\displaystyle\int{x}^{{3}}{\left({1}-{x}^{{4}}\right)}^{{6}}{\left.{d}{x}\right.}=-\frac{{1}}{{28}}{\left({1}-{x}^{{4}}\right)}^{{7}}+{c} Explanation: \displaystyle\int{x}^{{3}}{\left({1}-{x}^{{4}}\right)}^{{6}}{\left.{d}{x}\right.}---{\left({1}\right)} ...

\displaystyle\frac{{1}}{{6}}{x}^{{6}}-\frac{{2}}{{5}}{x}^{{5}}+{x}^{{4}}+\frac{{8}}{{3}}{x}^{{3}}-{8}{x}^{{2}}+{32}{x}+{C} Explanation: The best would just be to multiply the whole thing out and ...

\displaystyle{16}{x}^{{7}}+{c} Explanation: First let's simplify the integrand. \displaystyle{\left({x}^{{2}}\cdot{2}{x}\cdot{2}\right)}^{{2}}={\left({4}{x}^{{3}}\right)}^{{2}}={16}{x}^{{6}} ...

\displaystyle{3} . Explanation: Recall the Rule of Integration by Parts for Definite Integral : \displaystyle{\int_{{a}}^{{b}}}{\left({u}\cdot{v}'\right)}{\left.{d}{x}\right.}={{\left[{u}{v}\right]}_{{a}}^{{b}}}-{\int_{{a}}^{{b}}}{\left({u}'\cdot{v}\right)}{\left.{d}{x}\right.}\ldots\ldots\ldots\ldots{\left(\ast\right)} ...

You have transformed the question to the following system of equations \begin{cases} A^2- B^2 = 0 & \\ A^3 - B^3 = 54 &\end{cases} Two equations, two unknowns. It is not too difficult to solve A, B ...

2^x=e^{\ln 2^x}=e^{x\ln 2} Then e^{x\ln 2}-e^{-x\ln 2}=2\sinh(x\ln 2)