Site Navigation
Categories:
Platonic solids
Polyhedra

Summary Of: Platonic solid

s Platonic solid model of the solar system from Mysterium Cosmographicum... s Platonic solid model of the solar system from... A convex polyhedron is a Platonic solid if and only if... Each Platonic solid can therefore be denoted by a symbol... at the vertex of a Platonic solid is given in terms of the dihedral angle by... The dual of every Platonic solid is another Platonic solid... Indeed every combinatorial property of one Platonic solid can be interpreted as another combinatorial property of the dual... one can dualize a Platonic solid with respect to a sphere of radius...

Encyclodia Page On: Platonic solid

These Are Links To Other Documents
geometry | convex | regular polyhedron | regular polygons | congruent | Tetrahedron | Hexahedron | Cube | Octahedron | Dodecahedron | Icosahedron | | Animation | | Animation | | Animation | | Animation | | Animation | aesthetic beauty | symmetry | geometers | ancient Greek philosopher | Plato | classical elements | | | Mysterium Cosmographicum | carved stone balls | neolithic | Scotland | ancient Greeks | Proclus | Pythagoras | Theaetetus | Plato | Timaeus | classical elements | earth | air | water | fire | Aristotle | aithêr | Euclid | Elements | German | astronomer | Johannes Kepler | planets | Mysterium Cosmographicum | solar system | Mercury | Venus | Earth | Mars | Jupiter | Saturn | Kepler solids | Kepler's laws of planetary motion | congruent | regular polygons | vertices | Schläfli symbol | combinatorial | Schläfli symbol | Vertex
configuration | tetrahedron | Tetrahedron | cube | Hexahedron (cube) | octahedron | Octahedron | dodecahedron | Dodecahedron | icosahedron | Icosahedron | Euler's formula | algebraic topology | sphere | Triangular | Square | Pentagonal | topological | Euler's observation | angles | dihedral angle | tangent | angular deficiency | Descartes' theorem | solid angle | spherical excess | spherical polygon | vertex figure | steradians | golden ratio | Dihedral angle | Defect | Solid angle | tetrahedron | cube | octahedron | dodecahedron | icosahedron | circumscribed sphere | midsphere | inscribed sphere | radii | surface area | volume | pyramid | tetrahedron | cube | octahedron | dodecahedron | icosahedron | | | dual polyhedron | self-dual | symmetry | mathematical group | symmetry group | Euclidean isometries | order | reflections | rotations | point groups in three dimensions | action | transitive | vertex-uniform | edge-uniform | face-uniform | tetrahedral group | octahedral group | icosahedral group | Wythoff's kaleidoscope construction | Schläfli symbol | Wythoff symbol | Dual polyhedron | Symmetry group | tetrahedron | Td (T) | cube | Oh (O) | octahedron | dodecahedron | Ih (I) | icosahedron | crystal structures | pyritohedron | minerals | | Radiolaria | Ernst Haeckel | Radiolaria | viruses | herpes | protein | genome | meteorology | climatology | triangulation | longitude | latitude | singularities | poles | space frames | dice | role-playing games | dice notation | | | Polyhedral dice | role-playing games | Rubik's Cube | magic polyhedra | Kepler-Poinsot polyhedra | icosahedral symmetry | stellations | | cuboctahedron | | icosidodecahedron | cuboctahedron | rectification | icosidodecahedron | Archimedean solids | uniform polyhedra | regular | star polygons | prisms | antiprisms | Johnson solids | regular tessellations | sphere | spherical polygons | square tiling | triangular tiling | hexagonal tiling | hyperbolic plane | polytopes | regular polytopes | Ludwig Schläfli | convex regular 4-polytopes | 24-cell | simplex | hypercube | cross-polytope | Regular polytopes | List of regular polytopes | Metatron's Cube | Flower of Life | solid geometry | rhombic dodecahedron | rhombic | star polyhedron | great dodecahedron | Atiyah, Michael | doi | ISBN 0-471-54397-7 | Coxeter, H. S. M. | Regular Polytopes | ISBN 0-486-61480-8 | Euclid | Heath, Thomas L. | ISBN 0-486-60090-4 | ISBN 3-7913-1990-6 | Weyl, Hermann | ISBN 0-691-02374-3 | Eric W. Weisstein | MathWorld | Stella | algebraic surfaces | Categories | Platonic solids | Polyhedra |
This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article "Platonic solid".