¶ Subfrequency (1)
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The vector equilibrium is an interesting kind of geometry because, just looking at it as a model we see a square, a square, a triangle, etc., starting at a common center all the vertexes are equidistant from the same center in a one-frequency system. The word frequency would never relate to the word one, incidentally, because frequency involves some plurality of events. Therefore, frequency would begin at two, so sub-frequency and what I spoke about yesterday, a sub-size, we begin to have frequencies for size. Therefore, vector equilibrium is really subsize. It doesn’t have size, if it looked like this and every edge were divided into two and interconnected, then it would be a two-frequency system and all the radii would have two increments. It is a single system and yet it has a tetrahedral volume of 20, whereas the cube, when the edge module is one, the volume is one. When the edge module of a cube is two, then the volume is eight. So looking at vector equilibrium as unity-- as all the domain of a point, and so forth, we find that it has a volume of 480. . . I developed an intuitive feeling long, long ago that the word unity was inherently plural. How could you have unity in the singular? That concept changed quantum in wave mechanics. . . I am giving you a way that you have to look at unity as being tetrahedra of 20; and if I am
