¶ Cube: Diagonal of Cube (1)
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Index Entry
Cube: Diagonal of Cube:
"We find the associated behaviors of various atoms complementing each other so that we are not just talking about one thing and another one thing, but we are beginning to get something like the interplay of the two three-vector events, i.e., the six-vectored tetrahedral structure. If I bring two tetrahedra symmetrically together, they have a common center of gravity and make a cube.
“Each tetrahedron has four vertexial ‘star points.’ Instead of having two sets of four separate stars, I now have eight stars symmetrically equidistant from the same center and from each other. All the stars are nearer to each other in their separate four-star aggregations as tetrahedra, where the distances between the star vertexes were the uniformly-sized six edges of the tetrahedra. In their cubical integration the next three nearest stars to each star are only the distance of their right-angled legs of the cube’s 12 edges apart from one another, while the tetrahedra’s edges are the diagonals, or hypotenuses, of the cubes’ six square faces. Each star has three nearer stars as well as three more remote stars, already transfixing, ergo, step-up of, its coherences, which is 1.41 x 250,000 = 352,500 psi.”
¶ Citations
- RBF marginalis at old Chap 2, “Synergy,” I.4, 18 Mar’69
