7.1 Integration By Parts/49

Prove ${\displaystyle \int _{}^{}\left(\tan ^{n}(x)\right)dx={\frac {tan^{n-1}x}{n-1}}-\int _{}^{}\tan ^{n-2}xdx}$

${\displaystyle \int _{}^{}\left(\ln(x)^{n}\right)dx}$

${\displaystyle {\begin{aligned}&u=\ln(x)^{n}\quad dv=1dx\\[2ex]&du=1dx\quad v=x\\[2ex]\end{aligned}}}$

${\displaystyle {\begin{aligned}\int _{}^{}\left(\ln(x)^{n}\right)dx&=x\ln(x)^{n}-\int _{}^{}\left((x{\frac {n\ln(x)^{n-1}}{x}})\right)dx\\[2ex]&=x\ln(x)^{n}-\int _{}^{}\left(n\ln(x)^{n-1}\right)dx\\[2ex]&=x\ln(x)^{n}-n\int _{}^{}\left(\ln(x)^{n-1}\right)dx\\[2ex]\end{aligned}}}$