¶ Closest Packing of Spheres Sequence (2)
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Index Entry
Closest Packing of Spheres Sequence:
"subdivided finitely in modular wavelengths of discrete frequencies. Furthermore, spheres of given sizes are always compacted in omnitriangulation of 60 degreeness, so that six spheres pack most tightly around one sphere on a billiard table and 12 spheres around one in omnidirectional compacting. Additional rings of spheres may be tightly compacted around the sphere on the billiard table as symmetrical hexagon patterns and additional layers may be added omnidirectionally around one nuclear sphere in symmetrical vector equilibrium growth. The number of spheres in the successively enclosing shells are 12, 42, 92, 162, 252, and so on, which calculates as ten times the frequency (of radial or circumferential modular subdivisions) to the second power, plus two.
Sixty Degreeness, 1965
¶ Citations
- Conceptuality of Fundamental Structures (Kepes), p.71,1965
