Small complex rhombicosidodecahedron

Small complex rhombicosidodecahedron
TypeUniform star polyhedron
ElementsF = 62, E = 120 (60x2)
V = 20 (χ = -38)
Faces by sides20{3}+12{5/2}+30{4}
Wythoff symbol5/2 3 | 2
Symmetry groupIh, [5,3], *532
Index referencesU-, C-, W-
Dual polyhedronSmall complex rhombicosidodecacron
Vertex figure
3(3.4.5/2.4)
Bowers acronymSicdatrid

In geometry, the small complex rhombicosidodecahedron (also known as the small complex ditrigonal rhombicosidodecahedron) is a degenerate uniform star polyhedron. It has 62 faces (20 triangles, 12 pentagrams and 30 squares), 120 (doubled) edges and 20 vertices. All edges are doubled (making it degenerate), sharing 4 faces, but are considered as two overlapping edges as a topological polyhedron.

It can be constructed from the vertex figure 3(5/2.4.3.4), thus making it also a cantellated great icosahedron. The "3" in front of this vertex figure indicates that each vertex in this degenerate polyhedron is in fact three coincident vertices. It may also be given the Schläfli symbol rr{5/2,3} or t0,2{5/2,3}.

As a compound

It can be seen as a compound of the small ditrigonal icosidodecahedron, U30, and the compound of five cubes. It is also a facetting of the dodecahedron.

Compound polyhedron
Small ditrigonal icosidodecahedron Compound of five cubes Compound

As a cantellation

It can also be seen as a cantellation of the great icosahedron (or, equivalently, of the great stellated dodecahedron).

(p q 2) Fund.
triangle
Parent Truncated Rectified Bitruncated Birectified
(dual)
Cantellated Omnitruncated
(Cantitruncated)
Snub
Wythoff symbol q | p 2 2 q | p 2 | p q 2 p | q p | q 2 p q | 2 p q 2 | | p q 2
Schläfli symbol t0{p,q} t0,1{p,q} t1{p,q} t1,2{p,q} t2{p,q} t0,2{p,q} t0,1,2{p,q} s{p,q}
Coxeter–Dynkin diagram
Vertex figure pq (q.2p.2p) (p.q.p.q) (p. 2q.2q) qp (p. 4.q.4) (4.2p.2q) (3.3.p. 3.q)
Icosahedral
(5/2 3 2)
 
{3,5/2}

(5/2.6.6)

(3.5/2)2

[3.10/2.10/2]

{5/2,3}

[3.4.5/2.4]

[4.10/2.6]

(3.3.3.3.5/2)

Two other degenerate uniform polyhedra are also facettings of the dodecahedron. They are the complex rhombidodecadodecahedron (a compound of the ditrigonal dodecadodecahedron and the compound of five cubes) with vertex figure (5/3.4.5.4)/3 and the great complex rhombicosidodecahedron (a compound of the great ditrigonal icosidodecahedron and the compound of five cubes) with vertex figure (5/4.4.3/2.4)/3. All three degenerate uniform polyhedra have each vertex in fact being three coincident vertices and each edge in fact being two coincident edges.

They can all be constructed by cantellating regular polyhedra. The complex rhombidodecadodecahedron may be given the Schläfli symbol rr{5/3,5} or t0,2{5/3,5}, while the great complex rhombicosidodecahedron may be given the Schläfli symbol rr{5/4,3/2} or t0,2{5/4,3/2}.

See also

References

This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.