Rhombicuboctahedron
| Rhombicuboctahedron | |
|---|---|
 (Click here for rotating model) | |
| Type | Archimedean solid Uniform polyhedron |
| Elements | F = 26, E = 48, V = 24 (χ = 2) |
| Faces by sides | 8{3}+(6+12){4} |
| Conway notation | eC or aaC aaaT |
| Schläfli symbols | rr{4,3} or [math]\displaystyle{ r\begin{Bmatrix} 4 \\ 3 \end{Bmatrix} }[/math] |
| t0,2{4,3} | |
| Wythoff symbol | 3 4 | 2 |
| Coxeter diagram |    
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| Symmetry group | Oh, B3, [4,3], (*432), order 48 |
| Rotation group | O, [4,3]+, (432), order 24 |
| Dihedral angle | 3-4: 144°44′08″ (144.74°) 4-4: 135° |
| References | U10, C22, W13 |
| Properties | Semiregular convex |
 Colored faces |
 3.4.4.4 (Vertex figure) |
 Deltoidal icositetrahedron (dual polyhedron) |
 Net |
In geometry, the rhombicuboctahedron, or small rhombicuboctahedron, is a polyhedron with eight triangular, six square, and twelve rectangular faces. There are 24 identical vertices, with one triangle, one square, and two rectangles meeting at each one. If all the rectangles are themselves square (equivalently, all the edges are the same length, ensuring the triangles are equilateral), it is an Archimedean solid. The polyhedron has octahedral symmetry, like the cube and octahedron. Its dual is called the deltoidal icositetrahedron or trapezoidal icositetrahedron, although its faces are not really true trapezoids.
Names
Johannes Kepler in Harmonices Mundi (1618) named this polyhedron a rhombicuboctahedron, being short for truncated cuboctahedral rhombus, with cuboctahedral rhombus being his name for a rhombic dodecahedron.[1] There are different truncations of a rhombic dodecahedron into a topological rhombicuboctahedron: Prominently its rectification (left), the one that creates the uniform solid (center), and the rectification of the dual cuboctahedron (right), which is the core of the dual compound.
It can also be called an expanded or cantellated cube or octahedron, from truncation operations on either uniform polyhedron.
Geometric relations
There are distortions of the rhombicuboctahedron that, while some of the faces are not regular polygons, are still vertex-uniform. Some of these can be made by taking a cube or octahedron and cutting off the edges, then trimming the corners, so the resulting polyhedron has six square and twelve rectangular faces. These have octahedral symmetry and form a continuous series between the cube and the octahedron, analogous to the distortions of the rhombicosidodecahedron or the tetrahedral distortions of the cuboctahedron. However, the rhombicuboctahedron also has a second set of distortions with six rectangular and sixteen trapezoidal faces, which do not have octahedral symmetry but rather Th symmetry, so they are invariant under the same rotations as the tetrahedron but different reflections.
The lines along which a Rubik's Cube can be turned are, projected onto a sphere, similar, topologically identical, to a rhombicuboctahedron's edges. In fact, variants using the Rubik's Cube mechanism have been produced which closely resemble the rhombicuboctahedron.[2][3]
The rhombicuboctahedron is used in three uniform space-filling tessellations: the cantellated cubic honeycomb, the runcitruncated cubic honeycomb, and the runcinated alternated cubic honeycomb.
Dissection
The rhombicuboctahedron can be dissected into two square cupolae and a central octagonal prism. A rotation of one cupola by 45 degrees creates the pseudorhombicuboctahedron. Both of these polyhedra have the same vertex figure: 3.4.4.4.
There are three pairs of parallel planes that each intersect the rhombicuboctahedron in a regular octagon. The rhombicuboctahedron may be divided along any of these to obtain an octagonal prism with regular faces and two additional polyhedra called square cupolae, which count among the Johnson solids; it is thus an elongated square orthobicupola. These pieces can be reassembled to give a new solid called the elongated square gyrobicupola or pseudorhombicuboctahedron, with the symmetry of a square antiprism. In this the vertices are all locally the same as those of a rhombicuboctahedron, with one triangle and three squares meeting at each one, but are not all identical with respect to the entire polyhedron, since some are closer to the symmetry axis than others.
|
 Rhombicuboctahedron |
 Pseudorhombicuboctahedron |
Orthogonal projections
The rhombicuboctahedron has six special orthogonal projections, centered, on a vertex, on two types of edges, and three types of faces: triangles, and two squares. The last two correspond to the B2 and A2 Coxeter planes.
| Centered by | Vertex | Edge 3-4 |
Edge 4-4 |
Face Square-1 |
Face Square-2 |
Face Triangle |
|---|---|---|---|---|---|---|
| Solid | 
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| Wireframe | 
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| Projective symmetry |
[2] | [2] | [2] | [2] | [4] | [6] |
| Dual | 
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Spherical tiling
The rhombicuboctahedron can also be represented as a spherical tiling, and projected onto the plane via a stereographic projection. This projection is conformal, preserving angles but not areas or lengths. Straight lines on the sphere are projected as circular arcs on the plane.
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 (6) square-centered |
 (6) square-centered |
 (8) triangle-centered |
| Orthogonal projection | Stereographic projections | ||
|---|---|---|---|
Pyritohedral symmetry
A half symmetry form of the rhombicuboctahedron, , exists with pyritohedral symmetry, [4,3+], (3*2) as Coxeter diagram 
, Schläfli symbol s2{3,4}, and can be called a cantic snub octahedron. This form can be visualized by alternatingly coloring the edges of the 6 squares. These squares can then be distorted into rectangles, while the 8 triangles remain equilateral. The 12 diagonal square faces will become isosceles trapezoids. In the limit, the rectangles can be reduced to edges, and the trapezoids become triangles, and an icosahedron is formed, by a snub octahedron construction, , s{3,4}. (The compound of two icosahedra is constructed from both alternated positions.)
| Pyritohedral symmetry variations | |||||||||
|---|---|---|---|---|---|---|---|---|---|
 Uniform geometry
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 Nonuniform geometry |
 Nonuniform geometry |
 In the limit, an icosahedron snub octahedron, ,from one of two positions. |
 Compound of two icosahedra from both alternated positions. | |||||
Algebraic properties
Cartesian coordinates
Cartesian coordinates for the vertices of a rhombicuboctahedron centred at the origin, with edge length 2 units, are all the even permutations of
- (±1, ±1, ±(1 + √2)).
If the original rhombicuboctahedron has unit edge length, its dual strombic icositetrahedron has edge lengths
- [math]\displaystyle{ \frac{2}{7}\sqrt{10-\sqrt{2}} \quad \text{and} \quad \sqrt{4-2\sqrt{2}}. }[/math]
Area and volume
The area A and the volume V of the rhombicuboctahedron of edge length a are:
- [math]\displaystyle{ \begin{align} A &= \left(18+2\sqrt{3}\right)a^2 &&\approx 21.464\,1016a^2 \\ V &= \frac{12+10\sqrt{2}}{3} a^3 &&\approx 8.714\,045\,21a^3. \end{align} }[/math]
Close-packing density
The optimal packing fraction of rhombicuboctahedra is given by
- [math]\displaystyle{ \eta = \tfrac{4}{3} \left( 4\sqrt{2} - 5 \right) }[/math].
It was noticed that this optimal value is obtained in a Bravais lattice by de Graaf (2011). Since the rhombicuboctahedron is contained in a rhombic dodecahedron whose inscribed sphere is identical to its own inscribed sphere, the value of the optimal packing fraction is a corollary of the Kepler conjecture: it can be achieved by putting a rhombicuboctahedron in each cell of the rhombic dodecahedral honeycomb, and it cannot be surpassed, since otherwise the optimal packing density of spheres could be surpassed by putting a sphere in each rhombicuboctahedron of the hypothetical packing which surpasses it.
In the arts
The 1495 Portrait of Luca Pacioli, traditionally attributed to Jacopo de' Barbari, includes a glass rhombicuboctahedron half-filled with water, which may have been painted by Leonardo da Vinci.[5] The first printed version of the rhombicuboctahedron was by Leonardo and appeared in Pacioli's Divina proportione (1509).
A spherical 180° × 360° panorama can be projected onto any polyhedron; but the rhombicuboctahedron provides a good enough approximation of a sphere while being easy to build. This type of projection, called Philosphere, is possible from some panorama assembly software. It consists of two images that are printed separately and cut with scissors while leaving some flaps for assembly with glue.[6]
Objects
During the Rubik's Cube craze of the 1980s, at least two twisty puzzles sold had the form of a rhombicuboctahedron (the mechanism was similar to that of a Rubik's Cube).[2][3][better source needed]
Sundial (1596)
Sundial
Street lamp in Mainz
Die with 18 labelled faces
Cabela's shooting target
Rubik's Snake
Rubik's Cube variation
Pyrite crystal
Related polyhedra
The rhombicuboctahedron is one of a family of uniform polyhedra related to the cube and regular octahedron.
Symmetry mutations
This polyhedron is topologically related as a part of sequence of cantellated polyhedra with vertex figure (3.4.n.4), and continues as tilings of the hyperbolic plane. These vertex-transitive figures have (*n32) reflectional symmetry.
Vertex arrangement
It shares its vertex arrangement with three nonconvex uniform polyhedra: the stellated truncated hexahedron, the small rhombihexahedron (having the triangular faces and six square faces in common), and the small cubicuboctahedron (having twelve square faces in common).
Rhombicuboctahedron |
 Small cubicuboctahedron |
 Small rhombihexahedron |
 Stellated truncated hexahedron |
| Rhombicuboctahedral graph | |
|---|---|
 4-fold symmetry | |
| Vertices | 24 |
| Edges | 48 |
| Automorphisms | 48 |
| Properties | Quartic graph, Hamiltonian, regular |
| Table of graphs and parameters | |
Rhombicuboctahedral graph
The rhombicuboctahedral graph is the graph of vertices and edges of the rhombicuboctahedron. It has 24 vertices and 48 edges, and is a quartic Archimedean graph.[7]
See also
- Compound of five rhombicuboctahedra
- Cube
- Cuboctahedron
- Nonconvex great rhombicuboctahedron
- Truncated rhombicuboctahedron
- Elongated square gyrobicupola
- Moravian star
- Octahedron
- Rhombicosidodecahedron
- Rubik's Snake – puzzle that can form a Rhombicuboctahedron "ball"
- National Library of Belarus – its architectural main component has the shape of a rhombicuboctahedron.
- Truncated cuboctahedron (great rhombicuboctahedron)
References
- ↑ Harmonies Of The World by Johannes Kepler, Translated into English with an introduction and notes by E. J. Aiton, A. M. Duncan, J. V. Field, 1997, ISBN 0-87169-209-0 (page 119)
- ↑ 2.0 2.1 "Soviet Puzzle Ball". http://twistypuzzles.com/cgi-bin/puzzle.cgi?pkey=5070.
- ↑ 3.0 3.1 "Diamond Style Puzzler". https://www.jaapsch.net/puzzles/diamstyl.htm.
- ↑ "RitrattoPacioli.it". http://www.ritrattopacioli.it/texting.htm.
- ↑ MacKinnon, Nick (1993). "The Portrait of Fra Luca Pacioli". The Mathematical Gazette 77 (479): 143. doi:10.2307/3619717.
- ↑ "Philosphere". http://www.philohome.com/rhombicuboctahedron/rhombicuboctahedron.htm.
- ↑ Read, R. C.; Wilson, R. J. (1998), An Atlas of Graphs, Oxford University Press, p. 269
Further reading
- Williams, Robert (1979). The Geometrical Foundation of Natural Structure: A Source Book of Design. Dover Publications, Inc. ISBN 0-486-23729-X. (Section 3–9)
- Cromwell, P. (1997). Polyhedra. United Kingdom: Cambridge. pp. 79–86 Archimedean solids. ISBN 0-521-55432-2.
- Coxeter, H.S.M.; Longuet-Higgins, M.S.; Miller, J.C.P. (May 13, 1954). "Uniform Polyhedra". Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences 246 (916): 401–450. doi:10.1098/rsta.1954.0003. Bibcode: 1954RSPTA.246..401C.
- de Graaf, J.; van Roij, R.; Dijkstra, M. (2011), "Dense Regular Packings of Irregular Nonconvex Particles", Physical Review Letters 107 (15): 155501, doi:10.1103/PhysRevLett.107.155501, PMID 22107298, Bibcode: 2011PhRvL.107o5501D
- Betke, U.; Henk, M. (2000), "Densest Lattice Packings of 3-Polytopes", Computational Geometry 16 (3): 157–186, doi:10.1016/S0925-7721(00)00007-9
- Torquato, S.; Jiao, Y. (2009), "Dense packings of the Platonic and Archimedean solids", Nature 460 (7257): 876–879, doi:10.1038/nature08239, PMID 19675649, Bibcode: 2009Natur.460..876T
- Hales, Thomas C. (2005), "A proof of the Kepler conjecture", Annals of Mathematics 162 (3): 1065–1185, doi:10.4007/annals.2005.162.1065
External links
- Eric W. Weisstein, Rhombicuboctahedron (Archimedean solid) at MathWorld.
- Klitzing, Richard. "3D convex uniform polyhedra x3o4x - sirco". https://bendwavy.org/klitzing/dimensions/polyhedra.htm.
- The Uniform Polyhedra
- Virtual Reality Polyhedra The Encyclopedia of Polyhedra
- Editable printable net of a rhombicuboctahedron with interactive 3D view
- Rhombicuboctahedron Star by Sándor Kabai, Wolfram Demonstrations Project.
- Rhombicuboctahedron: paper strips for plaiting
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