Demipenteract (5-demicube) | ||
---|---|---|
![]() Petrie polygon projection | ||
Type | Uniform 5-polytope | |
Family (Dn) | 5- demicube | |
Families (En) |
k21 polytope 1k2 polytope | |
Coxeter symbol | 121 | |
Schläfli symbol | {3,32,1} = h{4,33} s{21,1,1,1} | |
Coxeter-Dynkin diagram | ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() | |
4-faces | 26 | 10
{31,1,1}
![]() 16 {3,3,3} ![]() |
Cells | 120 | 40
{31,0,1}
![]() 80 {3,3} ![]() |
Faces | 160 |
{3}
![]() |
Edges | 80 | |
Vertices | 16 | |
Vertex figure |
![]() rectified 5-cell | |
Petrie polygon | Octagon | |
Symmetry group | D5, [34,1,1] = [1+,4,33 [24+ | |
Properties | convex |
In five-dimensional geometry, a demipenteract or 5-demicube is a semiregular 5-polytope, constructed from a 5-hypercube ( penteract) with alternated vertices truncated.
It was discovered by Thorold Gosset. Since it was the only semiregular 5-polytope (made of more than one type of regular facets), he called it a 5-ic semi-regular.
Coxeter named this polytope as 121 from its
Coxeter diagram, which has branches of length 2, 1 and 1 with a ringed node on one of the short branches, . It exists in the
k21 polytope family as 121 with the Gosset polytopes:
221,
321, and
421.
Cartesian coordinates for the vertices of a demipenteract centered at the origin and edge length 2√2 are alternate halves of the penteract:
with an odd number of plus signs.
![]() Perspective projection. |
Coxeter plane | B5 | |
---|---|---|
Graph |
![]() | |
Dihedral symmetry | [10/2] | |
Coxeter plane | D5 | D4 |
Graph |
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Dihedral symmetry | [8] | [6] |
Coxeter plane | D3 | A3 |
Graph |
![]() |
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Dihedral symmetry | [4] | [4] |
It is a part of a dimensional family of uniform polytopes called demihypercubes for being alternation of the hypercube family.
There are 23 Uniform 5-polytopes (uniform 5-polytopes) that can be constructed from the D5 symmetry of the demipenteract, 8 of which are unique to this family, and 15 are shared within the penteractic family.
D5 polytopes | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
![]() h{4,3,3,3} |
![]() h2{4,3,3,3} |
![]() h3{4,3,3,3} |
![]() h4{4,3,3,3} |
![]() h2,3{4,3,3,3} |
![]() h2,4{4,3,3,3} |
![]() h3,4{4,3,3,3} |
![]() h2,3,4{4,3,3,3} |
The 5-demicube is third in a dimensional series of semiregular polytopes. Each progressive uniform polytope is constructed vertex figure of the previous polytope. Thorold Gosset identified this series in 1900 as containing all regular polytope facets, containing all simplexes and orthoplexes ( 5-cells and 16-cells in the case of the rectified 5-cell). In Coxeter's notation the 5-demicube is given the symbol 121.
k21 figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
En | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E3=A2A1 | E4=A4 | E5=D5 | E6 | E7 | E8 | E9 = = E8+ | E10 = = E8++ | |||
Coxeter diagram |
![]() ![]() ![]() ![]() ![]() |
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Symmetry | [3−1,2,1] | [30,2,1] | [31,2,1] | [32,2,1] | [33,2,1] | [34,2,1] | [35,2,1] | [36,2,1] | |||
Order | 12 | 120 | 1,920 | 51,840 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph |
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- | - | |||
Name | −121 | 021 | 121 | 221 | 321 | 421 | 521 | 621 |
1k2 figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
n | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E3=A2A1 | E4=A4 | E5=D5 | E6 | E7 | E8 | E9 = = E8+ | E10 = = E8++ | |||
Coxeter diagram |
![]() ![]() ![]() ![]() ![]() |
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Symmetry (order) |
[3−1,2,1] | [30,2,1] | [31,2,1] | [[32,2,1]] | [33,2,1] | [34,2,1] | [35,2,1] | [36,2,1] | |||
Order | 12 | 120 | 1,920 | 103,680 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph |
![]() |
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- | - | |||
Name | 1−1,2 | 102 | 112 | 122 | 132 | 142 | 152 | 162 |
Demipenteract (5-demicube) | ||
---|---|---|
![]() Petrie polygon projection | ||
Type | Uniform 5-polytope | |
Family (Dn) | 5- demicube | |
Families (En) |
k21 polytope 1k2 polytope | |
Coxeter symbol | 121 | |
Schläfli symbol | {3,32,1} = h{4,33} s{21,1,1,1} | |
Coxeter-Dynkin diagram | ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() | |
4-faces | 26 | 10
{31,1,1}
![]() 16 {3,3,3} ![]() |
Cells | 120 | 40
{31,0,1}
![]() 80 {3,3} ![]() |
Faces | 160 |
{3}
![]() |
Edges | 80 | |
Vertices | 16 | |
Vertex figure |
![]() rectified 5-cell | |
Petrie polygon | Octagon | |
Symmetry group | D5, [34,1,1] = [1+,4,33 [24+ | |
Properties | convex |
In five-dimensional geometry, a demipenteract or 5-demicube is a semiregular 5-polytope, constructed from a 5-hypercube ( penteract) with alternated vertices truncated.
It was discovered by Thorold Gosset. Since it was the only semiregular 5-polytope (made of more than one type of regular facets), he called it a 5-ic semi-regular.
Coxeter named this polytope as 121 from its
Coxeter diagram, which has branches of length 2, 1 and 1 with a ringed node on one of the short branches, . It exists in the
k21 polytope family as 121 with the Gosset polytopes:
221,
321, and
421.
Cartesian coordinates for the vertices of a demipenteract centered at the origin and edge length 2√2 are alternate halves of the penteract:
with an odd number of plus signs.
![]() Perspective projection. |
Coxeter plane | B5 | |
---|---|---|
Graph |
![]() | |
Dihedral symmetry | [10/2] | |
Coxeter plane | D5 | D4 |
Graph |
![]() |
![]() |
Dihedral symmetry | [8] | [6] |
Coxeter plane | D3 | A3 |
Graph |
![]() |
![]() |
Dihedral symmetry | [4] | [4] |
It is a part of a dimensional family of uniform polytopes called demihypercubes for being alternation of the hypercube family.
There are 23 Uniform 5-polytopes (uniform 5-polytopes) that can be constructed from the D5 symmetry of the demipenteract, 8 of which are unique to this family, and 15 are shared within the penteractic family.
D5 polytopes | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
![]() h{4,3,3,3} |
![]() h2{4,3,3,3} |
![]() h3{4,3,3,3} |
![]() h4{4,3,3,3} |
![]() h2,3{4,3,3,3} |
![]() h2,4{4,3,3,3} |
![]() h3,4{4,3,3,3} |
![]() h2,3,4{4,3,3,3} |
The 5-demicube is third in a dimensional series of semiregular polytopes. Each progressive uniform polytope is constructed vertex figure of the previous polytope. Thorold Gosset identified this series in 1900 as containing all regular polytope facets, containing all simplexes and orthoplexes ( 5-cells and 16-cells in the case of the rectified 5-cell). In Coxeter's notation the 5-demicube is given the symbol 121.
k21 figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
En | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E3=A2A1 | E4=A4 | E5=D5 | E6 | E7 | E8 | E9 = = E8+ | E10 = = E8++ | |||
Coxeter diagram |
![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() | |||
Symmetry | [3−1,2,1] | [30,2,1] | [31,2,1] | [32,2,1] | [33,2,1] | [34,2,1] | [35,2,1] | [36,2,1] | |||
Order | 12 | 120 | 1,920 | 51,840 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph |
![]() |
![]() |
![]() |
![]() |
![]() |
![]() |
- | - | |||
Name | −121 | 021 | 121 | 221 | 321 | 421 | 521 | 621 |
1k2 figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
n | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E3=A2A1 | E4=A4 | E5=D5 | E6 | E7 | E8 | E9 = = E8+ | E10 = = E8++ | |||
Coxeter diagram |
![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() |
![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() ![]() | |||
Symmetry (order) |
[3−1,2,1] | [30,2,1] | [31,2,1] | [[32,2,1]] | [33,2,1] | [34,2,1] | [35,2,1] | [36,2,1] | |||
Order | 12 | 120 | 1,920 | 103,680 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph |
![]() |
![]() |
![]() |
![]() |
![]() |
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- | - | |||
Name | 1−1,2 | 102 | 112 | 122 | 132 | 142 | 152 | 162 |