Here is a mathematical idea, that I have recently stipulated. Although I am not super confident that this is to a tee; I will let you know what I have come up with here, and we'll give it a shot:
The natural log of [[The summation from N = 0 to infinity, of [(e^(N+3)/e^(2N)]] TIMES
[[PI TIMES [The natural log of PI]/2]] TIMES
[[1/[[INVERSE ZETA OF ZERO] TIMES THE NATUAL LOG OF [THE SUMMATION FROM N = 0 TO INFINITY, OF [[I TIMES PI]/e^(2N-1)]]}]
= 0 +1+2+3... = {~ INFINITY (FOR A EUCLIDEAN-RELATED EXPANSION), OR, (-1/12) (FOR A CLIFFORD-RELATED EXPANSION}.
I CALL THIS EQUATION, THE "RHL" EQUATION.
PLEASE LET ME KNOW HOW I DID. FEEL FREE TO COMMENT! IF THERE'S A MISTAKE, PLEASE TELL ME WHAT YOU PERCEIVE. THANK YOU FOR YOUR READERSHIP! SINCERELY, SAMUEL DAVID ROACH. TO BE CONTINUED!
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