Let me give you a very simple and intuitive idea, this might be a new way of looking into this problem though. Let’s use the classical explanation of this problem, before that let me tell you that \frac{sinx}{x} ...

You may realize that it is enough to make sure the convergence near zero. You can use the properties of the sine function to easily extend the argumentation to the other singularities. For x\in(0,\pi/2) ...

\displaystyle{\int_{{0}}^{{\pi}}}\frac{{x}}{{{1}+{\left({\sin{{x}}}\right)}^{{2}}}}\cdot{\left.{d}{x}\right.}=\frac{{\pi^{{2}}\sqrt{{2}}}}{{4}} Explanation: \displaystyle{I}={\int_{{0}}^{{\pi}}}\frac{{x}}{{{1}+{\left({\sin{{x}}}\right)}^{{2}}}}\cdot{\left.{d}{x}\right.} ...

Hint: MVT implies that if f'\geq 0 on (a,b), then f is increasing on [a,b]. Apply this to h(x) = x - \sin x and k(x) = \sin x - x/2 for all x\in [0,\pi/3]. Second part of the ...

By parts: (a)\;\;\begin{cases}u=x,&u'=1\\v'=\cos x,&v=\sin x\end{cases}\implies\left.\int_0^{\pi/2}x\cos xdx=x\sin x\right|_0^{\pi/2}-\int_0^{\pi/2}\sin xdx= =\left.\frac\pi2+\cos x\right|_0^{\pi/2}=\frac\pi2-1 ...

To find the integral in degrees, it's better - for clarity's sake, not necessarily any formal reason - to start in radians with the conversion to degrees in the sine function. That is, \sin(x^\circ) = \sin \left( \frac{\pi \; \text{radians}}{180^\circ} x^\circ\right ) ...