What is Hexakis Octahedron?
In geometry, a Hexakis Octahedron (also called hexoctahedron, disdyakis dodecahedron, octakis cube, octakis hexahedron, kisrhombic dodecahedron), is a Catalan solid with 48 congruent triangular faces, 72 edges and 26 vertices. It is the dual of the Archimedean solid ‘truncated cuboctahedron’. As such it is face-transitive but with irregular face polygons.
How to Calculate Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius?
Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius calculator uses Truncated Cuboctahedron Edge of Hexakis Octahedron = (14*Insphere Radius of Hexakis Octahedron)/(sqrt((402+(195*sqrt(2)))/194)*2*(sqrt(60+(6*sqrt(2))))) to calculate the Truncated Cuboctahedron Edge of Hexakis Octahedron, Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius formula is defined as the length of the edges of a Hexakis Octahedron that is created by truncating the vertices of a Cuboctahedron, calculated using the insphere radius of Hexakis Octahedron. Truncated Cuboctahedron Edge of Hexakis Octahedron is denoted by le(Truncated Cuboctahedron) symbol.
How to calculate Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius using this online calculator? To use this online calculator for Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius, enter Insphere Radius of Hexakis Octahedron (ri) and hit the calculate button. Here is how the Truncated Cuboctahedron Edge of Hexakis Octahedron given Insphere Radius calculation can be explained with given input values -> 8.14575 = (14*18)/(sqrt((402+(195*sqrt(2)))/194)*2*(sqrt(60+(6*sqrt(2))))).