Hint: \sin^{2}{x} \cdot \cos^{3}(x) = \sin^{2}{x} \cdot \bigl(1-\sin^{2}(x)\bigr) \cdot \cos{x} Now put t = \sin(x). The integral you have has the form t^{2} \cdot (1-t^{2}) = t^{2}-t^{4}.

I=\int _{ 0 }^{ \pi }{ { e }^{ { \sin ^{ 2 } x } } } { \cos((2n+1)x) } dx Let u=\pi -x, dx=-du, { { e }^{ { \sin ^{ 2 } x } } }={ { e }^{ { \sin ^{ 2 }( {\pi -u} )} } }={ { e }^{ { \sin ^{ 2 } u } } } ...

From 2\,\pi\,i=\int_\gamma\frac{e^{iaz}}{z}\,dz=\int_0^{2\pi}\frac{e^{ae^{it}}}{e^{it}}\,i\,e^{it}\,dt we get \int_0^{2\pi}e^{ae^{it}}\,dt=2\,\pi. Now e^{ae^{it}}=e^{a\cos t+ia\sin t}=e^{a\cos t}\bigl(\cos(a\,\sin t)+i\cos(a\,\sin t)\bigr). ...

\int\mathrm{e}^{\cos^2{x}}\sin x\,\mathrm dx\tag{1} Substitute u = \cos x, \mathrm du = -\sin x\,\mathrm dx in (1). \int\mathrm{e}^{\cos^2{x}}\sin x\,\mathrm dx = -\int \mathrm e^{u^2}\,\mathrm du = -\dfrac{\sqrt{\pi}}{2}\int \dfrac 2{\sqrt{\pi}}\mathrm e^{u^2}\,\mathrm du = -\dfrac{\sqrt{\pi}}{2}\operatorname{erf}(u) ...

Here’s how to do it…. \begin{align}I&=\int e^x\sin x\cos x\cos 2x\cos 4x\,\mathrm dx\\&=\dfrac12\int e^x\sin 2x\cos 2x\cos 4x\,\mathrm dx\\&=\dfrac14\int e^x\sin4x\cos 4x\,\mathrm dx\\&=\dfrac18\int e^x\sin8x\,\mathrm dx\\&=\dfrac18\cdot\dfrac1D(e^x\sin8x)\\&=\dfrac18e^x\dfrac1D(\sin 8x)\\&=\dfrac18e^x\dfrac1{D+1}(\sin 8x)\\&=\dfrac18e^x\dfrac{1-D}{1-D^2}(\sin 8x)\\&=\dfrac18e^x\dfrac{1-D}{1-(-64)}(\sin 8x)\\&=\dfrac{e^x(\sin8x-8\cos8x)}{520}+C\end{align}\tag*{} ...

By definition, the quantity |F| is real. Since |F| = \overline{u}\int_a^bf(x)\,dx, it follows that Re\left[\overline{u}\int_a^b f(x)\,dx\right] = Re\,|F| = |F| = \overline{u}\int_a^b f(x)\,dx.