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7. Dividing the BIM cell values by 24––BIM÷24––forms a criss-crossing DIAMOND NPS that divides the overall BIM into two distinct and alternating Row (and Column) bands or sets:


ODD WIN that are ÷3 and referred to as NON-ARs;

ODD WIN that are NOT ÷3 and referred to as ARs, or Active Rows;

The ARs ALWAYS come in pairs—with an EVEN WIN between—as the

UPPER and LOWER AR of the ARS (Active Row Set);


8. ALL PPTs and ALL PRIMES ALWAYS are found exclusively on the ARs–

no exceptions.


9. By applying:

NP = *6yx ± y


let y = odd number (ODD) 3, 5, 7,... and x = 1, 2, 3,... one generates a NP table containing ALL the NP;


*True if ÷3 ODDs are first eliminated, otherwise ADD exponentials of 3 to the NP pool;


10. Eliminating the NP—and the NP contain a NPS—from ALL the ODD WIN, reveals the PRIMES (P).

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PRIMES_vs_NO-PRIMES

By RBrooks

Identifying the PRIMES (P) from the NO-PRIMES (NP) from the pool of ODD numbers is a matter of separation, as one defines the other. Amongst a list of all the ODD numbers (≥3), one may reveal ALL the PRIMES (P) simply be identifying ALL the NO-PRIMES (NP). Two new methods: 1.) algebraic and 2.) algebraic geometry — identify ALL the NP from any list of sequential ODD numbers.