Riemann's Last Theorem
Abstract
The central idea of this article is to introduce and prove a special form of the zeta function as proof of Riemann's last theorem. The newly proposed zeta function contains two sub functions, namely f1(b,s) and f2(b,s). The unique property of ζ(s)=f1(b,s)-f2(b,s) is that as tends toward infinity the equality ζ(s)=ζ(1-s) is transformed into an exponential expression for the zeros of the zeta function. At the limiting point, we simply deduce that the exponential equality is satisfied if and only if R(s)=1/2. Consequently, we conclude that the zeta function cannot be zero if R(s) 1/2, hence proving Riemann's last theorem.
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