Regular dodecahedron

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Short description: Polyhedron with 12 regular pentagonal faces


Regular dodecahedron
Dodecahedron.jpg
(Click here for rotating model)
Type Platonic solid
Elements F = 12, E = 30
V = 20 (χ = 2)
Faces by sides 12{5}
Conway notation D
Schläfli symbols {5,3}
Face configuration V3.3.3.3.3
Wythoff symbol 3 | 2 5
Coxeter diagram CDel node 1.pngCDel 5.pngCDel node.pngCDel 3.pngCDel node.png
Symmetry Ih, H3, [5,3], (*532)
Rotation group I, [5,3]+, (532)
References U23, C26, W5
Properties regular, convex
Dihedral angle 116.56505° = arccos(−​15)
Dodecahedron vertfig.png
5.5.5
(Vertex figure)
Icosahedron.png
Regular icosahedron
(dual polyhedron)
Dodecahedron flat.svg
Net
Animation of a net of a regular (pentagonal) dodecahedron being folded

File:Regular dodecahedron.stl

Crystal structure of Co20L12 dodecahedron reported by Kai Wu, Jonathan Nitschke and co-workers at University of Cambridge in Nat. Synth. 2023, DOI:10.1038/s44160-023-00276-9 [1]

A regular dodecahedron or pentagonal dodecahedron is a dodecahedron that is regular, which is composed of 12 regular pentagonal faces, three meeting at each vertex. It is one of the five Platonic solids. It has 12 faces, 20 vertices, 30 edges, and 160 diagonals (60 face diagonals, 100 space diagonals).[2] It is represented by the Schläfli symbol {5,3}.

Dimensions

If the edge length of a regular dodecahedron is [math]\displaystyle{ a }[/math], the radius of a circumscribed sphere (one that touches the regular dodecahedron at all vertices) is

[math]\displaystyle{ r_u = a\frac{\sqrt{3}}{4} \left(1 + \sqrt{5}\right) \approx 1.401\,258\,538 \cdot a }[/math]

(sequence A179296 in the OEIS)

and the radius of an inscribed sphere (tangent to each of the regular dodecahedron's faces) is

[math]\displaystyle{ r_i = a\frac{1}{2} \sqrt{\frac{5}{2} +\frac{11}{10}\sqrt{5}} \approx 1.113\,516\,364 \cdot a }[/math]

while the midradius, which touches the middle of each edge, is

[math]\displaystyle{ r_m = a\frac{1}{4} \left(3 +\sqrt{5}\right) \approx 1.309\,016\,994 \cdot a }[/math]

These quantities may also be expressed as

[math]\displaystyle{ r_u = a\, \frac{\sqrt{3}}{2} \phi }[/math]
[math]\displaystyle{ r_i = a\, \frac{\phi^2}{2 \sqrt{3-\phi}} }[/math]
[math]\displaystyle{ r_m = a\, \frac{\phi^2}{2} }[/math]

where ϕ is the golden ratio.

Note that, given a regular dodecahedron of edge length one, ru is the radius of a circumscribing sphere about a cube of edge length ϕ, and ri is the apothem of a regular pentagon of edge length ϕ.

Surface area and volume

The surface area A and the volume V of a regular dodecahedron of edge length a are:

[math]\displaystyle{ {\displaystyle A = 3\sqrt{25+10\sqrt{5}} a^2 \approx 20.645\,728\,807a^2} }[/math]
[math]\displaystyle{ V = \frac{1}{4} (15+7\sqrt{5}) a^3 \approx 7.663\,118\,9606a^3 }[/math]

Additionally, the surface area and volume of a regular dodecahedron are related to the golden ratio. A dodecahedron with an edge length of one unit has the properties:[3]

[math]\displaystyle{ {\displaystyle A = \frac{15\phi}{\sqrt{3-\phi}}} }[/math]
[math]\displaystyle{ {\displaystyle V = \frac{5\phi^3}{6-2\phi}} }[/math]

Two-dimensional symmetry projections

The regular dodecahedron has two high orthogonal projections, centered, on vertices and pentagonal faces, correspond to the A2 and H2 Coxeter planes. The edge-center projection has two orthogonal lines of reflection.

Orthogonal projections
Centered by Vertex Face Edge
Image Dodecahedron A2 projection.svg Dodecahedron H3 projection.svg Dodecahedron t0 e.png
Projective
symmetry
3 = [6] 5 = [10] [2]

In perspective projection, viewed on top of a pentagonal face, the regular dodecahedron can be seen as a linear-edged Schlegel diagram, or stereographic projection as a spherical polyhedron. These projections are also used in showing the four-dimensional 120-cell, a regular 4-dimensional polytope, constructed from 120 dodecahedra, projecting it down to 3-dimensions.

Projection Orthogonal projection Perspective projection
Schlegel diagram Stereographic projection
Regular dodecahedron Dodecahedron H3 projection.svg Dodecahedron schlegel.svg Dodecahedron stereographic projection.png
Dodecaplex
(120-cell)
120-cell t0 H3.svg Schlegel wireframe 120-cell.png Stereographic polytope 120cell faces.png

Spherical tiling

The regular dodecahedron can also be represented as a spherical tiling.

Uniform tiling 532-t0.png Dodecahedron stereographic projection.svg
Orthographic projection Stereographic projection

Cartesian coordinates

Vertex coordinates:
     The orange vertices lie at (±1, ±1, ±1) and form a cube (dotted lines).
     The green vertices lie at (0, ±ϕ, ±1/ϕ) and form a rectangle on the yz-plane.
     The blue vertices lie at (±1/ϕ, 0, ±ϕ) and form a rectangle on the xz-plane.
     The pink vertices lie at (±ϕ, ±1/ϕ, 0) and form a rectangle on the xy-plane.
The distance between adjacent vertices is 2/ϕ, and the distance from the origin to any vertex is 3.
ϕ = 1 + 5/2 is the golden ratio.

The following Cartesian coordinates define the 20 vertices of a regular dodecahedron centered at the origin and suitably scaled and oriented:[4]

(±1, ±1, ±1)
(0, ±ϕ, ±1/ϕ)
1/ϕ, 0, ±ϕ)
ϕ, ±1/ϕ, 0)

where ϕ = 1 + 5/2 ≈ 1.618 is the golden ratio. The edge length is 2/ϕ = 5 − 1. The circumradius is 3.

Facet-defining equations

Similar to the symmetry of the vertex coordinates, the equations of the twelve facets of the regular dodecahedron also display symmetry in their coefficients:

x ± ϕy = ±ϕ2
y ± ϕz = ±ϕ2
z ± ϕx = ±ϕ2

Properties

  • The dihedral angle of a regular dodecahedron is 2 arctan(ϕ) or approximately 116.565° (where again ϕ = 1 + 5/2, the golden ratio). OEISA137218 Note that the tangent of the dihedral angle is exactly −2.
  • If the original regular dodecahedron has edge length 1, its dual icosahedron has edge length ϕ.
  • If the five Platonic solids are built with same volume, the regular dodecahedron has the shortest edges. It is the roundest of the five Platonic solids, enclosing the most volume within the same radius.
  • It has 43,380 nets.
  • The map-coloring number of a regular dodecahedron's faces is 4.
  • The distance between the vertices on the same face not connected by an edge is ϕ times the edge length, because the diagonal of a pentagon is ϕ times its edge length.
  • If two edges share a common vertex, then the midpoints of those edges form a 36-72-72 golden triangle with the body center.

As a configuration

This configuration matrix represents the dodecahedron. The rows and columns correspond to vertices, edges, and faces. The diagonal numbers say how many of each element occur in the whole dodecahedron. The nondiagonal numbers say how many of the column's element occur in or at the row's element.[5][6]

[math]\displaystyle{ \begin{bmatrix}\begin{matrix}20 & 3 & 3 \\ 2 & 30 & 2 \\ 5 & 5 & 12 \end{matrix}\end{bmatrix} }[/math]

Here is the configuration expanded with k-face elements and k-figures. The diagonal element counts are the ratio of the full Coxeter group H3, order 120, divided by the order of the subgroup with mirror removal.

H3 CDel node 1.pngCDel 5.pngCDel node.pngCDel 3.pngCDel node.png k-face fk f0 f1 f2 k-fig Notes
A2 CDel node x.pngCDel 2.pngCDel node.pngCDel 3.pngCDel node.png ( ) f0 20 3 3 {3} H3/A2 = 120/6 = 20
A1A1 CDel node 1.pngCDel 2.pngCDel node x.pngCDel 2.pngCDel node.png { } f1 2 30 2 { } H3/A1A1 = 120/4 = 30
H2 CDel node 1.pngCDel 5.pngCDel node.pngCDel 2.pngCDel node x.png {5} f2 5 5 12 ( ) H3/H2 = 120/10 = 12

Geometric relations

The regular dodecahedron is the third in an infinite set of truncated trapezohedra which can be constructed by truncating the two axial vertices of a pentagonal trapezohedron.

The stellations of the regular dodecahedron make up three of the four Kepler–Poinsot polyhedra.

A rectified regular dodecahedron forms an icosidodecahedron.

The regular dodecahedron has icosahedral symmetry Ih, Coxeter group [5,3], order 120, with an abstract group structure of A5 × Z2.

Relation to the regular icosahedron

The dodecahedron and icosahedron are dual polyhedra. A regular dodecahedron has 12 faces and 20 vertices, whereas a regular icosahedron has 20 faces and 12 vertices. Both have 30 edges.

When a regular dodecahedron is inscribed in a sphere, it occupies more of the sphere's volume (66.49%) than an icosahedron inscribed in the same sphere (60.55%).

A regular dodecahedron with edge length 1 has more than three and a half times the volume of an icosahedron with the same length edges (7.663... compared with 2.181...), which ratio is approximately 3.51246117975, or in exact terms: 3/5(3ϕ + 1) or (1.8ϕ + 0.6).

Relation to the nested cube

A cube can be embedded within a regular dodecahedron, affixed to eight of its equidistant vertices, in five different positions.[7] In fact, five cubes may overlap and interlock inside the regular dodecahedron to result in the compound of five cubes.

The ratio of the edge of a regular dodecahedron to the edge of a cube embedded inside such a regular dodecahedron is 1 : ϕ, or (ϕ − 1) : 1.

The ratio of a regular dodecahedron's volume to the volume of a cube embedded inside such a regular dodecahedron is 1 : 2/2 + ϕ, or 1 + ϕ/2 : 1, or (5 + 5) : 4.

For example, an embedded cube with a volume of 64 (and edge length of 4), will nest within a regular dodecahedron of volume 64 + 32ϕ (and edge length of 4ϕ − 4).

Thus, the difference in volume between the encompassing regular dodecahedron and the enclosed cube is always one half the volume of the cube times ϕ.

From these ratios are derived simple formulas for the volume of a regular dodecahedron with edge length a in terms of the golden mean:

V = ()3 · 1/4(5 + 5)
V = 1/4(14ϕ + 8)a3

Relation to the regular tetrahedron

Five tetrahedra inscribed in a dodecahedron. Five opposing tetrahedra (not shown) can also be inscribed.

As two opposing tetrahedra can be inscribed in a cube, and five cubes can be inscribed in a dodecahedron, ten tetrahedra in five cubes can be inscribed in a dodecahedron: two opposing sets of five, with each set covering all 20 vertices and each vertex in two tetrahedra (one from each set, but not the opposing pair).

Just as a tetrahedron can be inscribed in a cube, so a cube can be inscribed in a dodecahedron. By reciprocation, this leads to an octahedron circumscribed about an icosahedron. In fact, each of the twelve vertices of the icosahedron divides an edge of the octahedron according to the "golden section". Given the icosahedron, the circumscribed octahedron can be chosen in five ways, giving a compound of five octahedra, which comes under our definition of stellated icosahedron. (The reciprocal compound, of five cubes whose vertices belong to a dodecahedron, is a stellated triacontahedron.) Another stellated icosahedron can at once be deduced, by stellating each octahedron into a stella octangula, thus forming a compound of ten tetrahedra. Further, we can choose one tetrahedron from each stella octangula, so as to derive a compound of five tetrahedra, which still has all the rotation symmetry of the icosahedron (i.e. the icosahedral group), although it has lost the reflections. By reflecting this figure in any plane of symmetry of the icosahedron, we obtain the complementary set of five tetrahedra. These two sets of five tetrahedra are enantiomorphous, i.e. not directly congruent, but related like a pair of shoes. [Such] a figure which possesses no plane of symmetry (so that it is enantiomorphous to its mirror-image) is said to be chiral.[8]

Relation to the golden rectangle

Golden rectangles of ratio (ϕ + 1) : 1 and ϕ : 1 also fit perfectly within a regular dodecahedron.[9] In proportion to this golden rectangle, an enclosed cube's edge is ϕ, when the long length of the rectangle is ϕ + 1 (or ϕ2) and the short length is 1 (the edge shared with the regular dodecahedron).

In addition, the center of each face of the regular dodecahedron form three intersecting golden rectangles.[10]

Relation to the 6-cube and rhombic triacontahedron

Projection of 6-demicube into regular dodecahedral envelope

It can be projected to 3D from the 6-dimensional 6-demicube using the same basis vectors that form the hull of the rhombic triacontahedron from the 6-cube. Shown here including the inner 12 vertices, which are not connected by the outer hull edges of 6D norm length 2, form a regular icosahedron.

The 3D projection basis vectors [u,v,w] used are:

u = (1, ϕ, 0, −1, ϕ, 0)
v = (ϕ, 0, 1, ϕ, 0, −1)
w = (0, 1, ϕ, 0, −1, ϕ)

History and uses

Omnidirectional sound source

Regular dodecahedral objects have found some practical applications, and have also played a role in the visual arts and in philosophy.

Iamblichus states that Hippasus, a Pythagorean, perished in the sea, because he boasted that he first divulged "the sphere with the twelve pentagons".[11] In Theaetetus, a dialogue of Plato, Plato hypothesized that the classical elements were made of the five uniform regular solids; these later became known as the platonic solids. Of the fifth Platonic solid, the dodecahedron, Plato obscurely remarked, "...the god used [it] for arranging the constellations on the whole heaven". Timaeus (c. 360 BC), as a personage of Plato's dialogue, associates the other four platonic solids with the four classical elements, adding that there is a fifth solid pattern which, though commonly associated with the regular dodecahedron, is never directly mentioned as such; "this God used in the delineation of the universe."[12] Aristotle also postulated that the heavens were made of a fifth element, which he called aithêr (aether in Latin, ether in American English).

Theaetetus gave a mathematical description of all five and may have been responsible for the first known proof that no other convex regular polyhedra exist. Euclid completely mathematically described the Platonic solids in the Elements, the last book (Book XIII) of which is devoted to their properties. Propositions 13–17 in Book XIII describe the construction of the tetrahedron, octahedron, cube, icosahedron, and dodecahedron in that order. For each solid Euclid finds the ratio of the diameter of the circumscribed sphere to the edge length. In Proposition 18 he argues that there are no further convex regular polyhedra.

Regular dodecahedra have been used as dice and probably also as divinatory devices. During the Hellenistic era, small, hollow bronze Roman dodecahedra were made and have been found in various Roman ruins in Europe. Their purpose is not certain.

In 20th-century art, dodecahedra appear in the work of M. C. Escher, such as his lithographs Reptiles (1943) and Gravitation (1952). In Salvador Dalí's painting The Sacrament of the Last Supper (1955), the room is a hollow regular dodecahedron. Gerard Caris based his entire artistic oeuvre on the regular dodecahedron and the pentagon, which is presented as a new art movement coined as Pentagonism.

A climbing wall consisting of three dodecahedral pieces

In modern role-playing games, the regular dodecahedron is often used as a twelve-sided die, one of the more common polyhedral dice.

Immersive Media Company, a former Canadian digital imaging company, made the Dodeca 2360 camera, the world's first 360° full-motion camera which captures high-resolution video from every direction simultaneously at more than 100 million pixels per second or 30 frames per second.[promotional language] It is based on regular dodecahedron.[citation needed]

The Megaminx twisty puzzle, alongside its larger and smaller order analogues, is in the shape of a regular dodecahedron.

In the children's novel The Phantom Tollbooth, the regular dodecahedron appears as a character in the land of Mathematics. Each of his faces wears a different expression – e.g. happy, angry, sad – which he swivels to the front as required to match his mood.

In nature and supramolecules

The fossil record of the coccolithophore Braarudosphaera bigelowii goes back 100 million years
The faces of a Holmium–magnesium–zinc (Ho-Mg-Zn) quasicrystal are true regular pentagons

The fossil coccolithophore Braarudosphaera bigelowii (see figure), a unicellular coastal phytoplanktonic alga, has a calcium carbonate shell with a regular dodecahedral structure about 10 micrometers across.[13]

Some quasicrystals and cages have dodecahedral shape (see figure). Some regular crystals such as garnet and diamond are also said to exhibit "dodecahedral" habit, but this statement actually refers to the rhombic dodecahedron shape.[14] [1]

Shape of the universe

Various models have been proposed for the global geometry of the universe. In addition to the primitive geometries, these proposals include the Poincaré dodecahedral space, a positively curved space consisting of a regular dodecahedron whose opposite faces correspond (with a small twist). This was proposed by Jean-Pierre Luminet and colleagues in 2003,[15][16] and an optimal orientation on the sky for the model was estimated in 2008.[17]

In Bertrand Russell's 1954 short story "The Mathematician's Nightmare: The Vision of Professor Squarepunt", the number 5 said: "I am the number of fingers on a hand. I make pentagons and pentagrams. And but for me dodecahedra could not exist; and, as everyone knows, the universe is a dodecahedron. So, but for me, there could be no universe."

Space filling with cube and bilunabirotunda

Regular dodecahedra fill space with cubes and bilunabirotundas (Johnson solid 91), in the ratio of 1 to 1 to 3.[18][19] The dodecahedra alone make a lattice of edge-to-edge pyritohedra. The bilunabirotundas fill the rhombic gaps. Each cube meets six bilunabirotundas in three orientations.

J91.jpg
Block model
Honeycomb of regular dodecahedra-cubes-J91.png Dodecahedron lattice.png
Lattice of dodecahedra
Bilunabirotunda augmented cube.png
6 bilunabirotundas around a cube

Related polyhedra and tilings

The regular dodecahedron is topologically related to a series of tilings by vertex figure n3.

The regular dodecahedron can be transformed by a truncation sequence into its dual, the icosahedron:


The regular dodecahedron is a member of a sequence of otherwise non-uniform polyhedra and tilings, composed of pentagons with face configurations (V3.3.3.3.n). (For n > 6, the sequence consists of tilings of the hyperbolic plane.) These face-transitive figures have (n32) rotational symmetry.

Vertex arrangement

The regular dodecahedron shares its vertex arrangement with four nonconvex uniform polyhedra and three uniform polyhedron compounds.

Five cubes fit within, with their edges as diagonals of the regular dodecahedron's faces, and together these make up the regular polyhedral compound of five cubes. Since two tetrahedra can fit on alternate cube vertices, five and ten tetrahedra can also fit in a regular dodecahedron.

Great stellated dodecahedron.png
Great stellated dodecahedron
Small ditrigonal icosidodecahedron.png
Small ditrigonal icosidodecahedron
Ditrigonal dodecadodecahedron.png
Ditrigonal dodecadodecahedron
Great ditrigonal icosidodecahedron.png
Great ditrigonal icosidodecahedron
Compound of five cubes.png
Compound of five cubes
Compound of five tetrahedra.png
Compound of five tetrahedra
Compound of ten tetrahedra.png
Compound of ten tetrahedra

Stellations

The 3 stellations of the regular dodecahedron are all regular (nonconvex) polyhedra: (Kepler–Poinsot polyhedra)

0 1 2 3
Stellation Dodecahedron.png
Regular dodecahedron
Small stellated dodecahedron.png
Small stellated dodecahedron
Great dodecahedron.png
Great dodecahedron
Great stellated dodecahedron.png
Great stellated dodecahedron
Facet diagram Zeroth stellation of dodecahedron facets.svg First stellation of dodecahedron facets.svg Second stellation of dodecahedron facets.svg Third stellation of dodecahedron facets.svg

Dodecahedral graph

Regular dodecahedron graph
Hamiltonian path.svg
A Hamiltonian cycle in a dodecahedron.
Vertices20
Edges30
Radius5
Diameter5
Girth5
Chromatic number3
PropertiesHamiltonian, regular, symmetric, distance-regular, distance-transitive, 3-vertex-connected, planar graph
Table of graphs and parameters

The skeleton of the dodecahedron (the vertices and edges) form a graph. It is one of 5 Platonic graphs, each a skeleton of its Platonic solid.

This graph can also be constructed as the generalized Petersen graph G(10,2) where the vertices of a decagon are connected to those of two pentagons, one pentagon connected to odd vertices of the decagon and the other pentagon connected to the even vertices. Geometrically, this can be visualized as the 10-vertex equatorial belt of the dodecahedron connected to the two 5-vertex polar regions, one on each side.

The high degree of symmetry of the polygon is replicated in the properties of this graph, which is distance-transitive, distance-regular, and symmetric. The automorphism group has order 120. The vertices can be colored with 3 colors, as can the edges, and the diameter is 5.[20]

The dodecahedral graph is Hamiltonian – there is a cycle containing all the vertices. Indeed, this name derives from a mathematical game invented in 1857 by William Rowan Hamilton, the icosian game. The game's object was to find a Hamiltonian cycle along the edges of a dodecahedron.

Orthogonal projection
Dodecahedron H3 projection.svg

See also

References

  1. 1.0 1.1 Kai Wu, Jonathan Nitschke and co-workers "Systematic construction of progressively larger capsules from a fivefold linking pyrrole-based subcomponent", Nature Synthesis, 2023, DOI: https://doi.org/10.1038/s44160-023-00276-9.
  2. Sutton, Daud (2002), Platonic & Archimedean Solids, Wooden Books, Bloomsbury Publishing USA, p. 55, ISBN 9780802713865, https://books.google.com/books?id=vgo7bTxDmIsC&pg=PA55 .
  3. Livio, Mario (2003). The Golden Ratio: The Story of Phi, the World's Most Astonishing Number (First trade paperback ed.). New York City: Random House. pp. 70–1. ISBN 0-7679-0816-3. https://books.google.com/books?id=bUARfgWRH14C. 
  4. Weisstein, Eric W.. "Icosahedral group". http://mathworld.wolfram.com/IcosahedralGroup.html. 
  5. Coxeter, H.S.M. (1973). "§1.8 Configurations". Regular Polytopes (3rd ed.). New York: Dover. 
  6. Coxeter, H.S.M. (1991). Regular Complex Polytopes (2nd ed.). Cambridge: Cambridge University Press. p. 117. 
  7. http://mathworld.wolfram.com/images/eps-gif/DodecahedronCube_700.gif[bare URL image file]
  8. Coxeter, H.S.M.; du Val, Patrick; Flather, H.T.; Petrie, J.F. (1938). The Fifty-Nine Icosahedra. 6. University of Toronto Studies (Mathematical Series). p. 4. 
  9. Knott, Ron (26 September 2016). "The Golden Geometry of Solids or Phi in 3 dimensions". https://r-knott.surrey.ac.uk/Fibonacci/phi3DGeom.html#:~:text=and%20vice-versa.-,4.1%20Golden%20sections%20in%20the%20Dodecahedron,%20Icosahedron%20and%20Octahedron,the%20ratio%201%20to%20Phi.. 
  10. http://www.toshen.com/images/dodecahedronwithgoldrectang.gif[bare URL image file]
  11. Florian Cajori, A History of Mathematics (1893)
  12. Plato, Timaeus, Jowett translation [line 1317–8]; the Greek word translated as delineation is diazographein, painting in semblance of life.
  13. Hagino, K., Onuma, R., Kawachi, M. and Horiguchi, T. (2013) "Discovery of an endosymbiotic nitrogen-fixing cyanobacterium UCYN-A in Braarudosphaera bigelowii (Prymnesiophyceae)". PLoS One, 8(12): e81749. doi:10.1371/journal.pone.0081749.
  14. Dodecahedral Crystal Habit
  15. Dumé, Belle (Oct 8, 2003). "Is The Universe A Dodecahedron?". http://physicsworld.com/cws/article/news/2003/oct/08/is-the-universe-a-dodecahedron. 
  16. Luminet, Jean-Pierre (2003-10-09). "Dodecahedral space topology as an explanation for weak wide-angle temperature correlations in the cosmic microwave background". Nature 425 (6958): 593–5. doi:10.1038/nature01944. PMID 14534579. Bibcode2003Natur.425..593L. 
  17. Roukema, Boudewijn; Zbigniew Buliński; Agnieszka Szaniewska; Nicolas E. Gaudin (2008). "A test of the Poincaré dodecahedral space topology hypothesis with the WMAP CMB data". Astronomy and Astrophysics 482 (3): 747. doi:10.1051/0004-6361:20078777. Bibcode2008A&A...482..747L. 
  18. "Dodecahedron and Bilunabirotunda – Wolfram Demonstrations Project". http://demonstrations.wolfram.com/DodecahedronAndBilunabirotunda/. 
  19. http://www.lcv.ne.jp/~hhase/memo/m09_08b.html
  20. Weisstein, Eric W.. "Dodecahedral Graph". http://mathworld.wolfram.com/DodecahedralGraph.html. 

External links

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