¶ Isotropic Vector Matrix (1)
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Index Entry
Isotropic Vector Matrix:
"An Isotropic Vector Matrix is one in which all the forces are interacting everywhere equally in respect to both their (velocity x mass), linear magnitudes and to their relative angular direction interactions; wherefor all the lines must be of equal length and all their terminal inter-anglings must be the same.
"In an isotropic vector matrix it will be discovered that there are only two clear-space polyhedra described internally by the configuration of interacting lines-- these two clear space polyhedra are the regular tetrahedron and the regular octahedron. But all other regular symmetrical polyhedra known are described repetitiously by compounding rational fraction elements of the tetrahedron and octahedron. These elements are known as the A and B particles. They each have a volume of one-twenty-fourth of a tetrahedron. (ILLUSTRATE) It will be discovered also that all the polygons formed by the interacting vectors consist entirely of equilateral triangles and squares,-- the latter occuring as the cross sections of the octahedra and the triangles as the
