One of the essential numerical laws of the geometric network of form development
Abstract
A network for the hypohexagonal type was established and it was shown that the numerical law of the development of forms is essentially the same for this network as well, although now the faces are expressed by symbols not of three, but of four numbers; from these four numbers, you can always choose three, including necessarily the first number that will be completely identical to the numbers of the first network. But even if we do not make such a selection, but limit ourselves to three numbers, of which one is in the first place, and we choose the other two arbitrarily (that is, the second with the third, or the second with the fourth, or finally the third with the fourth), the law in question here will still remain valid. Of particular importance is the distribution of even and odd numbers. This law states that of the seven symbols relating to any elementary triangle of the network, one certainly encloses three (that is, all) odd numbers, three enclose two, and three enclose one odd number; all other numbers in the symbols are even.
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