The solutions are \displaystyle{S}={\left\lbrace{270}º,{30}º,{150}º\right\rbrace} Explanation: Let's rewrite the equation \displaystyle{2}{{\sin}^{{2}}\theta}+{\sin{\theta}}-{1}={0} This s ...

Hint: Writing \int^0_{-\pi} {i e^{2it}\color{red}{\sin(2t)}}dt=\int^0_{-\pi} {i e^{2it} \color{red}{\dfrac{e^{2it}-e^{-2it}}{2i}}}dt is easier to work.

Hint . Integrating by parts twice gives \begin{align} \int_0^5e^{-2t}\sin t\:dt&=\left. -\frac12e^{-2t}\sin t\right|_0^5+\frac{1}{2}\int_0^5e^{-2t}\cos t\:dt\ \end{align} and \begin{align} \int_0^5e^{-2t}\cos t\:dt&=\left. -\frac12e^{-2t}\cos t\right|_0^5-\frac{1}{2}\int_0^5e^{-2t}\sin t\:dt\ \end{align} ...

Taylor series of e^x = \sum\limits_{n=0}^{\infty}\frac{x^n}{n!} For x = \sin t e^{\sin t} = \sum\limits_{n=0}^{\infty}\frac{\sin^n t}{n!} Let's integrate \int\limits_{0}^{2\pi} e^{\sin t} \ dt = \sum\limits_{n=0}^{\infty} \frac{1}{ n!}\int\limits_{0}^{2\pi}\sin^n t \ dt ...

\displaystyle\int\ {e}^{{-{s}{t}}}{\sin{{t}}}\ {\left.{d}{t}\right.}=-\frac{{{e}^{{-{s}{t}}}{\left({s}{\sin{{t}}}+{\cos{{t}}}\right)}}}{{{s}^{{2}}+{1}}}+{C} Explanation: We seek the integral: \displaystyle{I}=\int\ {e}^{{-{s}{t}}}{\sin{{t}}}\ {\left.{d}{t}\right.} ...

The values of sinus function from \pi to 2\pi are the same as minus the sinus function from 0 to \pi. Or to be a bit more precise, consider a substitution t\rightarrow t-\pi. Now what is ...