7.1 Integration By Parts/11: Difference between revisions

${\displaystyle \int {\text{arctan(4t)}}dt}$

${\displaystyle u={\text{arctan(4t)}}\qquad dv=dt}$

${\displaystyle du={\frac {4}{1+(4t)^{2}}}dt\qquad v=t}$

${\displaystyle {\begin{aligned}\int {\text{arctan(4t)}}dt={\text{tarctan(4t)}}-4\int {\frac {t}{1+16t^{2}}}dt\\[2ex]&u=1+16t^{2}&du=32tdt&{\frac {1}{32}}du=tdt\end{aligned}}}$

&= \text {tarctan(4t)} \\[1ex] &= \pi\left[\left(4(2)-(2)^2+\frac{1}{12}(2)^3\right)-\left(4(1)-(1)^2+\frac{1}{12}(1)^3\right)\right] \\[2ex] &= \pi\left[\left(8-4+\frac{8}{12}\right)-\left(4-1+\frac{1}{12}\right)\right] \\[2ex] &= \pi\left[4+\frac{8}{12}-3-\frac{1}{12}\right]= \pi\left[1+\frac{7}{12}\right] \\[2ex] &= \pi\left[\frac{12}{12}+\frac{7}{12}\right]= \pi\left[\frac{19}{12}\right] \\[2ex] &= \frac{19\pi}{12}

\end{align} </math>