bgcolor=#e7dcc3 colspan=2 | Compound of five tetrahedra | |
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align=center colspan=2 | ||
bgcolor=#e7dcc3 width=50% | Type | Regular compound |
Coxeter symbol | [5{3,3}] | |
Index | UC5, W24 | |
Elements (As a compound) | 5 tetrahedra: F = 20, E = 30, V = 20 | |
Dual compound | Self-dual | |
Symmetry group | chiral icosahedral (I) | |
Subgroup restricting to one constituent | chiral tetrahedral (T) |
It can be seen as a faceting of a regular dodecahedron.
It can be constructed by arranging five tetrahedra in rotational icosahedral symmetry (I), as colored in the upper right model. It is one of five regular compounds which can be constructed from identical Platonic solids.
It shares the same vertex arrangement as a regular dodecahedron.
There are two enantiomorphous forms (the same figure but having opposite chirality) of this compound polyhedron. Both forms together create the reflection symmetric compound of ten tetrahedra.
It has a density of higher than 1.
It can also be obtained by stellating the icosahedron, and is given as Wenninger model index 24.
It is a faceting of a dodecahedron, as shown at left.
The compound of five tetrahedra is a geometric illustration of the notion of orbits and stabilizers, as follows.
The symmetry group of the compound is the (rotational) icosahedral group I of order 60, while the stabilizer of a single chosen tetrahedron is the (rotational) tetrahedral group T of order 12, and the orbit space I/T (of order 60/12 = 5) is naturally identified with the 5 tetrahedra – the coset gT corresponds to which tetrahedron g sends the chosen tetrahedron to.
This compound is unusual, in that the dual figure is the enantiomorph of the original. If the faces are twisted to the right, then the vertices are twisted to the left. When we dualise, the faces dualise to right-twisted vertices and the vertices dualise to left-twisted faces, giving the chiral twin. Figures with this property are extremely rare.
The compound of five tetrahedra is related to the regular 5-cell, the 4-simplex regular 4-polytope, which is also composed of 5 regular tetrahedra. In the 5-cell the tetrahedra are bonded face-to-face such that each triangular face is shared by two tetrahedral cells.
The compound of five tetrahedra occurs embedded in 4-dimensional space, inscribed in the 120 dodecahedral cells of the 120-cell. The 120-cell is the largest and most comprehensive regular 4-polytope; the regular 5-cell is the smallest and most elemental. The 120-cell contains inscribed within itself instances of every other regular 4-polytope. In each of the 120-cell's dodecahedral cells, there are two inscribed instances of the compound of 5 tetrahedra (in other words, one instance of the compound of ten tetrahedra). The 5 tetrahedra of each compound of five occur as cells of another regular 4-polytope inscribed within the 120-cell, the 600-cell, which has 600 regular tetrahedra as its cells. The 120-cell is a compound of 5 disjoint 600-cells, and each of its dodecahedral cells is a compound of 5 tetrahedral cells, one cell from each of the 5 disjoint 600-cells.
. Magnus Wenninger . Polyhedron Models . Cambridge University Press . 1974 . 0-521-09859-9 .