Rhombic dodecahedron | |
---|---|
(Click here for rotating model) | |
Type | Catalan solid |
Coxeter diagram | |
Conway notation | jC |
Face type | V3.4.3.4 rhombus |
Faces | 12 |
Edges | 24 |
Vertices | 14 |
Vertices by type | 8{3}+6{4} |
Symmetry group | O_{h}, B_{3}, [4,3], (*432) |
Rotation group | O, [4,3]^{+}, (432) |
Dihedral angle | 120° |
Properties | convex, face-transitive isohedral, isotoxal, parallelohedron |
Cuboctahedron (dual polyhedron) |
Net |
In geometry, the rhombic dodecahedron is a convex polyhedron with 12 congruent rhombic faces. It has 24 edges, and 14 vertices of two types. It is a Catalan solid, and the dual polyhedron of the cuboctahedron.
The rhombic dodecahedron is a zonohedron. Its polyhedral dual is the cuboctahedron. The long diagonal of each face is exactly times the length of the short diagonal, so that the acute angles on each face measure arccos, or approximately 70.53°.
Being the dual of an Archimedean polyhedron, the rhombic dodecahedron is face-transitive, meaning the symmetry group of the solid acts transitively on the set of faces. In elementary terms, this means that for any two faces A and B there is a rotation or reflection of the solid that leaves it occupying the same region of space while moving face A to face B.
The rhombic dodecahedron can be viewed as the convex hull of the union of the vertices of a cube and an octahedron. The 6 vertices where 4 rhombi meet correspond to the vertices of the octahedron, while the 8 vertices where 3 rhombi meet correspond to the vertices of the cube.
The rhombic dodecahedron is one of the nine edge-transitive convex polyhedra, the others being the five Platonic solids, the cuboctahedron, the icosidodecahedron and the rhombic triacontahedron.
The rhombic dodecahedron can be used to tessellate three-dimensional space. It can be stacked to fill a space much like hexagons fill a plane.
This polyhedron in a space-filling tessellation can be seen as the Voronoi tessellation of the face-centered cubic lattice. It is the Brillouin zone of body centered cubic (bcc) crystals. Some minerals such as garnet form a rhombic dodecahedral crystal habit. As Johannes Kepler noted in his 1611 book on snowflakes (Strena seu de Nive Sexangula), honey bees use the geometry of rhombic dodecahedra to form honeycombs from a tessellation of cells each of which is a hexagonal prism capped with half a rhombic dodecahedron. The rhombic dodecahedron also appears in the unit cells of diamond and diamondoids. In these cases, four vertices (alternate threefold ones) are absent, but the chemical bonds lie on the remaining edges.^{[1]}
The graph of the rhombic dodecahedron is nonhamiltonian.
A rhombic dodecahedron can be dissected with its center into 4 trigonal trapezohedra. These rhombohedra are the cells of a trigonal trapezohedral honeycomb. This is analogous to the dissection of a regular hexagon dissected into rhombi, and tiled in the plane as a rhombille.
The collections of the Louvre include a die in the shape of a rhombic dodecahdron dating from Ptolemaic Egypt. The faces are inscribed with Greek letters representing the numbers 1 through 12 ? ? ? ? ? ? ? ? ? . The function of the die is unknown.^{[2]}
A garnet crystal
If the edge length of a rhombic dodecahedron is a, the radius of an inscribed sphere (tangent to each of the rhombic dodecahedron's faces) is
and the radius of the midsphere is
The area A and the volume V of the rhombic dodecahedron of edge length a are:
The rhombic dodecahedron has four special orthogonal projections along its axes of symmetry, centered on a face, an edge, and the two types of vertex, threefold and fourfold. The last two correspond to the B_{2} and A_{2}Coxeter planes.
Pyritohedron variations between a cube and rhombic dodecahedron |
Expansion of a rhombic dodecahedron |
The eight vertices where three faces meet at their obtuse angles have Cartesian coordinates:
The coordinates of the six vertices where four faces meet at their acute angles are:
The rhombic dodecahedron can be seen as a degenerate limiting case of a pyritohedron, with permutation of coordinates and with parameter h = 1.
The rhombic dodecahedron is a parallelohedron, a space-filling polyhedron, dodecahedrille, being the dual to the tetroctahedrille or half cubic honeycomb, and described by two Coxeter diagrams: and . With D_{3d} symmetry, it can be seen as an elongated trigonal trapezohedron.
The rhombic dodecahedron can tessellate space by translational copies of itself. So can the stellated rhombic dodecahedron. |
The rhombic dodecahedron can be constructed with 4 sets of parallel edges. |
Other symmetry constructions of the rhombic dodecahedron are also space-filling, and as parallelotopes they are similar to variations of space-filling truncated octahedra.^{[3]}
For example, with 4 square faces, and 60-degree rhombic faces, and D_{4h}dihedral symmetry, order 16. It can be seen as a cuboctahedron with square pyramids augmented on the top and bottom.
Bilinski dodecahedron with edges and front faces colored by their symmetry positions. |
Bilinski dodecahedron colored by parallel edges |
In 1960 Stanko Bilinski discovered a second rhombic dodecahedron with 12 congruent rhombus faces, the Bilinski dodecahedron. It has the same topology but different geometry. The rhombic faces in this form have the golden ratio.^{[4]}^{[5]}
Another topologically equivalent variation, sometimes called a deltoidal dodecahedron^{[6]} or trapezoidal dodecahedron,^{[7]}^{[8]} is isohedral with tetrahedral symmetry order 24, distorting rhombic faces into kites (deltoids). It has 8 vertices adjusted in or out in alternate sets of 4, with the limiting case a tetrahedral envelope. Variations can be parametrized by (a,b), where b is determined from a for planar faces. (1,1) is the rhombic solution. As (a) approaches , (b) approaches infinity.
Uniform octahedral polyhedra | ||||||||||
---|---|---|---|---|---|---|---|---|---|---|
Symmetry: [4,3], (*432) | [4,3]^{+} (432) |
[1^{+},4,3] = [3,3] (*332) |
[3^{+},4] (3*2) | |||||||
{4,3} | t{4,3} | r{4,3} r{3^{1,1}} |
t{3,4} t{3^{1,1}} |
{3,4} {3^{1,1}} |
rr{4,3} s_{2}{3,4} |
tr{4,3} | sr{4,3} | h{4,3} {3,3} |
h_{2}{4,3} t{3,3} |
s{3,4} s{3^{1,1}} |
= |
= |
= |
= or |
= or |
= | |||||
Duals to uniform polyhedra | ||||||||||
V4^{3} | V3.8^{2} | V(3.4)^{2} | V4.6^{2} | V3^{4} | V3.4^{3} | V4.6.8 | V3^{4}.4 | V3^{3} | V3.6^{2} | V3^{5} |
When projected onto a sphere (see right), it can be seen that the edges make up the edges of two tetrahedra arranged in their dual positions (the stella octangula). This trend continues on with the deltoidal icositetrahedron and deltoidal hexecontahedron for the dual pairings of the other regular polyhedra (alongside the triangular bipyramid if improper tilings are to be considered), giving this shape the alternative systematic name of deltoidal dodecahedron.
Symmetry *n32 [n,3] |
Spherical | Euclid. | Compact hyperb. | Paraco. | ||||
---|---|---|---|---|---|---|---|---|
*232 [2,3] |
*332 [3,3] |
*432 [4,3] |
*532 [5,3] |
*632 [6,3] |
*732 [7,3] |
*832 [8,3]... |
*∞32 [∞,3] | |
Figure Config. |
V3.4.2.4 |
V3.4.3.4 |
V3.4.4.4 |
V3.4.5.4 |
V3.4.6.4 |
V3.4.7.4 |
V3.4.8.4 |
V3.4.∞.4 |
This polyhedron is a part of a sequence of rhombic polyhedra and tilings with [n,3] Coxeter group symmetry. The cube can be seen as a rhombic hexahedron where the rhombi are squares.
Symmetry mutations of dual quasiregular tilings: V(3.n)^{2} | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
*n32 | Spherical | Euclidean | Hyperbolic | ||||||||
*332 | *432 | *532 | *632 | *732 | *832... | *∞32 | |||||
Tiling | |||||||||||
Conf. | V(3.3)^{2} | V(3.4)^{2} | V(3.5)^{2} | V(3.6)^{2} | V(3.7)^{2} | V(3.8)^{2} | V(3.∞)^{2} |
*n42 symmetry mutations of quasiregular dual tilings: V(4.n)^{2} | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
Symmetry *4n2 [n,4] |
Spherical | Euclidean | Compact hyperbolic | Paracompact | Noncompact | ||||||
*342 [3,4] |
*442 [4,4] |
*542 [5,4] |
*642 [6,4] |
*742 [7,4] |
*842 [8,4]... |
*∞42 [∞,4] |
[iπ/λ,4] | ||||
Tiling Conf. |
V4.3.4.3 |
V4.4.4.4 |
V4.5.4.5 |
V4.6.4.6 |
V4.7.4.7 |
V4.8.4.8 |
V4.∞.4.∞ |
V4.∞.4.∞ |
Similarly it relates to the infinite series of tilings with the face configurations V3.2n.3.2n, the first in the Euclidean plane, and the rest in the hyperbolic plane.
V3.4.3.4 (Drawn as a net) |
V3.6.3.6 Euclidean plane tiling Rhombille tiling |
V3.8.3.8 Hyperbolic plane tiling (Drawn in a Poincaré disk model) |
Like many convex polyhedra, the rhombic dodecahedron can be stellated by extending the faces or edges until they meet to form a new polyhedron. Several such stellations have been described by Dorman Luke.^{[9]}
The first stellation, often simply called the stellated rhombic dodecahedron, is well known. It can be seen as a rhombic dodecahedron with each face augmented by attaching a rhombic-based pyramid to it, with a pyramid height such that the sides lie in the face planes of the neighbouring faces:
Luke describes four more stellations: the second and third stellations (expanding outwards), one formed by removing the second from the third, and another by adding the original rhombic dodecahedron back to the previous one.
The rhombic dodecahedron forms the hull of the vertex-first projection of a tesseract to three dimensions. There are exactly two ways of decomposing a rhombic dodecahedron into four congruent rhombohedra, giving eight possible rhombohedra as projections of the tesseracts 8 cubic cells. One set of projective vectors are: u=(1,1,-1,-1), v=(-1,1,-1,1), w=(1,-1,-1,1).
The rhombic dodecahedron forms the maximal cross-section of a 24-cell, and also forms the hull of its vertex-first parallel projection into three dimensions. The rhombic dodecahedron can be decomposed into six congruent (but non-regular) square dipyramids meeting at a single vertex in the center; these form the images of six pairs of the 24-cell's octahedral cells. The remaining 12 octahedral cells project onto the faces of the rhombic dodecahedron. The non-regularity of these images are due to projective distortion; the facets of the 24-cell are regular octahedra in 4-space.
This decomposition gives an interesting method for constructing the rhombic dodecahedron: cut a cube into six congruent square pyramids, and attach them to the faces of a second cube. The triangular faces of each pair of adjacent pyramids lie on the same plane, and so merge into rhombuses. The 24-cell may also be constructed in an analogous way using two tesseracts.^{[10]}
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