I got \displaystyle\frac{{e}}{{{e}+{1}}}+{e}-{1} , however the answer is \displaystyle\frac{{1}}{{{e}+{1}}}+{e}-{1} , The correct answer is: \displaystyle{\int_{{0}}^{{1}}}{\left({x}^{{e}}+{e}^{{x}}\right)}\ {\left.{d}{x}\right.}=\frac{{1}}{{{e}+{1}}}+{e}-{1} ...

\displaystyle{I}=\frac{{1}}{{32}}{\left({5}{e}^{{4}}-{1}\right)} Explanation: Here, \displaystyle{I}={\int_{{0}}^{{1}}}{x}^{{2}}{e}^{{{4}{x}}}{\left.{d}{x}\right.} \displaystyle\text{Using }\ \text{Integration by Parts:} ...

Notice, first apply product rule, \int x^2e^{-x}\ dx=x^2\int e^{-x}\ dx-\int\left(2x\int e^{-x}\ dx\right)dx =-x^2e^{-x}+2\int xe^{-x}dx =-x^2e^{-x}+2\left(x\int e^{-x}\ dx-\int\left(1\int e^{-x}\ dx\right)dx\right) ...

I found: \displaystyle{f{{\left({x}\right)}}}={x}^{{3}}+{e}^{{x}}{\left({x}-{1}\right)}+{4} Explanation: Let us solve the integral first: \displaystyle\int{\left({3}{x}^{{2}}+{x}{e}^{{x}}\right)}{\left.{d}{x}\right.}={3}\frac{{x}^{{3}}}{{3}}+{x}{e}^{{x}}-\int{1}{e}^{{x}}{\left.{d}{x}\right.}= ...

\displaystyle{F}'{\left({x}\right)}={2}{x}{e}^{{{x}^{{4}}}} Explanation: The best way to approach this is to rewrite this integral. It canbe better re-written to the following: \displaystyle{F}{\left({x}\right)}={\int_{{0}}^{{{x}^{{2}}}}}{e}^{{{t}^{{2}}}}{\left.{d}{t}\right.} ...

\displaystyle{f{{\left({x}\right)}}}={e}^{{{x}+{2}}}-{3}{x}^{{2}}-{39.6} Explanation: We need to start by solving the integral, then plugging in the known values to finish. Notice that inside ...