regular polyhedron in a sentence

Examples

1. Certain crystal pattern to fill ( or tile ) three-dimensional space, including the cube ( the only regular polyhedron to do so ), the rhombic dodecahedron, and the truncated octahedron.
2. Plato taught that the five regular polyhedrons of geometry symbolize the elements from which everything is made . ( A regular polyhedron is a three-dimensional form with flat sides, each side a regular polygon.
3. Plato taught that the five regular polyhedrons of geometry symbolize the elements from which everything is made . ( A regular polyhedron is a three-dimensional form with flat sides, each side a regular polygon.
4. While the pentagon is a regular polygon ( neglecting the hole in the center for the atrium ), the result of extruding it is not a regular polyhedron, since the sides of the buildings are rectangles, not pentagons.
5. A special kind of truncation, usually implied, is a "'uniform truncation "', a truncation operator applied to a regular polyhedron ( or regular polytope ) which creates a resulting uniform polyhedron ( uniform polytope ) with equal edge lengths.
6. They called them regular skew polyhedra, because they seemed to satisfy the definition of a regular polyhedron & mdash; all the vertices, edges and faces are alike, all the angles are the same, and the figure has no free edges.
7. In three dimensions, the symmetry of a regular polyhedron, { p, q }, with one directed petrie polygon marked, defined as a composite of 3 reflections, has rotoinversion symmetry S h, [ 2 +, h + ], order " h ".
8. The sum of the distances from any point in the interior of a regular polyhedron to the sides is independent of the location of the point . ( This is an extension of Viviani's theorem . ) However, the converse does not hold, not even for tetrahedra.
9. Thus, just as hexagons have angles not less than 120?and cannot be used as the faces of a convex regular polyhedron because such a construction would not meet the requirement that at least three faces meet at a vertex and leave a positive non-convex regular polychora.
10. Plato taught that existence is dominated by form, and that the five regular polyhedrons known to mathematicians _ the 4-sided tetrahedron, the 6-sided cube, the 8-sided octahedron, the 12-sided dodecahedron and the 20-sided icosahedron _ have symbolic significance . ( A regular polyhedron is a three-dimensional form whose faces are all regular polygons; the cube, for example, is made up of 6 regular polygons called squares .)