| ζ(s)=Π_{p:prime number}1/(1-1/p^s)を示しています。
(1/2^s)ζ(s)=1/2^s+1/4^s+1/6^s+… (1-1/2^s)ζ(s)=(1+1/3^s+1/5^s+1/7^s+…)-(1/22^s+1/24^s+1/26^s+1/28^s+…) (1-1/2^s)(1-1/3^s)ζ(s)=(1+1/5^s+1/7^s+1/11^s+1/13^s+…)-(1/22^s+1/24^s+1/26^s+1/28^s+1/30^s+…) (1-1/2^s)(1-1/3^s)(1-1/4^s)ζ(s)=(1+1/5^s+1/7^s+1/11^s+1/13^s+1/17^s+1/19^s+…) -(1/4^s+1/20^s+1/22^s+1/24^s+1/26^s+1/30^s…) :
と続くのですがこれからどうすればいいのでしょうか?
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