From Mr. V Wiki Math
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| | Prove |
| <math> | | <math> |
| \int_{}^{} \left(\ln(x)^{n}\right)dx = x\left(\ln(x)^{n}\right)-n\int_{}^{}\left(\ln(x)^{n-1}\right)dx | | \int_{}^{} \left(\ln(x)^{n}\right)dx = x\left(\ln(x)^{n}\right)-n\int_{}^{}\left(\ln(x)^{n-1}\right)dx |
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| | </math> |
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| | \int_{}^{} \left(\ln(x)^{n}\right)dx |
| </math> | | </math> |
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| <math> | | <math> |
| \begin{align} | | \begin{align} |
| u &= \ln(x)^{n} \quad dv= 1dx \\[2ex] | | &u = \ln(x)^{n} \quad dv= 1dx \\[2ex] |
| du &=1dx \qquad v=x \\[2ex] | | &du =1dx \quad v=x \\[2ex] |
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| \end{align} | | \end{align} |
Latest revision as of 04:36, 29 November 2022
Prove
![{\displaystyle {\begin{aligned}&u=\ln(x)^{n}\quad dv=1dx\\[2ex]&du=1dx\quad v=x\\[2ex]\end{aligned}}}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/5fd34bb0856f51b99669b80b874ddcf377bc75f4)
![{\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}}}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/19be1d5890fa5a4661b92c41d3728d2463eb1083)