¶ Prime Vector (2)
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Index Entry
Prime Vector:
"in each of the cube’s six faces, which alternate set of six diagonals intertriangulates the other four sphere centers of the cube’s eight corners. The cube diagonals and the edges of the tetrahedra structuring the cube are two aspects of the same phenomenon. The tetra-edge, cube-face diagonals connecting the two sets of four corners each of the cube’s total of eight corners are the prime vectors of the vector equilibrium and the isotropic vector matrix.
"The second power of the length of the prime vector that constitutes the diagonal of the cube’s face equals the sum of the second powers of any two edges of the cube. Because these two edges converge at the cube’s corners to form one standing wave which may be multifrequenced to apparently coincide with the cube’s facial diagonal, we discover that this relationship is what we are talking about in the deliberately nonstraight line. It is the same mathematical relationship demonstrated in the ancients’ proof of the Pythagorean theorem, wherein the square of the hypotenuse is proven to be equal to the sum of the squares of the triangle’s two legs. Thus the deliberately nonstraight line displays an evolutionary transformation from coincidence with the two sides of the parallelogram to "
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