16-cell
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| 16-cell | |
|---|---|
 Four orthographic projections |
|
| Type | Regular polychoron |
| Cells | 16 (3.3.3) |
| Faces | 32 {3} |
| Edges | 24 |
| Vertices | 8 |
| Vertex figure | 8 (3.3.3) (octahedron) |
| Schläfli symbol | {3,3,4} |
| Symmetry group | B4, [3,3,4] |
| Dual | Tesseract |
| Properties | convex |
In geometry, a 16-cell, or orthoplex, is a regular, convex polytope that exists in four dimensions. It is also known as the hexadecachoron. It is one of the six regular convex polychora first described by the Swiss mathematician Ludwig Schläfli in the mid-19th century.
Contents |
[edit] Geometry
The hexadecachoron is a member of the family of polytopes called the cross-polytopes, which exist in all dimensions. As such, its dual polychoron is the tesseract (the 4-dimensional hypercube).
It is bounded by 16 cells all of which are regular tetrahedra. It has 32 triangular faces, 24 edges, and 8 vertices. The 24 edges bound 6 squares lying in the 6 coordinate planes.
The vertices of the hexadecachoron consist of all permutations of (±1, 0, 0, 0).
The Schläfli symbol of the hexadecachoron is {3,3,4}. Its vertex figures are all regular octahedra. There are 8 tetrahedra, 12 triangles, and 6 edges meeting at every vertex. There are 4 tetrahedra and 4 triangles meeting at every edge.
[edit] Tessellations
One can tessellate 4-dimensional Euclidean space by regular 16-cells. The Schläfli symbol for this tessellation is {3,3,4,3}. The dual tessellation, {3,4,3,3}, is one by regular 24-cells. Together with the regular tesseract tessellation, {4,3,3,4}, these are the only three regular tessellations of R4. Each 16-cell has 16 neighbors with which it shares an octahedron, 24 neighbors with which it shares only an edge, and 72 neighbors with which it shares only a single point. Twenty-four 16-cells meet at any given vertex in this tessellation.
[edit] Projections
The vertex-first parallel projection of the 16-cell into 3-space has an octahedral envelope. This octahedron can be divided into 8 tetrahedral volumes, by cutting along the coordinate planes. Each of these volumes is the image of a pair of cells in the 16-cell. The closest vertex of the 16-cell to the viewer projects onto the center of the octahedron.
The cell-first parallel projection of the 16-cell into 3-space has a cubical envelope. The closest and farthest cells are projected to inscribed tetrahedra within the cube, corresponding with the two possible ways to inscribe a regular tetrahedron in a cube. Surrounding each of these tetrahedra are 4 other (non-regular) tetrahedral volumes that are the images of the 4 surrounding tetrahedral cells, filling up the space between the inscribed tetrahedron and the cube. The remaining 6 cells are projected onto the square faces of the cube. In this projection of the 16-cell, all its edges lie on the faces of the cubical envelope.
[edit] See also
| Convex regular 4-polytopes | |||||
|---|---|---|---|---|---|
| pentachoron | tesseract | 16-cell | 24-cell | 120-cell | 600-cell |
| {3,3,3} | {4,3,3} | {3,3,4} | {3,4,3} | {5,3,3} | {3,3,5} |
