\displaystyle{\int_{{0}}^{{1}}}{\sin{\theta}}{\left({d}\theta\right)}={0.4597} Explanation: As \displaystyle\frac{{d}}{{{\left.{d}{x}\right.}}}{\cos{\theta}}=-{\sin{\theta}} , \displaystyle\int{\sin{\theta}}{\left({d}\theta\right)}=-{\cos{\theta}} ...

\displaystyle\theta = 0 and 180 degree Explanation: \displaystyle{\sin{{2}}}\theta+{2}{\sin{\theta}}={0} or, \displaystyle{2}{\sin{\theta}}{\cos{\theta}}+{2}{\sin{\theta}}={0} or, \displaystyle{2}{\sin{\theta}}{\left({\cos{\theta}}+{1}\right)}={0} ...

Hint: I suppose that you found the formula in the context of Gauss Theorem. If so then this figure (from here ) shows how to find the formula.

Let \begin{equation} I=\int d\Omega\, e^{({\bf s}_1+{\bf s}_2)\cdot \hat{\bf r}}, \end{equation} where d\Omega=\sin(\theta) d\phi d\theta and \hat{\bf r} is a unit vector in spherical ...

I give you a step or two, and know you can finish from them: Make a partial fraction decomposition of the rational part, and write your integral as \frac{1}{2}\int\frac{1}{(1-t)\sqrt{1+t+t^2}}\,dt+\frac{1}{2}\int\frac{1}{(1+t)\sqrt{1+t+t^2}}\,dt ...

To remove all the distractions of three dimensions and curved surfaces, let's just consider calculating the area of a right isosceles triangle and the length of its diagonal. Take the triangle formed ...