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Snub icosidodecadodecahedron

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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, , 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. 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}

Related polyhedra

Medial hexagonal hexecontahedron

Medial hexagonal hexecontahedron
Type Star polyhedron
Face
Elements F = 60, E = 180
V = 104 (χ = −16)
Symmetry group I, , 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.

External links

Star-polyhedra navigator
Kepler-Poinsot
polyhedra (nonconvex
regular polyhedra)
Uniform truncations
of Kepler-Poinsot
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Nonconvex uniform
hemipolyhedra
Duals of nonconvex
uniform polyhedra
Duals of nonconvex
uniform polyhedra with
infinite stellations


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