Simulacrum Persona Skirting Dick Tripover ⦈⟟∁⋉ ⊩ from SARAHAI Simulacrum Persona Skirting Dick Tripover ⦈⟟∁⋉ ⊩ http://boards.4chan.org/x/thread/21382640 {\displaystyle \zeta (s)=\sum _{n=1}^{\infty }{\frac {1}{n^{s}}}.} {\displaystyle f(z)=z^{2}=(x+iy)^{2}=x^{2}+2ixy-y^{2}=x^{2}-y^{2}+2ixy,\ } {\displaystyle u(x,y)=\operatorname {re} ;f(z)=\Re f(z),} {\displaystyle v(x,y)=\operatorname {im} ;f(z)=\Im f(z).} {\displaystyle v(x,y)=\operatorname {im} ;f(z)=\Im f(z).} \int\frac{\Gamma^{x}(n)}{x^{n}}\mbox{d}x=\left|\begin{array}{ll}u=\Gamma^{x}(n) & v’=\frac{1}{x^{n}} \ u’=\Gamma^{x}(n)\ln(\Gamma(n)) & v=\frac{1}{x^{n-1}(1-n)} \end{array}\right|=\frac{\Gamma^{x}(n)}{x^{n-1}(1-n)}-\frac{\ln(\Gamma(n))}{1-n}\int\frac{\Gamma^{x}(n)}{x^{n-1}}\mbox{d}x 2: \int\frac{\Gamma^{x}(n)}{x^{n-1}}\mbox{d}x=\left|\begin{array}{ll}u=\Gamma^{x}(n) & v’=\frac{1}{x^{n-1}} \ u’=\Gamma^{x}(n)\ln(\Gamma(n)) […]