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This is significant as follows:
as the Trails grow in length diagonally they accumulate overlaps of the previous Trails such that any accounting of the number of PPsets so present horizontally on any Row, will always be greater than, or equal to, one.
The sum of the PPset members equals the EVEN number corresponding to that Row. Goldbach’s Conjecture is proved.
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Periodic Table Of PRIMES (PTOP) and the Goldbach Conjecture--- How to Make with Fractals
By RBrooks
While “hidden” on the BIM (BBS-ISL Matrix), the PRIMES form PPsets — pairs — whose members lie in equal, symmetrical steps on either side of the EVENS number that has been divided by 2. This geometric, embedded pattern on the BIM can be presented as the PTOP: Periodic Table Of PRIMES. Here, these PPsets form the EVENS. The PPsets become “Trails” of PPsets, that increasingly overlap such that more than one PPset is present to compose a given EVEN. In doing so, they satisfy and prove the Goldbach Conjecture!
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