Regular 5-cell (pentachoron) (4-simplex) | |
---|---|
Schlegel diagram (vertices and edges) | |
Type | Convex regular 4-polytope |
Schläfli symbol | {3,3,3} |
Coxeter diagram | |
Cells | 5 {3,3} |
Faces | 10 {3} |
Edges | 10 |
Vertices | 5 |
Vertex figure | (tetrahedron) |
Petrie polygon | pentagon |
Coxeter group | A_{4}, [3,3,3] |
Dual | Self-dual |
Properties | convex, isogonal, isotoxal, isohedral |
Uniform index | 1 |
In geometry, the 5-cell is a four-dimensional object bounded by 5 tetrahedral cells. It is also known as a C_{5}, pentachoron,^{[1]} pentatope, pentahedroid,^{[2]} or tetrahedral pyramid. It is the 4-simplex (Coxeter's polytope^{[3]}), the simplest possible convex regular 4-polytope (four-dimensional analogue of a Platonic solid), and is analogous to the tetrahedron in three dimensions and the triangle in two dimensions. The pentachoron is a four dimensional pyramid with a tetrahedral base.
The regular 5-cell is bounded by 5 regular tetrahedra, and is one of the six regular convex 4-polytopes, represented by Schläfli symbol {3,3,3}.
The 5-cell is a solution to the problem: Make 10 equilateral triangles, all of the same size, using 10 matchsticks, where each side of every triangle is exactly one matchstick. No solution exists in three dimensions.
The convex hull of the 5-cell and its dual (assuming that they are congruent) is the disphenoidal 30-cell, dual of the bitruncated 5-cell.
The 5-cell is self-dual, and its vertex figure is a tetrahedron. Its maximal intersection with 3-dimensional space is the triangular prism. Its dihedral angle is cos^{−1}(1/4), or approximately 75.52°.
This configuration matrix represents the 5-cell. The rows and columns correspond to vertices, edges, faces, and cells. The diagonal numbers say how many of each element occur in the whole 5-cell. The nondiagonal numbers say how many of the column's element occur in or at the row's element. This self-dual simplex's matrix is identical to its 180 degree rotation.^{[5]}
The 5-cell can be constructed from a tetrahedron by adding a 5th vertex such that it is equidistant from all the other vertices of the tetrahedron. (The 5-cell is essentially a 4-dimensional pyramid with a tetrahedral base.)
The simplest set of coordinates is: (2,0,0,0), (0,2,0,0), (0,0,2,0), (0,0,0,2), (φ,φ,φ,φ), with edge length 2√2, where φ is the golden ratio.^{[6]}
The Cartesian coordinates of the vertices of an origin-centered regular 5-cell having edge length 2 are:
Another set of origin-centered coordinates in 4-space can be seen as a hyperpyramid with a regular tetrahedral base in 3-space, with edge length 2√2:
The vertices of a 4-simplex (with edge √2) can be more simply constructed on a hyperplane in 5-space, as (distinct) permutations of (0,0,0,0,1) or (0,1,1,1,1); in these positions it is a facet of, respectively, the 5-orthoplex or the rectified penteract.
A 5-cell can be constructed as a Boerdijk–Coxeter helix of five chained tetrahedra, folded into a 4-dimensional ring. The 10 triangle faces can be seen in a 2D net within a triangular tiling, with 6 triangles around every vertex, although folding into 4-dimensions causes edges to coincide. The purple edges represent the Petrie polygon of the 5-cell.
The A_{4} Coxeter plane projects the 5-cell into a regular pentagon and pentagram.
A_{k} Coxeter plane |
A_{4} | A_{3} | A_{2} |
---|---|---|---|
Graph | |||
Dihedral symmetry | [5] | [4] | [3] |
Projections to 3 dimensions | |
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Stereographic projection wireframe (edge projected onto a 3-sphere) |
A 3D projection of a 5-cell performing a simple rotation |
The vertex-first projection of the 5-cell into 3 dimensions has a tetrahedral projection envelope. The closest vertex of the 5-cell projects to the center of the tetrahedron, as shown here in red. The farthest cell projects onto the tetrahedral envelope itself, while the other 4 cells project onto the 4 flattened tetrahedral regions surrounding the central vertex. |
The edge-first projection of the 5-cell into 3 dimensions has a triangular dipyramidal envelope. The closest edge (shown here in red) projects to the axis of the dipyramid, with the three cells surrounding it projecting to 3 tetrahedral volumes arranged around this axis at 120 degrees to each other. The remaining 2 cells project to the two halves of the dipyramid and are on the far side of the pentatope. |
The face-first projection of the 5-cell into 3 dimensions also has a triangular dipyramidal envelope. The nearest face is shown here in red. The two cells that meet at this face project to the two halves of the dipyramid. The remaining three cells are on the far side of the pentatope from the 4D viewpoint, and are culled from the image for clarity. They are arranged around the central axis of the dipyramid, just as in the edge-first projection. |
The cell-first projection of the 5-cell into 3 dimensions has a tetrahedral envelope. The nearest cell projects onto the entire envelope, and, from the 4D viewpoint, obscures the other 4 cells; hence, they are not rendered here. |
There are many lower symmetry forms, including these found in uniform polytope vertex figures:
Symmetry | [3,3,3] Order 120 |
[3,3,1] Order 24 |
[3,2,1] Order 12 |
[3,1,1] Order 6 |
[5,2]^{+} Order 10 |
---|---|---|---|---|---|
Name | Regular 5-cell | Tetrahedral pyramid | Triangular-pyramidal pyramid | Pentagonal hyperdisphenoid | |
Schläfli | {3,3,3} | {3,3} ∨ ( ) | {3} ∨ { } | ||
Example Vertex figure |
5-simplex |
Truncated 5-simplex |
Bitruncated 5-simplex |
Cantitruncated 5-simplex |
Omnitruncated 4-simplex honeycomb |
The tetrahedral pyramid is a special case of a 5-cell, a polyhedral pyramid, constructed as a regular tetrahedron base in a 3-space hyperplane, and an apex point above the hyperplane. The four sides of the pyramid are made of tetrahedron cells.
Many uniform 5-polytopes have tetrahedral pyramid vertex figures:
Schlegel diagram |
||||||
---|---|---|---|---|---|---|
Name Coxeter |
{ }×{3,3,3} |
{ }×{4,3,3} |
{ }×{5,3,3} |
t{3,3,3,3} |
t{4,3,3,3} |
t{3,4,3,3} |
Other uniform 5-polytopes have irregular 5-cell vertex figures. The symmetry of a vertex figure of a uniform polytope is represented by removing the ringed nodes of the Coxeter diagram.
Symmetry | [3,2,1], order 12 | [3,1,1], order 6 | [2^{+},4,1], order 8 | [2,1,1], order 4 | ||
---|---|---|---|---|---|---|
Schlegel diagram |
||||||
Name Coxeter |
t_{12}α_{5} |
t_{12}γ_{5} |
t_{012}α_{5} |
t_{012}γ_{5} |
t_{123}α_{5} |
t_{123}γ_{5} |
Symmetry | [2,1,1], order 2 | [2^{+},1,1], order 2 | [ ]^{+}, order 1 | ||
---|---|---|---|---|---|
Schlegel diagram |
|||||
Name Coxeter |
t_{0123}α_{5} |
t_{0123}γ_{5} |
t_{0123}β_{5} |
t_{01234}α_{5} |
t_{01234}γ_{5} |
The compound of two 5-cells in dual configurations can be seen in this A5 Coxeter plane projection, with a red and blue 5-cell vertices and edges. This compound has [[3,3,3]] symmetry, order 240. The intersection of these two 5-cells is a uniform bitruncated 5-cell. = ∩ .
This compound can be seen as the 4D analogue of the 2D hexagram {^{6}⁄_{2}} and the 3D compound of two tetrahedra.
The pentachoron (5-cell) is the simplest of 9 uniform polychora constructed from the [3,3,3] Coxeter group.
Schläfli | {3,3,3} | t{3,3,3} | r{3,3,3} | rr{3,3,3} | 2t{3,3,3} | tr{3,3,3} | t_{0,3}{3,3,3} | t_{0,1,3}{3,3,3} | t_{0,1,2,3}{3,3,3} |
---|---|---|---|---|---|---|---|---|---|
Coxeter | |||||||||
Schlegel |
1_{k2} figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
n | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E_{3}=A_{2}A_{1} | E_{4}=A_{4} | E_{5}=D_{5} | E_{6} | E_{7} | E_{8} | E_{9} = = E_{8}^{+} | E_{10} = = E_{8}^{++} | |||
Coxeter diagram |
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Symmetry (order) |
[3^{−1,2,1}] | [3^{0,2,1}] | [3^{1,2,1}] | [[3^{2,2,1}]] | [3^{3,2,1}] | [3^{4,2,1}] | [3^{5,2,1}] | [3^{6,2,1}] | |||
Order | 12 | 120 | 1,920 | 103,680 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph | - | - | |||||||||
Name | 1_{−1,2} | 1_{02} | 1_{12} | 1_{22} | 1_{32} | 1_{42} | 1_{52} | 1_{62} |
2_{k1} figures in n dimensions | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | Finite | Euclidean | Hyperbolic | ||||||||
n | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |||
Coxeter group |
E_{3}=A_{2}A_{1} | E_{4}=A_{4} | E_{5}=D_{5} | E_{6} | E_{7} | E_{8} | E_{9} = = E_{8}^{+} | E_{10} = = E_{8}^{++} | |||
Coxeter diagram |
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Symmetry | [3^{−1,2,1}] | [3^{0,2,1}] | [[3^{1,2,1}]] | [3^{2,2,1}] | [3^{3,2,1}] | [3^{4,2,1}] | [3^{5,2,1}] | [3^{6,2,1}] | |||
Order | 12 | 120 | 384 | 51,840 | 2,903,040 | 696,729,600 | ∞ | ||||
Graph | - | - | |||||||||
Name | 2_{−1,1} | 2_{01} | 2_{11} | 2_{21} | 2_{31} | 2_{41} | 2_{51} | 2_{61} |
It is in the sequence of regular polychora: the tesseract {4,3,3}, 120-cell {5,3,3}, of Euclidean 4-space, and hexagonal tiling honeycomb {6,3,3} of hyperbolic space. All of these have a tetrahedral vertex figure.
{p,3,3} polytopes | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | S^{3} | H^{3} | |||||||||
Form | Finite | Paracompact | Noncompact | ||||||||
Name | {3,3,3} | {4,3,3} | {5,3,3} | {6,3,3} | {7,3,3} | {8,3,3} | ...{∞,3,3} | ||||
Image | |||||||||||
Cells {p,3} |
{3,3} |
{4,3} |
{5,3} |
{6,3} |
{7,3} |
{8,3} |
{∞,3} |
It is one of three regular 4-polytopes with tetrahedral cells, along with the 16-cell {3,3,5}, 600-cell {3,3,5}. The order-6 tetrahedral honeycomb {3,3,6} of hyperbolic space also has tetrahedral cells.
{3,3,p} polytopes | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | S^{3} | H^{3} | |||||||||
Form | Finite | Paracompact | Noncompact | ||||||||
Name | {3,3,3} |
{3,3,4} |
{3,3,5} |
{3,3,6} |
{3,3,7} |
{3,3,8} |
... {3,3,∞} | ||||
Image | |||||||||||
Vertex figure |
{3,3} |
{3,4} |
{3,5} |
{3,6} |
{3,7} |
{3,8} |
{3,∞} |
{3,p,3} polytopes | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | S^{3} | H^{3} | |||||||||
Form | Finite | Compact | Paracompact | Noncompact | |||||||
{3,p,3} | {3,3,3} | {3,4,3} | {3,5,3} | {3,6,3} | {3,7,3} | {3,8,3} | ... {3,∞,3} | ||||
Image | |||||||||||
Cells | {3,3} |
{3,4} |
{3,5} |
{3,6} |
{3,7} |
{3,8} |
{3,∞} | ||||
Vertex figure |
{3,3} |
{4,3} |
{5,3} |
{6,3} |
{7,3} |
{8,3} |
{∞,3} |
{p,3,p} regular honeycombs | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Space | S^{3} | Euclidean E^{3} | H^{3} | ||||||||
Form | Finite | Affine | Compact | Paracompact | Noncompact | ||||||
Name | {3,3,3} | {4,3,4} | {5,3,5} | {6,3,6} | {7,3,7} | {8,3,8} | ...{∞,3,∞} | ||||
Image | |||||||||||
Cells | {3,3} |
{4,3} |
{5,3} |
{6,3} |
{7,3} |
{8,3} |
{∞,3} | ||||
Vertex figure |
{3,3} |
{3,4} |
{3,5} |
{3,6} |
{3,7} |
{3,8} |
{3,∞} |