Snub icosidodecadodecahedron

Polyhedron with 104 faces
Snub icosidodecadodecahedron
Type Uniform star polyhedron
Elements F = 104, E = 180
V = 60 (χ = −16)
Faces by sides (20+60){3}+12{5}+12{5/2}
Coxeter diagram
Wythoff symbol | 5/3 3 5
Symmetry group I, [5,3]+, 532
Index references U46, C58, W112
Dual polyhedron Medial hexagonal hexecontahedron
Vertex figure
3.3.3.5.3.5/3
Bowers acronym Sided
3D model of a snub icosidodecadodecahedron

In geometry, the snub icosidodecadodecahedron is a nonconvex uniform polyhedron, indexed as U46. It has 104 faces (80 triangles, 12 pentagons, and 12 pentagrams), 180 edges, and 60 vertices.[1] As the name indicates, it belongs to the family of snub polyhedra.

Cartesian coordinates

Let ρ 1.3247179572447454 {\displaystyle \rho \approx 1.3247179572447454} be the real zero of the polynomial x 3 x 1 {\displaystyle x^{3}-x-1} . The number ρ {\displaystyle \rho } is known as the plastic ratio. Denote by ϕ {\displaystyle \phi } the golden ratio. Let the point p {\displaystyle p} be given by

p = ( ρ ϕ 2 ρ 2 ϕ 2 ρ 1 ϕ ρ 2 + ϕ 2 ) {\displaystyle p={\begin{pmatrix}\rho \\\phi ^{2}\rho ^{2}-\phi ^{2}\rho -1\\-\phi \rho ^{2}+\phi ^{2}\end{pmatrix}}} .

Let the matrix M {\displaystyle M} be given by

M = ( 1 / 2 ϕ / 2 1 / ( 2 ϕ ) ϕ / 2 1 / ( 2 ϕ ) 1 / 2 1 / ( 2 ϕ ) 1 / 2 ϕ / 2 ) {\displaystyle M={\begin{pmatrix}1/2&-\phi /2&1/(2\phi )\\\phi /2&1/(2\phi )&-1/2\\1/(2\phi )&1/2&\phi /2\end{pmatrix}}} .

M {\displaystyle M} is the rotation around the axis ( 1 , 0 , ϕ ) {\displaystyle (1,0,\phi )} by an angle of 2 π / 5 {\displaystyle 2\pi /5} , counterclockwise. Let the linear transformations T 0 , , T 11 {\displaystyle T_{0},\ldots ,T_{11}} be the transformations which send a point ( x , y , z ) {\displaystyle (x,y,z)} to the even permutations of ( ± x , ± y , ± z ) {\displaystyle (\pm x,\pm y,\pm z)} with an even number of minus signs. The transformations T i {\displaystyle T_{i}} constitute the group of rotational symmetries of a regular tetrahedron. The transformations T i M j {\displaystyle T_{i}M^{j}} ( i = 0 , , 11 {\displaystyle (i=0,\ldots ,11} , j = 0 , , 4 ) {\displaystyle j=0,\ldots ,4)} constitute the group of rotational symmetries of a regular icosahedron. Then the 60 points T i M j p {\displaystyle T_{i}M^{j}p} are the vertices of a snub icosidodecadodecahedron. The edge length equals 2 ϕ 2 ρ 2 2 ϕ 1 {\displaystyle 2{\sqrt {\phi ^{2}\rho ^{2}-2\phi -1}}} , the circumradius equals ( ϕ + 2 ) ρ 2 + ρ 3 ϕ 1 {\displaystyle {\sqrt {(\phi +2)\rho ^{2}+\rho -3\phi -1}}} , and the midradius equals ρ 2 + ρ ϕ {\displaystyle {\sqrt {\rho ^{2}+\rho -\phi }}} .

For a snub icosidodecadodecahedron whose edge length is 1, the circumradius is

R = 1 2 ρ 2 + ρ + 2 1.126897912799939 {\displaystyle R={\frac {1}{2}}{\sqrt {\rho ^{2}+\rho +2}}\approx 1.126897912799939}

Its midradius is

r = 1 2 ρ 2 + ρ + 1 1.0099004435452335 {\displaystyle r={\frac {1}{2}}{\sqrt {\rho ^{2}+\rho +1}}\approx 1.0099004435452335}

Medial hexagonal hexecontahedron

Medial hexagonal hexecontahedron
Type Star polyhedron
Face
Elements F = 60, E = 180
V = 104 (χ = −16)
Symmetry group I, [5,3]+, 532
Index references DU46
dual polyhedron Snub icosidodecadodecahedron
3D model of a medial hexagonal hexecontahedron

The medial hexagonal hexecontahedron is a nonconvex isohedral polyhedron. It is the dual of the uniform snub icosidodecadodecahedron.

See also

References

  1. ^ Maeder, Roman. "46: snub icosidodecadodecahedron". MathConsult.
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Kepler-Poinsot
polyhedra (nonconvex
regular polyhedra)Uniform truncations
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polyhedraNonconvex uniform
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uniform polyhedra with
infinite stellations


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