Tetrakis hexahedron

The name "tetrakis" is used for the Kleetopes of polyhedra with square faces. Hence, the tetrakis hexahedron can be considered as a cube with square pyramids covering each square face, the Kleetope of the cube. The resulting construction can be either convex or non-convex, depending on the square pyramids' height. For the convex result, this solid comprises twenty-four isosceles triangles. A non-convex form of this shape, with equilateral triangle faces, has the same surface geometry as the regular octahedron, and a paper octahedron model can be re-folded into this shape. This form of the tetrakis hexahedron was illustrated by Leonardo da Vinci in Luca Pacioli's Divina proportione. Denoting the edge length of the base cube by , the height of each pyramid summit above the cube is {{tmath|\tfrac{a}{4} }}. The inclination of each triangular face of the pyramid versus the cube face is \arctan\tfrac{1}{2} \approx 26.565^\circ . One edge of the isosceles triangles has length , the other two have length {{tmath|\tfrac{3a}{4},}} which follows by applying the Pythagorean theorem to height and base length. This yields an altitude of \tfrac{\sqrt 5 a}{4} in the triangle (). Its area is \tfrac{\sqrt 5 a^2}{8}, and the internal angles are \arccos\tfrac{2}{3} \approx 48.1897^\circ and the complementary 180^\circ - 2\arccos\tfrac{2}{3} \approx 83.6206^\circ. The volume of the pyramid is {{tmath|\tfrac{a^3}{12};}} so the total volume of the six pyramids and the cube in the hexahedron is {{tmath|\tfrac{3a^3}{2}.}} This non-convex form of the tetrakis hexahedron can be folded along the square faces of the inner cube as a net for a four-dimensional cubic pyramid. == As a Catalan solid ==

The tetrakis hexahedron is a Catalan solid, the dual polyhedron of a truncated octahedron. The truncated octahedron is an Archimedean solid, constructed by cutting all of a regular octahedron's vertices, so the resulting polyhedron has six squares and eight hexagons. The tetrakis hexahedron has the same symmetry as the truncated octahedron, the octahedral symmetry. Cartesian coordinates for the 14 vertices of a tetrakis hexahedron centered at the origin, are the points \bigl( {\pm\tfrac32}, 0, 0 \bigr),\ \bigl( 0, \pm\tfrac32, 0 \bigr),\ \bigl( 0, 0, \pm\tfrac32 \bigr),\ \bigl({\pm1}, \pm1, \pm1 \bigr). The length of the shorter edges of this tetrakis hexahedron equals 3/2, and that of the longer edges equals 2. The faces are acute isosceles triangles. The larger angle of these equals \arccos\tfrac19 \approx 83.62^{\circ} and the two smaller ones equal \arccos\tfrac23 \approx 48.19^{\circ}. The tetrakis hexahedron is 4-connected: every three of the vertices separate from the remaining vertices, and the graph remains connected. Every 4-connected polyhedron can be realized as the ideal polyhedron, and the tetrakis hexahedron is such. == Applications ==

Naturally occurring (crystal) formations of tetrahexahedra are observed in copper and fluorite systems. Polyhedral dice shaped like the tetrakis hexahedron are occasionally used by gamers. A 24-cell viewed under a vertex-first perspective projection has a surface topology of a tetrakis hexahedron and the geometric proportions of the rhombic dodecahedron, with the rhombic faces divided into two triangles. The tetrakis hexahedron appears as one of the simplest examples in building theory. Consider the Riemannian symmetric space associated to the group SL4(R). Its Tits boundary has the structure of a spherical building whose apartments are 2-dimensional spheres. The partition of this sphere into spherical simplices (chambers) can be obtained by taking the radial projection of a tetrakis hexahedron. == Symmetry ==

With tetrahedral symmetry, the triangular faces represent the 24 fundamental domains of tetrahedral symmetry. This polyhedron can be constructed from six great circles on a sphere. It can also be seen by a cube with its square faces triangulated by their vertices and face centers, and a tetrahedron with its faces divided by vertices, mid-edges, and a central point. ==See also==