Platonic solid Guide, Meaning , Facts, Information and Description

A Platonic solid is a convex polyhedron whose faces all use the same regular polygon and such that the same number of faces meet at all its vertices. Compare with the Kepler-Poinsot solids, which are not convex, and the Archimedean and Johnson solids, which while made of regular polygons are not themselves regular.

There are five Platonic solids, all known to the ancient Greeks:

Name and picture	Face polygon	Faces	Edges	Vertices	Faces meeting at each vertex	Symmetry group
tetrahedron ()	triangle	4	6	4	3	Td
cube (hexahedron) ()	square	6	12	8	3	Oh
octahedron ()	triangle	8	12	6	4	Oh
dodecahedron ()	pentagon	12	30	20	3	Ih
icosahedron ()	triangle	20	30	12	5	Ih

Table of contents

1 Limited number of Platonic polyhedra 2 Dual polyhedra 3 Origins of name 4 Ancient symbolism 5 Other symbolism 6 Inscribed Platonic polyhedra 7 Uses 8 External links

Limited number of Platonic polyhedra

That there are only five such three-dimensional solids is easily demonstrated. To create a vertex, at least three of the faces must meet at a point and the total of their angles must be less than 360 degrees, i.e the corners of the face must be less than 120 degrees. The only polygons meeting these requirements are the triangle, square, and pentagon.

• triangular faces: each vertex of a triangle is 60 degrees, so a shape should be possible with 3, 4, or 5 triangles meeting at a vertex; these are the tetrahedron, octahedron, and icosahedron respectively.
• square faces: each vertex of a square is 90 degrees, so there is only one arrangement possible with three faces at a vertex, the cube.
• pentagonal faces: each vertex is 108 degrees; again, only one arrangement, of three faces at a vertex is possible, the dodecahedron, and that exhausts the list of regular 3-dimensional solids.

Dual polyhedra

Note that if you connect the centers of the faces of a tetrahedron, you get another tetrahedron. If you connect the centers of the faces of an octahedron, you get a cube, and vice versa. If you connect the centers of the faces of a dodecahedron, you get an icosahedron, and vice versa. These pairs are said to be dual polyhedra.

Origins of name

The Platonic solids are named after Plato, who wrote about them in Timaeus. Plato learned about these solids from his friend Theaetetus. The constructions of the solids are included in Book XIII of Euclid's Elements. Proposition 13 describes the construction of the tetrahedron, proposition 14 of the octahedron, proposition 15 of the cube, proposition 16 of the icosahedron, and proposition 17 of the dodecahedron.

Ancient symbolism

Plato conceived the four classical elements as atoms with the geometrical shapes of four of the five platonic solids that had been discovered by the Pythagoreans (in the Timaeus). These are, of course, not the true shapes of atoms; but it turns out that they are some of the true shapes of packed atoms and molecules, namely crystals: The mineral salt sodium chloride occurs in cubic crystals; fluorite (calcium floride) in octahedrons; and pyrite in dodecahedrons (see uses below).

This concept linked fire with the tetrahedron, earth with the cube, air with the octahedron and water with the icosahedron.

The fifth Platonic Solid, the dodecahedron, Plato obscurely remarks, "...the god used for arranging the constellations on the whole heaven" (Timaeus 55). He didn't really know what else to do with it. Aristotle added a fifth element, aithêr (aether in Latin, "ether" in English) and postulated that the heavens were made of this element, but he had no interest in matching it with Plato's fifth solid.

Other symbolism

Historically, Johannes Kepler followed the custom of the Renaissance in making mathematical correspondences, (based on ideas regarding the music of the spheres etc.) and identified the five platonic solids with the five planets - Mercury, Venus, Mars, Jupiter, Saturn and ressurecting the comparison with the five classical elements. (The Earth, moon and sun were not considered to be planets.)

Inscribed Platonic polyhedra

When the Platonic polyhedra are inscribed in a sphere, they occupy the following percentages of that sphere's volume:

Tetrahedron: 12.2518%

Cube: 36.7553%

Octahedron: 31.8310%

Dodecahedron: 66.4909%

Icosahedron: 60.5461%

Note that, despite the common assumption, the dodecahedron occupies significantly more of the sphere's volume than the apparently more spherical icosahedron. The corners of the dodecahedron are less sharp than the corners of the icosahedron, and therefore fit closer to the circumscribing sphere.

Uses

The shapes are often used to make dice, because dice of these shapes can be made fair. 6-sided dice are very common, but the other numbers are commonly used in role-playing games. Such dice are commonly referred to as D followed by the number of faces (d4, d8, etc.). A symettrically pitted golf ball is also a Platonic solid.

The tetrahedron, cube, and octahedron, are found naturally in crystal structures. The dodecahedron is combinatorially identical to the pyritohedron (in that both have twelve pentagonal faces), which is one of the possible crystal structures of pyrite. However, the pyritohedron is not a regular dodecahedron, but rather has the same symmetry as the cube.

External links

• Paper Models of Polyhedra Many links
• The Uniform Polyhedra
• Virtual Reality Polyhedra The Encyclopedia of Polyhedra
• London South Bank University Water structure and behavior
• Book XIII of Euclid's Elements.

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