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In [[geometry]], the '''great icosahedron''' is one of four [[Kepler-Poinsot polyhedra]] ([[nonconvex]] [[List of regular polytopes#Non-convex 2|regular polyhedra]]), with [[Schläfli symbol]] {3,{{Frac|5|2}}} and [[Coxeter-Dynkin diagram]] of {{CDD|node_1|3|node|5|rat|d2|node}}. It is composed of 20 intersecting triangular faces, having five triangles meeting at each vertex in a [[pentagram]]mic sequence.
In [[geometry]], the '''great icosahedron''' is one of four [[Kepler-Poinsot polyhedra]] ([[nonconvex]] [[List of regular polytopes#Non-convex 2|regular polyhedra]]), with [[Schläfli symbol]] {3,{{Frac|5|2}}} and [[Coxeter-Dynkin diagram]] of {{CDD|node_1|3|node|5|rat|d2|node}}. It is composed of 20 intersecting triangular faces, having five triangles meeting at each vertex in a [[pentagram]]mic sequence.


The great icosahedron can be constructed analogously to the pentagram, its two-dimensional analogue, via the extension of the (''n-1'')-D [[simplex]] faces of the core ''n''D polytope (equilateral triangles for the great icosahedron, and [[line segment]]s for the pentagram) until the figure regains regular faces. The [[grand 600-cell]] can be seed as its four-dimensional analogue using the same process.
The great icosahedron can be constructed analogously to the pentagram, its two-dimensional analogue, via the extension of the (''n-1'')-D [[simplex]] faces of the core ''n''D polytope (equilateral triangles for the great icosahedron, and [[line segment]]s for the pentagram) until the figure regains regular faces. The [[grand 600-cell]] can be seen as its four-dimensional analogue using the same process.


== Images ==
== Images ==

Revision as of 15:34, 23 April 2020

Great icosahedron
Type Kepler–Poinsot polyhedron
Stellation core icosahedron
Elements F = 20, E = 30
V = 12 (χ = 2)
Faces by sides 20{3}
Schläfli symbol {3,52}
Face configuration V(53)/2
Wythoff symbol 52 | 2 3
Coxeter diagram
Symmetry group Ih, H3, [5,3], (*532)
References U53, C69, W41
Properties Regular nonconvex deltahedron

(35)/2
(Vertex figure)

Great stellated dodecahedron
(dual polyhedron)
3D model of a great icosahedron

In geometry, the great icosahedron is one of four Kepler-Poinsot polyhedra (nonconvex regular polyhedra), with Schläfli symbol {3,52} and Coxeter-Dynkin diagram of . It is composed of 20 intersecting triangular faces, having five triangles meeting at each vertex in a pentagrammic sequence.

The great icosahedron can be constructed analogously to the pentagram, its two-dimensional analogue, via the extension of the (n-1)-D simplex faces of the core nD polytope (equilateral triangles for the great icosahedron, and line segments for the pentagram) until the figure regains regular faces. The grand 600-cell can be seen as its four-dimensional analogue using the same process.

Images

Transparent model Density Stellation diagram Net

A transparent model of the great icosahedron (See also Animation)

It has a density of 7, as shown in this cross-section.

It is a stellation of the icosahedron, counted by Wenninger as model [W41] and the 16th of 17 stellations of the icosahedron and 7th of 59 stellations by Coxeter.
× 12
Net (surface geometry); twelve isosceles pentagrammic pyramids, arranged like the faces of a dodecahedron. Each pyramid folds up like a fan: the dotted lines fold the opposite direction from the solid lines.
Spherical tiling

This polyhedron represents a spherical tiling with a density of 7. (One spherical triangle face is shown above, outlined in blue, filled in yellow)

As a snub

The great icosahedron can be constructed a uniform snub, with different colored faces and only tetrahedral symmetry: . This construction can be called a retrosnub tetrahedron or retrosnub tetratetrahedron,[1] similar to the snub tetrahedron symmetry of the icosahedron, as a partial faceting of the truncated octahedron (or omnitruncated tetrahedron): . It can also be constructed with 2 colors of triangles and pyritohedral symmetry as, or , and is called a retrosnub octahedron.

Tetrahedral Pyritohedral
Animated truncation sequence from {5/2, 3} to {3, 5/2}

It shares the same vertex arrangement as the regular convex icosahedron. It also shares the same edge arrangement as the small stellated dodecahedron.

A truncation operation, repeatedly applied to the great icosahedron, produces a sequence of uniform polyhedra. Truncating edges down to points produces the great icosidodecahedron as a rectified great icosahedron. The process completes as a birectification, reducing the original faces down to points, and producing the great stellated dodecahedron.

The truncated great stellated dodecahedron is a degenerate polyhedron, with 20 triangular faces from the truncated vertices, and 12 (hidden) doubled up pentagonal faces ({10/2}) as truncations of the original pentagram faces, the latter forming two great dodecahedra inscribed within and sharing the edges of the icosahedron.

Name Great
stellated
dodecahedron
Truncated great stellated dodecahedron Great
icosidodecahedron
Truncated
great
icosahedron
Great
icosahedron
Coxeter-Dynkin
diagram
Picture

References

  1. ^ Klitzing, Richard. "uniform polyhedra Great icosahedron".
Notable stellations of the icosahedron
Regular Uniform duals Regular compounds Regular star Others
(Convex) icosahedron Small triambic icosahedron Medial triambic icosahedron Great triambic icosahedron Compound of five octahedra Compound of five tetrahedra Compound of ten tetrahedra Great icosahedron Excavated dodecahedron Final stellation
The stellation process on the icosahedron creates a number of related polyhedra and compounds with icosahedral symmetry.