What is a Snub Cube?
In geometry, the Snub Cube, or Snub Cuboctahedron, is an Archimedean solid with 38 faces - 6 squares and 32 equilateral triangles. It has 60 edges and 24 vertices. It is a chiral polyhedron. That is, it has two distinct forms, which are mirror images (or "enantiomorphs") of each other. The union of both forms is a compound of two Snub Cubes, and the convex hull of both sets of vertices is a truncated cuboctahedron. Kepler first named it in Latin as cubus simus in 1619 in his Harmonices Mundi. H. S. M. Coxeter, noting it could be derived equally from the octahedron as the cube, called it Snub Cuboctahedron.
How to Calculate Midsphere Radius of Snub Cube given Volume?
Midsphere Radius of Snub Cube given Volume calculator uses Midsphere Radius of Snub Cube = sqrt(1/(4*(2-[Tribonacci_C])))*((3*sqrt(2-[Tribonacci_C])*Volume of Snub Cube)/((3*sqrt([Tribonacci_C]-1))+(4*sqrt([Tribonacci_C]+1))))^(1/3) to calculate the Midsphere Radius of Snub Cube, Midsphere Radius of Snub Cube given Volume formula is defined as the radius of the sphere for which all the edges of the Snub Cube become a tangent line on that sphere, and calculated using the volume of the Snub Cube. Midsphere Radius of Snub Cube is denoted by rm symbol.
How to calculate Midsphere Radius of Snub Cube given Volume using this online calculator? To use this online calculator for Midsphere Radius of Snub Cube given Volume, enter Volume of Snub Cube (V) and hit the calculate button. Here is how the Midsphere Radius of Snub Cube given Volume calculation can be explained with given input values -> 12.47777 = sqrt(1/(4*(2-[Tribonacci_C])))*((3*sqrt(2-[Tribonacci_C])*7900)/((3*sqrt([Tribonacci_C]-1))+(4*sqrt([Tribonacci_C]+1))))^(1/3).