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Archimedean solid

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The Archimedean solids. Two of them are chiral, with both forms shown, making 15 models in all.

The Archimedean solids are a set of thirteen convex polyhedra whose faces are regular polygons, but not all alike, and whose vertices are all symmetric to each other. The solids were named after Archimedes, although he did not claim credit for them. They belong to the class of uniform polyhedra, the polyhedra with regular faces and symmetric vertices. Some Archimedean solids were portrayed in the works of artists and mathematicians during the Renaissance.

The elongated square gyrobicupola or pseudo­rhombi­cub­octa­hedron is an extra polyhedron with regular faces and congruent vertices, but it is not generally counted as an Archimedean solid because it is not vertex-transitive.

The solids

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The Archimedean solids have a single vertex configuration and highly symmetric properties. A vertex configuration indicates which regular polygons meet at each vertex. For instance, the configuration indicates a polyhedron in which each vertex is met by alternating two triangles and two pentagons. Highly symmetric properties in this case mean the symmetry group of each solid were derived from the Platonic solids, resulting from their construction.[1] Some sources say the Archimedean solids are synonymous with the semiregular polyhedron.[2] Yet, the definition of a semiregular polyhedron may also include the infinite prisms and antiprisms, including the elongated square gyrobicupola.[3]

The thirteen Archimedean solids
Name Solids Vertex configurations[4] Faces[5] Edges[5] Vertices[5] Point
group
[6]
Truncated tetrahedron Truncated tetrahedron 3.6.6
4 triangles
4 hexagons
18 12 Td
Cuboctahedron Cuboctahedron 3.4.3.4
8 triangles
6 squares
24 12 Oh
Truncated cube Truncated hexahedron 3.8.8
8 triangles
6 octagons
36 24 Oh
Truncated octahedron Truncated octahedron 4.6.6
6 squares
8 hexagons
36 24 Oh
Rhombicuboctahedron Rhombicuboctahedron 3.4.4.4
8 triangles
18 squares
48 24 Oh
Truncated cuboctahedron Truncated cuboctahedron 4.6.8
12 squares
8 hexagons
6 octagons
72 48 Oh
Snub cube Snub hexahedron (Ccw) 3.3.3.3.4
32 triangles
6 squares
60 24 O
Icosidodecahedron Icosidodecahedron 3.5.3.5
20 triangles
12 pentagons
60 30 Ih
Truncated dodecahedron Truncated dodecahedron 3.10.10
20 triangles
12 decagons
90 60 Ih
Truncated icosahedron Truncated icosahedron 5.6.6
12 pentagons
20 hexagons
90 60 Ih
Rhombicosidodecahedron Rhombicosidodecahedron 3.4.5.4
20 triangles
30 squares
12 pentagons
120 60 Ih
Truncated icosidodecahedron Truncated icosidodecahedron 4.6.10
30 squares
20 hexagons
12 decagons
180 120 Ih
Snub dodecahedron Snub dodecahedron (Cw) 3.3.3.3.5
80 triangles
12 pentagons
150 60 I

The construction of some Archimedean solids begins from the Platonic solids. The truncation involves cutting away corners; to preserve symmetry, the cut is in a plane perpendicular to the line joining a corner to the center of the polyhedron and is the same for all corners, and an example can be found in truncated icosahedron constructed by cutting off all the icosahedron's vertices, having the same symmetry as the icosahedron, the icosahedral symmetry.[7] If the truncation is exactly deep enough such that each pair of faces from adjacent vertices shares exactly one point, it is known as a rectification. Expansion involves moving each face away from the center (by the same distance to preserve the symmetry of the Platonic solid) and taking the convex hull. An example is the rhombicuboctahedron, constructed by separating the cube or octahedron's faces from the centroid and filling them with squares.[8] Snub is a construction process of polyhedra by separating the polyhedron faces, twisting their faces in certain angles, and filling them up with equilateral triangles. Examples can be found in snub cube and snub dodecahedron. The resulting construction of these solids gives the property of chiral, meaning they are not identical when reflected in a mirror.[9] However, not all of them can be constructed in such a way, or they could be constructed alternatively. For example, the icosidodecahedron can be constructed by attaching two pentagonal rotunda base-to-base, or rhombicuboctahedron that can be constructed alternatively by attaching two square cupolas on the bases of octagonal prism.[5]

There are at least for known ten solids that have the Rupert property, a polyhedron that can pass through a copy of itself with the same or similar size. They are the cuboctahedron, truncated octahedron, truncated cube, rhombicuboctahedron, icosidodecahedron, truncated cuboctahedron, truncated icosahedron, truncated dodecahedron, and the truncated tetrahedron.[10] The Catalan solids are the dual polyhedron of Archimedean solids.[1]

Background of discovery

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The names of Archimedean solids were taken from Ancient Greek mathematician Archimedes, who discussed them in a now-lost work. Although they were not credited to Archimedes originally, Pappus of Alexandria in the fifth section of his titled compendium Synagoge referring that Archimedes listed thirteen polyhedra and briefly described them in terms of how many faces of each kind these polyhedra have.[11]

Truncated icosahedron in De quinque corporibus regularibus
Rhombicuboctahedron drawn by Leonardo da Vinci (colorized)

During the Renaissance, artists and mathematicians valued pure forms with high symmetry. Some Archimedean solids appeared in Piero della Francesca's De quinque corporibus regularibus, in attempting to study and copy the works of Archimedes, as well as include citations to Archimedes.[12] Yet, he did not credit those shapes to Archimedes and know of Archimedes' work but rather appeared to be an independent rediscovery.[13] Other appearance of the solids appeared in the works of Wenzel Jamnitzer's Perspectiva Corporum Regularium, and both Summa de arithmetica and Divina proportione by Luca Pacioli, drawn by Leonardo da Vinci.[14] The net of Archimedean solids appeared in Albrecht Dürer's Underweysung der Messung, copied from the Pacioli's work. By around 1620, Johannes Kepler in his Harmonices Mundi had completed the rediscovery of the thirteen polyhedra, as well as defining the prisms, antiprisms, and the non-convex solids known as Kepler–Poinsot polyhedra.[15]

The elongated square gyrobicupola, a polyhedron where mathematicians mistakenly constructed the rhombicuboctahedron.

Kepler may have also found another solid known as elongated square gyrobicupola or pseudorhombicuboctahedron. Kepler once stated that there were fourteen Archimedean solids, yet his published enumeration only includes the thirteen uniform polyhedra. The first clear statement of such solid existence was made by Duncan Sommerville in 1905.[16] The solid appeared when some mathematicians mistakenly constructed the rhombicuboctahedron: two square cupolas attached to the octagonal prism, with one of them rotated in forty-five degrees.[17] The thirteen solids have the property of vertex-transitive, meaning any two vertices of those can be translated onto the other one, but the elongated square gyrobicupola does not. Grünbaum (2009) observed that it meets a weaker definition of an Archimedean solid, in which "identical vertices" means merely that the parts of the polyhedron near any two vertices look the same (they have the same shapes of faces meeting around each vertex in the same order and forming the same angles). Grünbaum pointed out a frequent error in which authors define Archimedean solids using some form of this local definition but omit the fourteenth polyhedron. If only thirteen polyhedra are to be listed, the definition must use global symmetries of the polyhedron rather than local neighborhoods. In the aftermath, the elongated square gyrobicupola was withdrawn from the Archimedean solids and included into the Johnson solid instead, a convex polyhedron in which all of the faces are regular polygons.[16]

See also

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References

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Footnotes

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  1. ^ a b Diudea (2018), p. 39.
  2. ^ Kinsey, Moore & Prassidis (2011), p. 380.
  3. ^
  4. ^ Williams (1979).
  5. ^ a b c d Berman (1971).
  6. ^ Koca & Koca (2013), p. 47–50.
  7. ^
  8. ^ Viana et al. (2019), p. 1123, See Fig. 6.
  9. ^ Koca & Koca (2013), p. 49.
  10. ^
  11. ^
  12. ^ Banker (2005).
  13. ^ Field (1997), p. 248.
  14. ^
  15. ^ Schreiber, Fischer & Sternath (2008).
  16. ^ a b Grünbaum (2009).
  17. ^

Works cited

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Further reading

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