¶ Congruence of Vectors
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Congruence of Vectors:
“Sum totally the four hexagons of the vector equilibrium have 24 radial disintegrative vectors and 24 chordally integrative vectors. The unique planes of any two hexagons of the set of four interact with one another in such a manner that the line of interaction (intersection) of the planes is congruent with the radially defined diameters of the two hexagons. This paired congruency of the 24 radial disintegrative vectors of the four hexagons reduces their visible number to 12. While the 24 chordal integrative vectors remain non-congruent and appear as 24. The congruence of vectors occurs many times in nature’s coordinate structring and destructuring and often misleads the uniformed observer.”
Cite RBF-Marginalia, Bear Island, 25 Aug '71, Synergetics draft Ser. 881-72
-Citation at Vector, 25 Aug’71
