¶ Octahedron as Conservation and Annihilation Model
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Octahedron as Conservation and Annihilation Model:
"The octahedron goes from a volume of four to a volume of three as one tensor is pressed at 90 degrees. This is a demonstration in terms of tension and compression of how energy can disappear and reappear. The process is reversible like Boltzmann’s law and like the operation of syntropy and entropy. The lost tetrahedron can reappear and become symmetrical in its optimum form as a ball-bearing-sphere octahedron. There are six great circles doubled up in the octahedron. Compression is radiational: it reappears. Out of the fundamental fourness of all systems we have a model of how four can become three in the octahedron conservation and annihilation model.
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