}	f₇	14	84	280	560	672	448	64	64	*	2160	( )	E₈/D₇ = 192x10!/2^6/7! = 2160

2_41 edit

Example on 2_41 polytope:

E₈	k-face	f_k	f₀	f₁	f₂	f₃	f₄		f₅		f₆		f₇		k-fig	notes
D₇	( )	f₀	2160	64	672	2240	560	2240	280	1344	84	448	14	64	h{4,3,3,3,3,3}	E₈/D₇ = 192*10!/64/7! = 2160
A₆A₁	{ }	f₁	2	69120	21	105	35	140	35	105	21	42	7	7	r{3,3,3,3,3}	E₈/A₆A₁ = 192*10!/7!/2 = 69120
A₄A₂A₁	{3}	f₂	3	3	483840	10	5	20	10	20	10	10	5	2	{}×{3,3,3}	E₈/A₄A₂A₁ = 192*10!/5!/3!/2 = 483840
A₃A₃	{3,3}	f₃	4	6	4	1209600	1	4	4	6	6	4	4	1	{3,3}∨( )	E₈/A₃A₃ = 192*10!/4!/4! = 1209600
A₄A₃	{3,3,3}	f₄	5	10	10	5	241920	*	4	0	6	0	4	0	{3,3}	E₈/A₄A₃ = 192*10!/5!/4! = 241920
A₄A₂	{3,3,3}	f₄	5	10	10	5	*	967680	1	3	3	3	3	1	{3}∨( )	E₈/A₄A₂ = 192*10!/5!/3! = 967680
D₅A₂	{3,3,3^1,1}	f₅	10	40	80	80	16	16	60480	*	3	0	3	0	{3}	E₈/D₅A₂ = 192*10!/16/5!/2 = 40480
A₅A₁	{3,3,3,3}	f₅	6	15	20	15	0	6	*	483840	1	2	2	1	{ }∨( )	E₈/A₅A₁ = 192*10!/6!/2 = 483840
E₆A₁	{3,3,3^2,1}	f₆	27	216	720	1080	216	432	27	72	6720	*	2	0	{ }	E₈/E₆A₁ = 192*10!/72/6! = 6720
A₆	{3,3,3,3,3}	f₆	7	21	35	35	0	21	0	7	*	138240	1	1	{ }	E₈/A₆ = 192*10!/7! = 138240
E₇	{3,3,3^3,1}	f₇	126	2016	10080	20160	4032	12096	756	4032	56	576	240	*	( )	E₈/E₇ = 192*10!/72!/8! = 240
A₇	{3,3,3,3,3,3}	f₇	8	28	56	70	0	56	0	28	0	8	*	17280	( )	E₈/A₇ = 192*10!/8! = 17280

1_42 edit

Example on 1_42 polytope:

E₈	k-face	f_k	f₀	f₁	f₂	f₃		f₄			f₅			f₆			f₇		k-fig	notes
A₇	( )	f₀	17280	56	420	280	560	70	280	420	56	168	168	28	56	28	8	8	2r{3⁶}	^{[note 1]}
A₄A₂A₁	{ }	f₁	2	483840	15	15	30	5	30	30	10	30	15	10	15	3	5	3	{3}×{3,3,3}	^{[note 2]}
A₃A₂A₁	{3}	f₂	3	3	2419200	2	4	1	8	6	4	12	4	6	8	1	4	2	{3.3}∨{ }	^{[note 3]}
A₃A₃	{3,3}	f₃	4	6	4	1209600	*	1	4	0	4	6	0	6	4	0	4	1	{3,3}∨( )	^{[note 4]}
A₃A₂A₁	{3,3}	f₃	4	6	4	*	2419200	0	2	3	1	6	3	3	6	1	3	2	{3}∨{ }	^{[note 5]}
A₄A₃	{3,3^2,0}	f₄	5	10	10	5	0	241920	*	*	4	0	0	6	0	0	4	0	{3,3}	^{[note 6]}
D₄A₂	{3,3^1,1}		8	24	32	8	8	*	604800	*	1	3	0	3	3	0	3	1	{3}∨( )	^{[note 7]}
A₄A₁A₁	{3,3^2,0}		5	10	10	0	5	*	*	1451520	0	2	2	1	4	1	2	2	{ }∨{ }	^{[note 8]}
D₅A₂	{3,3^2,1}	f₅	16	80	160	80	40	16	10	0	60480	*	*	3	0	0	3	0	{3}	^{[note 9]}
D₅A₁	{3,3^2,1}		16	80	160	40	80	0	10	16	*	181440	*	1	2	0	2	1	{ }∨( )	^{[note 10]}
A₅A₁	{3,3^3,0}		6	15	20	0	15	0	0	6	*	*	483840	0	2	1	1	2	{ }∨( )	^{[note 11]}
E₆A₁	{3,3^2,2}	f₆	72	720	2160	1080	1080	216	270	216	27	27	0	6720	*	*	2	0	{ }	^{[note 12]}
D₆	{3,3^3,1}		32	240	640	160	480	0	60	192	0	12	32	*	30240	*	1	1		^{[note 13]}
A₆A₁	{3,3^4,0}		7	21	35	0	35	0	0	21	0	0	7	*	*	69120	0	2		^{[note 14]}
E₇	{3,3^3,2}	f₇	576	10080	40320	20160	30240	4032	7560	12096	756	1512	2016	56	126	0	240	*	( )	^{[note 15]}
D₇	{3,3^4,1}	f₇	64	672	2240	560	2240	0	280	1344	0	84	448	0	14	64	*	2160	( )	^{[note 16]}

Notes edit

^ E₈/A₇ = 192*10!/8! = 17280
^ E₈/A₄A₂A₁ = 192*10!/5!/4 = 483840
^ E₈/A₃A₂A₁ = 192*10!/4!/3!/2 = 2419200
^ E₈/A₃A₃ = 192*10!/4!/4! = 1209600
^ E₈/A₃A₂A₁ = 192*10!/4!/3!/2 = 2419200
^ E₈/A₄A₃ = 192*10!/4!/4! = 241920
^ E₈/D₄A₂ = 192*10!/8/4!/3! = 604800
^ E₈/A₄A₁A₁ = 192*10!/5!/4 = 1451520
^ E₈/D₅A₂ = 192*10!/16/5!/3! = 40480
^ E₈/D₅A₁ = 192*10!/16/5!/2 = 181440
^ E₈/A₅A₁ = 192*10!/6!/2 = 483840
^ E₈/E₆A₁ = 192*10!/72/6!/2 = 6720
^ E₈/D₆ = 192*10!/32/6! = 30240
^ E₈/A₆A₁ = 192*10!/7!/2 = 69120
^ E₈/E₇ = 192*10!/72/8! = 240
^ E₈/D₇ = 192*10!/64/7! = 2160

0_421 edit

Example on rectified 1_42 polytope:

E₈	k-face	f_k	f₀	f₁	f₂			f₃					f₄						f₅						f₆					f₇			k-fig
A₄A₂A₁	( )	f₀	483840	30	30	15	60	10	15	60	30	60	5	20	30	60	30	30	10	20	30	30	15	6	10	10	15	6	3	5	2	3	{3,3,3}×{3,3}×{}
A₃A₁A₁	{ }	f₁	2	7257600	2	1	4	1	2	8	4	6	1	4	8	12	6	4	4	6	12	8	4	1	6	4	8	2	1	4	1	2
A₃A₂	{3}	f₂	3	3	4838400	*	*	1	1	4	0	0	1	4	4	6	0	0	4	6	6	4	0	0	6	4	4	1	0	4	1	1
A₃A₂A₁			3	3	*	2419200	*	0	2	0	4	0	1	0	8	0	6	0	4	0	12	0	4	0	6	0	8	0	1	4	0	2
A₂A₂A₁			3	3	*	*	9676800	0	0	2	1	3	0	1	2	6	3	3	1	3	6	6	3	1	3	3	6	2	1	3	1	2
A₃A₃	0₂₀₀	f₃	4	6	4	0	0	1209600	*	*	*	*	1	4	0	0	0	0	4	6	0	0	0	0	6	4	0	0	0	4	1	0
A₃A₃	0₁₁₀		6	12	4	4	0	*	1209600	*	*	*	1	0	4	0	0	0	4	0	6	0	0	0	6	0	4	0	0	4	0	1
A₃A₂			6	12	4	0	4	*	*	4838400	*	*	0	1	1	3	0	0	1	3	3	3	0	0	3	3	3	1	0	3	1	1
A₃A₂A₁			6	12	0	4	4	*	*	*	2419200	*	0	0	2	0	3	0	1	0	6	0	3	0	3	0	6	0	1	3	0	2
A₃A₁A₁	0₂₀₀		4	6	0	0	4	*	*	*	*	7257600	0	0	0	2	1	2	0	1	2	4	2	1	1	2	4	2	1	2	1	2
A₄A₃	0₂₁₀	f₄	10	30	20	10	0	5	5	0	0	0	241920	*	*	*	*	*	4	0	0	0	0	0	6	0	0	0	0	4	0	0
A₄A₂	0₂₁₀		10	30	20	0	10	5	0	5	0	0	*	967680	*	*	*	*	1	3	0	0	0	0	3	3	0	0	0	3	1	0
D₄A₂	0₁₁₁		24	96	32	32	32	0	8	8	8	0	*	*	604800	*	*	*	1	0	3	0	0	0	3	0	3	0	0	3	0	1
A₄A₁	0₂₁₀		10	30	10	0	20	0	0	5	0	5	*	*	*	2903040	*	*	0	1	1	2	0	0	1	2	2	1	0	2	1	1
A₄A₁A₁	0₂₁₀		10	30	0	10	20	0	0	0	5	5	*	*	*	*	1451520	*	0	0	2	0	2	0	1	0	4	0	1	2	0	2
A₄A₁	0₃₀₀		5	10	0	0	10	0	0	0	0	5	*	*	*	*	*	2903040	0	0	0	2	1	1	0	1	2	2	1	1	1	2
D₅A₂	0₂₁₁	f₅	80	480	320	160	160	80	80	80	40	0	16	16	10	0	0	0	60480	*	*	*	*	*	3	0	0	0	0	3	0	0	{3}
A₅A₁	0₂₂₀		20	90	60	0	60	15	0	30	0	15	0	6	0	6	0	0	*	483840	*	*	*	*	1	2	0	0	0	2	1	0	{ }∨()
D₅A₁	0₂₁₁		80	480	160	160	320	0	40	80	80	80	0	0	10	16	16	0	*	*	181440	*	*	*	1	0	2	0	0	2	0	1	{ }∨()
A₅	0₃₁₀		15	60	20	0	60	0	0	15	0	30	0	0	0	6	0	6	*	*	*	967680	*	*	0	1	1	1	0	1	1	1	( )∨( )∨()
A₅A₁	0₃₁₀		15	60	0	20	60	0	0	0	15	30	0	0	0	0	6	6	*	*	*	*	483840	*	0	0	2	0	1	1	0	2	{ }∨()
A₅A₁	0₄₀₀		6	15	0	0	20	0	0	0	0	15	0	0	0	0	0	6	*	*	*	*	*	483840	0	0	0	2	1	0	1	2	{ }∨()
E₆A₁	0₂₂₁	f₆	720	6480	4320	2160	4320	1080	1080	2160	1080	1080	216	432	270	432	216	0	27	72	27	0	0	0	6720	*	*	*	*	2	0	0	{ }
A₆	0₃₂₀		35	210	140	0	210	35	0	105	0	105	0	21	0	42	0	21	0	7	0	7	0	0	*	138240	*	*	*	1	1	0
D₆	0₃₁₁		240	1920	640	640	1920	0	160	480	480	960	0	0	60	192	192	192	0	0	12	32	32	0	*	*	30240	*	*	1	0	1
A₆	0₄₁₀		21	105	35	0	140	0	0	35	0	105	0	0	0	21	0	42	0	0	0	7	0	7	*	*	*	138240	*	0	1	1
A₆A₁	0₄₁₀		21	105	0	35	140	0	0	0	35	105	0	0	0	0	21	42	0	0	0	0	7	7	*	*	*	*	69120	0	0	2
E₇	0₃₂₁	f₇	10080	120960	80640	40320	120960	20160	20160	60480	30240	60480	4032	12096	7560	24192	12096	12096	756	4032	1512	4032	2016	0	56	576	126	0	0	240	*	*	( )
A₇	0₄₂₀		56	420	280	0	560	70	0	280	0	420	0	56	0	168	0	168	0	28	0	56	0	28	0	8	0	8	0	*	17280	*
D₇	0₄₁₁		672	6720	2240	2240	8960	0	560	2240	2240	6720	0	0	280	1344	1344	2688	0	0	84	448	448	448	0	0	14	64	64	*	*	2160

References edit

^ Klitzing, Richard. "3D convex uniform polyhedra x3o3o - tet".
^ Klitzing, Richard. "3D convex uniform polyhedra x3o5o - ike".
^ Klitzing, Richard. "3D convex uniform polyhedra o3o5x - doe".
^ Klitzing, Richard. "3D convex uniform polyhedra x5/2o5o - sissid".
^ Klitzing, Richard. "3D convex uniform polyhedra x3o4o - oct".
^ Klitzing, Richard. "3D convex uniform polyhedra o3o4x - cube".
^ Klitzing, Richard. "3D convex uniform polyhedra o5/2o3x - gike".
^ Klitzing, Richard. "3D convex uniform polyhedra x5/2o3o - gissid".
^ Klitzing, Richard. "3D convex uniform polyhedra o5/2o5x - gad".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x3o - oct".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x4x - tut".
^ Klitzing, Richard. "3D convex uniform polyhedra x3o3x - co".
^ Klitzing, Richard. "3D convex uniform polyhedra x3x3x - toe".
^ Klitzing, Richard. "3D convex uniform polyhedra s3s3s - ike".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x4o - co".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x4x - toe".
^ Klitzing, Richard. "3D convex uniform polyhedra x3x4o - toe".
^ Klitzing, Richard. "3D convex uniform polyhedra x3o4x - sirco".
^ Klitzing, Richard. "3D convex uniform polyhedra x3x4x - girco".
^ Klitzing, Richard. "3D convex uniform polyhedra s3s4s - snic".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x5o - id".
^ Klitzing, Richard. "3D convex uniform polyhedra o3x5x - ti".
^ Klitzing, Richard. "3D convex uniform polyhedra x3x5o - tid".
^ Klitzing, Richard. "3D convex uniform polyhedra x3o5x - srid".
^ Klitzing, Richard. "3D convex uniform polyhedra x3x5x - grid".
^ Klitzing, Richard. "3D convex uniform polyhedra s3s5s - snid".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o3o - pen".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o4o - hex".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o5o - ex".
^ Klitzing, Richard. "4D convex uniform polychora o3o3o5x - hi".
^ Klitzing, Richard. "4D convex uniform polychora x3o4o3o - ico".
^ Klitzing, Richard. "4D convex uniform polychora o3o3o4x - tes".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o5/2o - gax".
^ Klitzing, Richard. "4D convex uniform polychora o3o3/2o5/2x - gogishi".
^ Klitzing, Richard. "4D convex uniform polychora o5o3o5/2x - gishi".
^ Klitzing, Richard. "4D convex uniform polychora x3o5o5/2o - fix".
^ Klitzing, Richard. "4D convex uniform polychora o3o5o5/2x - sishi".
^ Klitzing, Richard. "4D convex uniform polychora x5o5/2o5o - gohi".
^ Klitzing, Richard. "4D convex uniform polychora x5o3o5/2o - gahi".
^ Klitzing, Richard. "4D convex uniform polychora x3o5/2o5o - gofix".
^ Klitzing, Richard. "4D convex uniform polychora o3o5/2o5x - gaghi".
^ Klitzing, Richard. "4D convex uniform polychora x5/2o5o5/2o - gashi".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o3o - pen".
^ Klitzing, Richard. "4D convex uniform polychora x3o3o *b3o - hex".
^ Klitzing, Richard. "4D convex uniform polychora o3x3o *b3o - ico".
^ Klitzing, Richard. "5D convex uniform polytera x3o3o3o3o - hix".
^ Klitzing, Richard. "5D convex uniform polytera x3o3o3o4o - tac".
^ Klitzing, Richard. "5D convex uniform polytera o3o3o3o4x - pent".
^ Klitzing, Richard. "5D convex uniform polytera x3o3o3o3o - hix".
^ Klitzing, Richard. "5D convex uniform polytera x3o3o *b3o3o - hin".
^ Klitzing, Richard. "5D convex uniform polytera o3x3o3o3o - rix".
^ Klitzing, Richard. "5D convex uniform polytera o3o3x3o3o - dot".
^ Klitzing, Richard. "5D convex uniform polytera o3x3o *b3o3o - nit".
^ Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o3o - hop".
^ Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o4o - gee".
^ Klitzing, Richard. "6D convex uniform polypeta o3o3o3o3o4x - ax".
^ Klitzing, Richard. "6D convex uniform polypeta x3o3o *b3o3o3o - hax".
^ Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o *c3o - jak".
^ Klitzing, Richard. "6D convex uniform polypeta o3o3o3o3o *c3x - mo".
^ Klitzing, Richard. "6D convex uniform polypeta o3x3o3o3o3o - ril".
^ Klitzing, Richard. "6D convex uniform polypeta o3o3x3o3o3o - bril".
^ Klitzing, Richard. "6D convex uniform polypeta o3o3x3o3o *c3o - ram".
^ Klitzing, Richard. "7D convex uniform polyexa x3o3o3o3o3o3o - oca".
^ Klitzing, Richard. "7D convex uniform polyexa x3o3o3o3o3o4o - zee".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3o3o3o3o4x - hept".
^ Klitzing, Richard. "7D convex uniform polyexa x3o3o *b3o3o3o3o - hesa".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3o3o *c3o3o3x - naq".
^ Klitzing, Richard. "7D convex uniform polyexa x3o3o3o *c3o3o3o - laq".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3o3x *c3o3o3o - lin".
^ Klitzing, Richard. "7D convex uniform polyexa o3x3o3o3o3o3o - roc".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3x3o3o3o3o - broc".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3o3x3o3o3o - he".
^ Klitzing, Richard. "7D convex uniform polyexa o3o3x3o *c3o3o3o - rolin".
^ Klitzing, Richard. "8D convex uniform polyzetta x3o3o3o3o3o3o3o - ene".
^ Klitzing, Richard. "8D convex uniform polyzettxa x3o3o3o3o3o3o4o - ek".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3o3o3o3o3o4x - octa".
^ Klitzing, Richard. "8D convex uniform polyzetta x3o3o *b3o3o3o3o3o - hocta".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3o3o *c3o3o3o3x - fy".
^ Klitzing, Richard. "8D convex uniform polyzetta x3o3o3o *c3o3o3o3o - bay".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3o3x *c3o3o3o3o - bif".
^ Klitzing, Richard. "8D convex uniform polyzetta o3x3o3o3o3o3o3o - rene".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3x3o3o3o3o3o - brene".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3o3x3o3o3o3o - trene".
^ Klitzing, Richard. "8D convex uniform polyzetta o3o3x3o *c3o3o3o3o - buffy".

[85] E₈/A₇ = 192*10!/8! = 17280

[86] E₈/A₄A₂A₁ = 192*10!/5!/4 = 483840

[87] E₈/A₃A₂A₁ = 192*10!/4!/3!/2 = 2419200

[88] E₈/A₃A₃ = 192*10!/4!/4! = 1209600

[89] E₈/A₃A₂A₁ = 192*10!/4!/3!/2 = 2419200

[90] E₈/A₄A₃ = 192*10!/4!/4! = 241920

[91] E₈/D₄A₂ = 192*10!/8/4!/3! = 604800

[92] E₈/A₄A₁A₁ = 192*10!/5!/4 = 1451520

[93] E₈/D₅A₂ = 192*10!/16/5!/3! = 40480

[94] E₈/D₅A₁ = 192*10!/16/5!/2 = 181440

[95] E₈/A₅A₁ = 192*10!/6!/2 = 483840

[96] E₈/E₆A₁ = 192*10!/72/6!/2 = 6720

[97] E₈/D₆ = 192*10!/32/6! = 30240

[98] E₈/A₆A₁ = 192*10!/7!/2 = 69120

[99] E₈/E₇ = 192*10!/72/8! = 240

[100] E₈/D₇ = 192*10!/64/7! = 2160

[1] Klitzing, Richard. "3D convex uniform polyhedra x3o3o - tet".

[2] Klitzing, Richard. "3D convex uniform polyhedra x3o5o - ike".

[3] Klitzing, Richard. "3D convex uniform polyhedra o3o5x - doe".

[4] Klitzing, Richard. "3D convex uniform polyhedra x5/2o5o - sissid".

[5] Klitzing, Richard. "3D convex uniform polyhedra x3o4o - oct".

[6] Klitzing, Richard. "3D convex uniform polyhedra o3o4x - cube".

[7] Klitzing, Richard. "3D convex uniform polyhedra o5/2o3x - gike".

[8] Klitzing, Richard. "3D convex uniform polyhedra x5/2o3o - gissid".

[9] Klitzing, Richard. "3D convex uniform polyhedra o5/2o5x - gad".

[10] Klitzing, Richard. "3D convex uniform polyhedra o3x3o - oct".

[11] Klitzing, Richard. "3D convex uniform polyhedra o3x4x - tut".

[12] Klitzing, Richard. "3D convex uniform polyhedra x3o3x - co".

[13] Klitzing, Richard. "3D convex uniform polyhedra x3x3x - toe".

[14] Klitzing, Richard. "3D convex uniform polyhedra s3s3s - ike".

[15] Klitzing, Richard. "3D convex uniform polyhedra o3x4o - co".

[16] Klitzing, Richard. "3D convex uniform polyhedra o3x4x - toe".

[17] Klitzing, Richard. "3D convex uniform polyhedra x3x4o - toe".

[18] Klitzing, Richard. "3D convex uniform polyhedra x3o4x - sirco".

[19] Klitzing, Richard. "3D convex uniform polyhedra x3x4x - girco".

[20] Klitzing, Richard. "3D convex uniform polyhedra s3s4s - snic".

[21] Klitzing, Richard. "3D convex uniform polyhedra o3x5o - id".

[22] Klitzing, Richard. "3D convex uniform polyhedra o3x5x - ti".

[23] Klitzing, Richard. "3D convex uniform polyhedra x3x5o - tid".

[24] Klitzing, Richard. "3D convex uniform polyhedra x3o5x - srid".

[25] Klitzing, Richard. "3D convex uniform polyhedra x3x5x - grid".

[26] Klitzing, Richard. "3D convex uniform polyhedra s3s5s - snid".

[27] Klitzing, Richard. "4D convex uniform polychora x3o3o3o - pen".

[28] Klitzing, Richard. "4D convex uniform polychora x3o3o4o - hex".

[29] Klitzing, Richard. "4D convex uniform polychora x3o3o5o - ex".

[30] Klitzing, Richard. "4D convex uniform polychora o3o3o5x - hi".

[31] Klitzing, Richard. "4D convex uniform polychora x3o4o3o - ico".

[32] Klitzing, Richard. "4D convex uniform polychora o3o3o4x - tes".

[33] Klitzing, Richard. "4D convex uniform polychora x3o3o5/2o - gax".

[34] Klitzing, Richard. "4D convex uniform polychora o3o3/2o5/2x - gogishi".

[35] Klitzing, Richard. "4D convex uniform polychora o5o3o5/2x - gishi".

[36] Klitzing, Richard. "4D convex uniform polychora x3o5o5/2o - fix".

[37] Klitzing, Richard. "4D convex uniform polychora o3o5o5/2x - sishi".

[38] Klitzing, Richard. "4D convex uniform polychora x5o5/2o5o - gohi".

[39] Klitzing, Richard. "4D convex uniform polychora x5o3o5/2o - gahi".

[40] Klitzing, Richard. "4D convex uniform polychora x3o5/2o5o - gofix".

[41] Klitzing, Richard. "4D convex uniform polychora o3o5/2o5x - gaghi".

[42] Klitzing, Richard. "4D convex uniform polychora x5/2o5o5/2o - gashi".

[43] Klitzing, Richard. "4D convex uniform polychora x3o3o3o - pen".

[44] Klitzing, Richard. "4D convex uniform polychora x3o3o *b3o - hex".

[45] Klitzing, Richard. "4D convex uniform polychora o3x3o *b3o - ico".

[46] Klitzing, Richard. "5D convex uniform polytera x3o3o3o3o - hix".

[47] Klitzing, Richard. "5D convex uniform polytera x3o3o3o4o - tac".

[48] Klitzing, Richard. "5D convex uniform polytera o3o3o3o4x - pent".

[49] Klitzing, Richard. "5D convex uniform polytera x3o3o3o3o - hix".

[50] Klitzing, Richard. "5D convex uniform polytera x3o3o *b3o3o - hin".

[51] Klitzing, Richard. "5D convex uniform polytera o3x3o3o3o - rix".

[52] Klitzing, Richard. "5D convex uniform polytera o3o3x3o3o - dot".

[53] Klitzing, Richard. "5D convex uniform polytera o3x3o *b3o3o - nit".

[54] Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o3o - hop".

[55] Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o4o - gee".

[56] Klitzing, Richard. "6D convex uniform polypeta o3o3o3o3o4x - ax".

[57] Klitzing, Richard. "6D convex uniform polypeta x3o3o *b3o3o3o - hax".

[58] Klitzing, Richard. "6D convex uniform polypeta x3o3o3o3o *c3o - jak".

[59] Klitzing, Richard. "6D convex uniform polypeta o3o3o3o3o *c3x - mo".

[60] Klitzing, Richard. "6D convex uniform polypeta o3x3o3o3o3o - ril".

[61] Klitzing, Richard. "6D convex uniform polypeta o3o3x3o3o3o - bril".

[62] Klitzing, Richard. "6D convex uniform polypeta o3o3x3o3o *c3o - ram".

[63] Klitzing, Richard. "7D convex uniform polyexa x3o3o3o3o3o3o - oca".

[64] Klitzing, Richard. "7D convex uniform polyexa x3o3o3o3o3o4o - zee".

[65] Klitzing, Richard. "7D convex uniform polyexa o3o3o3o3o3o4x - hept".

[66] Klitzing, Richard. "7D convex uniform polyexa x3o3o *b3o3o3o3o - hesa".

[67] Klitzing, Richard. "7D convex uniform polyexa o3o3o3o *c3o3o3x - naq".

[68] Klitzing, Richard. "7D convex uniform polyexa x3o3o3o *c3o3o3o - laq".

[69] Klitzing, Richard. "7D convex uniform polyexa o3o3o3x *c3o3o3o - lin".

[70] Klitzing, Richard. "7D convex uniform polyexa o3x3o3o3o3o3o - roc".

[71] Klitzing, Richard. "7D convex uniform polyexa o3o3x3o3o3o3o - broc".

[72] Klitzing, Richard. "7D convex uniform polyexa o3o3o3x3o3o3o - he".

[73] Klitzing, Richard. "7D convex uniform polyexa o3o3x3o *c3o3o3o - rolin".

[74] Klitzing, Richard. "8D convex uniform polyzetta x3o3o3o3o3o3o3o - ene".

[75] Klitzing, Richard. "8D convex uniform polyzettxa x3o3o3o3o3o3o4o - ek".

[76] Klitzing, Richard. "8D convex uniform polyzetta o3o3o3o3o3o3o4x - octa".

[77] Klitzing, Richard. "8D convex uniform polyzetta x3o3o *b3o3o3o3o3o - hocta".

[78] Klitzing, Richard. "8D convex uniform polyzetta o3o3o3o *c3o3o3o3x - fy".

[79] Klitzing, Richard. "8D convex uniform polyzetta x3o3o3o *c3o3o3o3o - bay".

[80] Klitzing, Richard. "8D convex uniform polyzetta o3o3o3x *c3o3o3o3o - bif".

[81] Klitzing, Richard. "8D convex uniform polyzetta o3x3o3o3o3o3o3o - rene".

[82] Klitzing, Richard. "8D convex uniform polyzetta o3o3x3o3o3o3o3o - brene".

[83] Klitzing, Richard. "8D convex uniform polyzetta o3o3o3x3o3o3o3o - trene".

[84] Klitzing, Richard. "8D convex uniform polyzetta o3o3x3o *c3o3o3o3o - buffy".

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[note 1]

[note 2]

[note 3]

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[note 6]

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[note 11]

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[note 15]

[note 16]

o3x3o4o - ico . . . . \| 24 ♦ 8 \| 4 8 \| 4 2 --------+----+----+-------+----- . x . . \| 2 \| 96 \| 1 2 \| 2 1 --------+----+----+-------+----- o3x . . \| 3 \| 3 \| 32 * \| 2 0 . x3o . \| 3 \| 3 \| * 64 \| 1 1 --------+----+----+-------+----- o3x3o . ♦ 6 \| 12 \| 4 4 \| 16 * . x3o4o ♦ 6 \| 12 \| 0 8 \| * 8 \|	o3o3x4o - rit . . . . \| 32 ♦ 6 \| 6 3 \| 2 3 --------+----+----+-------+----- . . x . \| 2 \| 96 \| 1 2 \| 1 2 --------+----+----+-------+----- . o3x . \| 3 \| 3 \| 64 * \| 1 1 . . x4o \| 4 \| 4 \| * 24 \| 0 2 --------+----+----+-------+----- o3o3x . ♦ 4 \| 6 \| 4 0 \| 16 * . o3x4o ♦ 12 \| 24 \| 8 6 \| * 8	x3x3o4o - thex . . . . \| 48 \| 1 4 \| 4 4 \| 4 1 --------+----+-------+-------+----- x . . . \| 2 \| 24 * \| 4 0 \| 4 0 . x . . \| 2 \| * 96 \| 1 2 \| 2 1 --------+----+-------+-------+----- x3x . . \| 6 \| 3 3 \| 32 * \| 2 0 . x3o . \| 3 \| 0 3 \| * 64 \| 1 1 --------+----+-------+-------+----- x3x3o . ♦ 12 \| 6 12 \| 4 4 \| 16 * . x3o4o ♦ 6 \| 0 12 \| 0 8 \| * 8	x3o3x4o - rico . . . . \| 96 ♦ 2 4 \| 1 4 2 2 \| 2 2 1 --------+----+--------+-------------+-------- x . . . \| 2 \| 96 * \| 1 2 0 0 \| 2 1 0 . . x . \| 2 \| * 192 \| 0 1 1 1 \| 1 1 1 --------+----+--------+-------------+-------- x3o . . \| 3 \| 3 0 \| 32 * * * \| 2 0 0 x . x . \| 4 \| 2 2 \| * 96 * * \| 1 1 0 . o3x . \| 3 \| 0 3 \| * * 64 * \| 1 0 1 . . x4o \| 4 \| 0 4 \| * * * 48 \| 0 1 1 --------+----+--------+-------------+-------- x3o3x . ♦ 12 \| 12 12 \| 4 6 4 0 \| 16 * * x . x4o ♦ 8 \| 4 8 \| 0 4 0 2 \| * 24 * . o3x4o ♦ 12 \| 0 24 \| 0 0 8 6 \| * * 8
x3o3o4x - sidpith . . . . \| 64 \| 3 3 \| 3 6 3 \| 1 3 3 1 --------+----+-------+----------+----------- x . . . \| 2 \| 96 * \| 2 2 0 \| 1 2 1 0 . . . x \| 2 \| * 96 \| 0 2 2 \| 0 1 2 1 --------+----+-------+----------+----------- x3o . . \| 3 \| 3 0 \| 64 * * \| 1 1 0 0 x . . x \| 4 \| 2 2 \| * 96 * \| 0 1 1 0 . . o4x \| 4 \| 0 4 \| * * 48 \| 0 0 1 1 --------+----+-------+----------+----------- x3o3o . ♦ 4 \| 6 0 \| 4 0 0 \| 16 * * * x3o . x ♦ 6 \| 6 3 \| 2 3 0 \| * 32 * * x . o4x ♦ 8 \| 4 8 \| 0 4 2 \| * * 24 * . o3o4x ♦ 8 \| 0 12 \| 0 0 6 \| * * * 8	o3x3x4o - tah . . . . \| 96 \| 2 2 \| 1 4 1 \| 2 2 --------+----+-------+----------+----- . x . . \| 2 \| 96 * \| 1 2 0 \| 2 1 . . x . \| 2 \| * 96 \| 0 2 1 \| 1 2 --------+----+-------+----------+----- o3x . . \| 3 \| 3 0 \| 32 * * \| 2 0 . x3x . \| 6 \| 3 3 \| * 64 * \| 1 1 . . x4o \| 4 \| 0 4 \| * * 24 \| 0 2 --------+----+-------+----------+----- o3x3x . ♦ 12 \| 12 6 \| 4 4 0 \| 16 * . x3x4o ♦ 24 \| 12 24 \| 0 8 6 \| * 8	o3x3o4x - srit . . . . \| 96 \| 4 2 \| 2 2 4 1 \| 1 2 2 (A),(B) --------+----+--------+-------------+-------- . x . . \| 2 \| 192 * \| 1 1 1 0 \| 1 1 1 (1),(/),(\) . . . x \| 2 \| * 96 \| 0 0 2 1 \| 0 1 2 (2),(3) --------+----+--------+-------------+-------- o3x . . \| 3 \| 3 0 \| 64 * * * \| 1 1 0 . x3o . \| 3 \| 3 0 \| * 64 * * \| 1 0 1 . x . x \| 4 \| 2 2 \| * * 96 * \| 0 1 1 . . o4x \| 4 \| 0 4 \| * * * 24 \| 0 0 2 --------+----+--------+-------------+-------- o3x3o . ♦ 6 \| 12 0 \| 4 4 0 0 \| 16 * * o3x . x ♦ 6 \| 6 3 \| 2 0 3 0 \| * 32 * . x3o4x ♦ 24 \| 24 24 \| 0 8 12 6 \| * * 8	o3o3x4x - tat . . . . \| 64 \| 3 1 \| 3 3 \| 1 3 --------+----+-------+-------+----- . . x . \| 2 \| 96 * \| 2 1 \| 1 2 . . . x \| 2 \| * 32 \| 0 3 \| 0 3 --------+----+-------+-------+----- . o3x . \| 3 \| 3 0 \| 64 * \| 1 1 . . x4x \| 8 \| 4 4 \| * 24 \| 0 2 --------+----+-------+-------+----- o3o3x . ♦ 4 \| 6 0 \| 4 0 \| 16 * . o3x4x ♦ 24 \| 24 12 \| 8 6 \| * 8
x3x3x4o - tico . . . . \| 192 \| 1 1 2 \| 1 2 2 1 \| 2 1 1 --------+-----+-----------+-------------+-------- x . . . \| 2 \| 96 * * \| 1 2 0 0 \| 2 1 0 . x . . \| 2 \| * 96 * \| 1 0 2 0 \| 2 0 1 . . x . \| 2 \| * * 192 \| 0 1 1 1 \| 1 1 1 --------+-----+-----------+-------------+-------- x3x . . \| 6 \| 3 3 0 \| 32 * * * \| 2 0 0 x . x . \| 4 \| 2 0 2 \| * 96 * * \| 1 1 0 . x3x . \| 6 \| 0 3 3 \| * * 64 * \| 1 0 1 . . x4o \| 4 \| 0 0 4 \| * * * 48 \| 0 1 1 --------+-----+-----------+-------------+-------- x3x3x . ♦ 24 \| 12 12 12 \| 4 6 4 0 \| 16 * * x . x4o ♦ 8 \| 4 0 8 \| 0 4 0 2 \| * 24 * . x3x4o ♦ 24 \| 0 12 24 \| 0 0 8 6 \| * * 8	x3x3o4x - prit . . . . \| 192 \| 1 2 2 \| 2 2 1 2 1 \| 1 2 1 1 --------+-----+------------+----------------+----------- x . . . \| 2 \| 96 * * \| 2 2 0 0 0 \| 1 2 1 0 . x . . \| 2 \| * 192 * \| 1 0 1 1 0 \| 1 1 0 1 . . . x \| 2 \| * * 192 \| 0 1 0 1 1 \| 0 1 1 1 --------+-----+------------+----------------+----------- x3x . . \| 6 \| 3 3 0 \| 64 * * * * \| 1 1 0 0 x . . x \| 4 \| 2 0 2 \| * 96 * * * \| 0 1 1 0 . x3o . \| 3 \| 0 3 0 \| * * 64 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 2 \| * * * 96 * \| 0 1 0 1 . . o4x \| 4 \| 0 0 4 \| * * * * 48 \| 0 0 1 1 --------+-----+------------+----------------+----------- x3x3o . ♦ 12 \| 6 12 0 \| 4 0 4 0 0 \| 16 * * * x3x . x ♦ 12 \| 6 6 6 \| 2 3 0 3 0 \| * 32 * * x . o4x ♦ 8 \| 4 0 8 \| 0 4 0 0 2 \| * * 24 * . x3o4x ♦ 24 \| 0 24 24 \| 0 0 8 12 6 \| * * * 8	x3o3x4x - proh . . . . \| 192 \| 2 2 1 \| 1 2 2 1 2 \| 1 1 2 1 --------+-----+------------+----------------+----------- x . . . \| 2 \| 192 * * \| 1 1 1 0 0 \| 1 1 1 0 . . x . \| 2 \| * 192 * \| 0 1 0 1 1 \| 1 0 1 1 . . . x \| 2 \| * * 96 \| 0 0 2 0 2 \| 0 1 2 1 --------+-----+------------+----------------+----------- x3o . . \| 3 \| 3 0 0 \| 64 * * * * \| 1 1 0 0 x . x . \| 4 \| 2 2 0 \| * 96 * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 2 \| * * 96 * * \| 0 1 1 0 . o3x . \| 3 \| 0 3 0 \| * * * 64 * \| 1 0 0 1 . . x4x \| 8 \| 0 4 4 \| * * * * 48 \| 0 0 1 1 --------+-----+------------+----------------+----------- x3o3x . ♦ 12 \| 12 12 0 \| 4 6 0 4 0 \| 16 * * * x3o . x ♦ 6 \| 6 0 3 \| 2 0 3 0 0 \| * 32 * * x . x4x ♦ 16 \| 8 8 8 \| 0 4 4 0 2 \| * * 24 * . o3x4x ♦ 24 \| 0 24 12 \| 0 0 0 8 6 \| * * * 8	o3x3x4x - grit . . . . \| 192 \| 2 1 1 \| 1 2 2 1 \| 1 1 2 --------+-----+-----------+-------------+-------- . x . . \| 2 \| 192 * * \| 1 1 1 0 \| 1 1 1 . . x . \| 2 \| * 96 * \| 0 2 0 1 \| 1 0 2 . . . x \| 2 \| * * 96 \| 0 0 2 1 \| 0 1 2 --------+-----+-----------+-------------+-------- o3x . . \| 3 \| 3 0 0 \| 64 * * * \| 1 1 0 . x3x . \| 6 \| 3 3 0 \| * 64 * * \| 1 0 1 . x . x \| 4 \| 2 0 2 \| * * 96 * \| 0 1 1 . . x4x \| 8 \| 0 4 4 \| * * * 24 \| 0 0 2 --------+-----+-----------+-------------+-------- o3x3x . ♦ 12 \| 12 6 0 \| 4 4 0 0 \| 16 * * o3x . x ♦ 6 \| 6 0 3 \| 2 0 3 0 \| * 32 * . x3x4x ♦ 48 \| 24 24 24 \| 0 8 12 6 \| * * 8
x3x3x4x - gidpith . . . . \| 384 \| 1 1 1 1 \| 1 1 1 1 1 1 \| 1 1 1 1 --------+-----+-----------------+-------------------+----------- x . . . \| 2 \| 192 * * * \| 1 1 1 0 0 0 \| 1 1 1 0 . x . . \| 2 \| * 192 * * \| 1 0 0 1 1 0 \| 1 1 0 1 . . x . \| 2 \| * * 192 * \| 0 1 0 1 0 1 \| 1 0 1 1 . . . x \| 2 \| * * * 192 \| 0 0 1 0 1 1 \| 0 1 1 1 --------+-----+-----------------+-------------------+----------- x3x . . \| 6 \| 3 3 0 0 \| 64 * * * * * \| 1 1 0 0 x . x . \| 4 \| 2 0 2 0 \| * 96 * * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 0 2 \| * * 96 * * * \| 0 1 1 0 . x3x . \| 6 \| 0 3 3 0 \| * * * 64 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 0 2 \| * * * * 96 * \| 0 1 0 1 . . x4x \| 8 \| 0 0 4 4 \| * * * * * 48 \| 0 0 1 1 --------+-----+-----------------+-------------------+----------- x3x3x . ♦ 24 \| 12 12 12 0 \| 4 6 0 4 0 0 \| 16 * * * x3x . x ♦ 12 \| 6 6 0 6 \| 2 0 3 0 3 0 \| * 32 * * x . x4x ♦ 16 \| 8 0 8 8 \| 0 4 4 0 0 2 \| * * 24 * . x3x4x ♦ 48 \| 0 24 24 24 \| 0 0 0 8 12 6 \| * * * 8

o3x3o5o - rox . . . . \| 720 ♦ 10 \| 5 10 \| 5 2 --------+-----+------+-----------+-------- . x . . \| 2 \| 3600 \| 1 2 \| 2 1 --------+-----+------+-----------+-------- o3x . . \| 3 \| 3 \| 1200 * \| 2 0 . x3o . \| 3 \| 3 \| * 2400 \| 1 1 --------+-----+------+-----------+-------- o3x3o . ♦ 6 \| 12 \| 4 4 \| 600 * . x3o5o ♦ 12 \| 30 \| 0 20 \| * 120	o3o3x5o - rahi . . . . \| 1200 ♦ 6 \| 6 3 \| 2 3 --------+------+------+----------+-------- . . x . \| 2 \| 3600 \| 2 1 \| 1 2 --------+------+------+----------+-------- . o3x . \| 3 \| 3 \| 2400 * \| 1 1 . . x5o \| 5 \| 5 \| * 720 \| 0 2 --------+------+------+----------+-------- o3o3x . ♦ 4 \| 6 \| 4 0 \| 600 * . o3x5o ♦ 30 \| 60 \| 20 12 \| * 120	x3x3o5o - tex . . . . \| 1440 \| 1 5 \| 5 5 \| 5 1 --------+------+----------+-----------+-------- x . . . \| 2 \| 720 * \| 5 0 \| 5 0 . x . . \| 2 \| * 3600 \| 1 2 \| 2 1 --------+------+----------+-----------+-------- x3x . . \| 6 \| 3 3 \| 1200 * \| 2 0 . x3o . \| 3 \| 0 3 \| * 2400 \| 1 1 --------+------+----------+-----------+-------- x3x3o . ♦ 12 \| 6 12 \| 4 4 \| 600 * . x3o5o ♦ 12 \| 0 30 \| 0 20 \| * 120
x3o3x5o - srix . . . . \| 3600 \| 2 4 \| 1 4 2 2 \| 2 2 1 --------+------+-----------+---------------------+------------ x . . . \| 2 \| 3600 * \| 1 2 0 0 \| 2 1 0 . . x . \| 2 \| * 7200 \| 0 1 1 1 \| 1 1 1 --------+------+-----------+---------------------+------------ x3o . . \| 3 \| 3 0 \| 1200 * * * \| 2 0 0 x . x . \| 4 \| 2 2 \| * 3600 * * \| 1 1 0 . o3x . \| 3 \| 0 3 \| * * 2400 * \| 1 0 1 . . x5o \| 5 \| 0 5 \| * * * 1440 \| 0 1 1 --------+------+-----------+---------------------+------------ x3o3x . ♦ 12 \| 12 12 \| 4 6 4 0 \| 600 * * x . x5o ♦ 10 \| 5 10 \| 0 5 0 2 \| * 720 * . o3x5o ♦ 30 \| 0 60 \| 0 0 20 12 \| * * 120	x3o3o5x - sidpixhi . . . . \| 2400 \| 3 3 \| 3 6 3 \| 1 3 3 1 --------+------+-----------+----------------+----------------- x . . . \| 2 \| 3600 * \| 2 2 0 \| 1 2 1 0 . . . x \| 2 \| * 3600 \| 0 2 2 \| 0 1 2 1 --------+------+-----------+----------------+----------------- x3o . . \| 3 \| 3 0 \| 2400 * * \| 1 1 0 0 x . . x \| 4 \| 2 2 \| * 3600 * \| 0 1 1 0 . . o5x \| 5 \| 0 5 \| * * 1440 \| 0 0 1 1 --------+------+-----------+----------------+----------------- x3o3o . ♦ 4 \| 6 0 \| 4 0 0 \| 600 * * * x3o . x ♦ 6 \| 6 3 \| 2 3 0 \| * 1200 * * x . o5x ♦ 10 \| 5 10 \| 0 5 2 \| * * 720 * . o3o5x ♦ 20 \| 0 30 \| 0 0 12 \| * * * 120	o3x3x5o - xhi . . . . \| 3600 \| 2 2 \| 1 4 1 \| 2 2 --------+------+-----------+---------------+-------- . x . . \| 2 \| 3600 * \| 1 2 0 \| 2 1 . . x . \| 2 \| * 3600 \| 0 2 1 \| 1 2 --------+------+-----------+---------------+-------- o3x . . \| 3 \| 3 0 \| 1200 * * \| 2 0 . x3x . \| 6 \| 3 3 \| * 2400 * \| 1 1 . . x5o \| 5 \| 0 5 \| * * 720 \| 0 2 --------+------+-----------+---------------+-------- o3x3x . ♦ 12 \| 12 6 \| 4 4 0 \| 600 * . x3x5o ♦ 60 \| 30 60 \| 0 20 12 \| * 120
o3x3o5x - srahi . . . . \| 3600 \| 4 2 \| 2 2 4 1 \| 1 2 2 --------+------+-----------+--------------------+------------- . x . . \| 2 \| 7200 * \| 1 1 1 0 \| 1 1 1 . . . x \| 2 \| * 3600 \| 0 0 2 1 \| 0 1 2 --------+------+-----------+--------------------+------------- o3x . . \| 3 \| 3 0 \| 2400 * * * \| 1 1 0 . x3o . \| 3 \| 3 0 \| * 2400 * * \| 1 0 1 . x . x \| 4 \| 2 2 \| * * 3600 * \| 0 1 1 . . o5x \| 5 \| 0 5 \| * * * 720 \| 0 0 2 --------+------+-----------+--------------------+------------- o3x3o . ♦ 6 \| 12 0 \| 4 4 0 0 \| 600 * * o3x . x ♦ 6 \| 6 3 \| 2 0 3 0 \| * 1200 * . x3o5x ♦ 60 \| 60 60 \| 0 20 30 12 \| * * 120	o3o3x5x - thi . . . . \| 2400 \| 3 1 \| 3 3 \| 1 3 --------+------+-----------+----------+-------- . . x . \| 2 \| 3600 * \| 2 1 \| 1 2 . . . x \| 2 \| * 1200 \| 0 3 \| 0 3 --------+------+-----------+----------+-------- . o3x . \| 3 \| 3 0 \| 2400 * \| 1 1 . . x5x \| 10 \| 5 5 \| * 720 \| 0 2 --------+------+-----------+----------+-------- o3o3x . ♦ 4 \| 6 0 \| 4 0 \| 600 * . o3x5x ♦ 60 \| 60 30 \| 20 12 \| * 120	x3x3x5o - grix . . . . \| 7200 \| 1 1 2 \| 1 2 2 1 \| 2 1 1 --------+------+----------------+---------------------+------------ x . . . \| 2 \| 3600 * * \| 1 2 0 0 \| 2 1 0 . x . . \| 2 \| * 3600 * \| 1 0 2 0 \| 2 0 1 . . x . \| 2 \| * * 7200 \| 0 1 1 1 \| 1 1 1 --------+------+----------------+---------------------+------------ x3x . . \| 6 \| 3 3 0 \| 1200 * * * \| 2 0 0 x . x . \| 4 \| 2 0 2 \| * 3600 * * \| 1 1 0 . x3x . \| 6 \| 0 3 3 \| * * 2400 * \| 1 0 1 . . x5o \| 5 \| 0 0 5 \| * * * 1440 \| 0 1 1 --------+------+----------------+---------------------+------------ x3x3x . ♦ 24 \| 12 12 12 \| 4 6 4 0 \| 600 * * x . x5o ♦ 10 \| 5 0 10 \| 0 5 0 2 \| * 720 * . x3x5o ♦ 60 \| 0 30 60 \| 0 0 20 12 \| * * 120
x3x3o5x - prahi . . . . \| 7200 \| 1 2 2 \| 2 2 1 2 1 \| 1 2 1 1 --------+------+----------------+--------------------------+----------------- x . . . \| 2 \| 3600 * * \| 2 2 0 0 0 \| 1 2 1 0 . x . . \| 2 \| * 7200 * \| 1 0 1 1 0 \| 1 1 0 1 . . . x \| 2 \| * * 7200 \| 0 1 0 1 1 \| 0 1 1 1 --------+------+----------------+--------------------------+----------------- x3x . . \| 6 \| 3 3 0 \| 2400 * * * * \| 1 1 0 0 x . . x \| 4 \| 2 0 2 \| * 3600 * * * \| 0 1 1 0 . x3o . \| 3 \| 0 3 0 \| * * 2400 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 2 \| * * * 3600 * \| 0 1 0 1 . . o5x \| 5 \| 0 0 5 \| * * * * 1440 \| 0 0 1 1 --------+------+----------------+--------------------------+----------------- x3x3o . ♦ 12 \| 6 12 0 \| 4 0 4 0 0 \| 600 * * * x3x . x ♦ 12 \| 6 6 6 \| 2 3 0 3 0 \| * 1200 * * x . o5x ♦ 10 \| 5 0 10 \| 0 5 0 0 2 \| * * 720 * . x3o5x ♦ 60 \| 0 60 60 \| 0 0 20 30 12 \| * * * 120	x3o3x5x - prix . . . . \| 7200 \| 2 2 1 \| 1 2 2 1 2 \| 1 1 2 1 --------+------+----------------+--------------------------+----------------- x . . . \| 2 \| 7200 * * \| 1 1 1 0 0 \| 1 1 1 0 . . x . \| 2 \| * 7200 * \| 0 1 0 1 1 \| 1 0 1 1 . . . x \| 2 \| * * 3600 \| 0 0 2 0 2 \| 0 1 2 1 --------+------+----------------+--------------------------+----------------- x3o . . \| 3 \| 3 0 0 \| 2400 * * * * \| 1 1 0 0 x . x . \| 4 \| 2 2 0 \| * 3600 * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 2 \| * * 3600 * * \| 0 1 1 0 . o3x . \| 3 \| 0 3 0 \| * * * 2400 * \| 1 0 0 1 . . x5x \| 10 \| 0 5 5 \| * * * * 1440 \| 0 0 1 1 --------+------+----------------+--------------------------+----------------- x3o3x . ♦ 12 \| 12 12 0 \| 4 6 0 4 0 \| 600 * * * x3o . x ♦ 6 \| 12 0 6 \| 2 0 3 0 0 \| * 1200 * * x . x5x ♦ 20 \| 10 10 10 \| 0 5 5 0 2 \| * * 720 * . o3x5x ♦ 60 \| 0 60 30 \| 0 0 0 20 12 \| * * * 120	o3x3x5x - grahi . . . . \| 7200 \| 2 1 1 \| 1 2 2 1 \| 1 1 2 --------+------+----------------+--------------------+------------- . x . . \| 2 \| 7200 * * \| 1 1 1 0 \| 1 1 1 . . x . \| 2 \| * 3600 * \| 0 2 0 1 \| 1 0 2 . . . x \| 2 \| * * 3600 \| 0 0 2 1 \| 0 1 2 --------+------+----------------+--------------------+------------- o3x . . \| 3 \| 3 0 0 \| 2400 * * * \| 1 1 0 . x3x . \| 6 \| 3 3 0 \| * 2400 * * \| 1 0 1 . x . x \| 4 \| 2 0 2 \| * * 3600 * \| 0 1 1 . . x5x \| 10 \| 0 5 5 \| * * * 720 \| 0 0 2 --------+------+----------------+--------------------+------------- o3x3x . ♦ 12 \| 12 6 0 \| 4 4 0 0 \| 600 * * o3x . x ♦ 6 \| 6 0 3 \| 2 0 3 0 \| * 1200 * . x3x5x ♦ 120 \| 60 60 60 \| 0 20 30 12 \| * * 120
x3x3x5x - gidpixhi . . . . \| 14400 \| 1 1 1 1 \| 1 1 1 1 1 1 \| 1 1 1 1 --------+-------+---------------------+-------------------------------+----------------- x . . . \| 2 \| 7200 * * * \| 1 1 1 0 0 0 \| 1 1 1 0 . x . . \| 2 \| * 7200 * * \| 1 0 0 1 1 0 \| 1 1 0 1 . . x . \| 2 \| * * 7200 * \| 0 1 0 1 0 1 \| 1 0 1 1 . . . x \| 1 \| * * * 7200 \| 0 0 1 0 1 1 \| 0 1 1 1 --------+-------+---------------------+-------------------------------+----------------- x3x . . \| 6 \| 3 3 0 0 \| 2400 * * * * * \| 1 1 0 0 x . x . \| 4 \| 2 0 2 0 \| * 3600 * * * * \| 1 0 1 0 x . . x \| 4 \| 2 0 0 2 \| * * 3600 * * * \| 0 1 1 0 . x3x . \| 6 \| 0 3 3 0 \| * * * 2400 * * \| 1 0 0 1 . x . x \| 4 \| 0 2 0 2 \| * * * * 3600 * \| 0 1 0 1 . . x5x \| 10 \| 0 0 5 5 \| * * * * * 1440 \| 0 0 1 1 --------+-------+---------------------+-------------------------------+----------------- x3x3x . ♦ 24 \| 12 12 12 0 \| 4 6 0 4 0 0 \| 600 * * * x3x . x ♦ 12 \| 6 6 0 6 \| 2 0 3 0 3 0 \| * 1200 * * x . x5x ♦ 20 \| 10 0 10 10 \| 0 5 5 0 0 2 \| * * 720 * . x3x5x ♦ 120 \| 0 60 60 60 \| 0 0 0 20 30 12 \| * * * 120