I don't think you need to specialize to a=k \pi. Rather, there is a simple, analytical expression for the sum of the cosine series. Write \sum_{k=1}^n \cos{\left(\frac{k a}{n}\right)} = \Re{\left[\sum_{k=1}^n e^{i k a/n}\right ]} ...

You need to change the order of what what you're doing. First integrate, then bound the series: \int_0^1 \cos(x^2) \; dx = \int_0^1 \sum_{k=0}^{\infty} \frac{(-1)^k x^{4k}}{(2k)!} \; dx =\sum_{k=0}^{\infty} \frac{(-1)^k}{(4k+1)(2k)!}. ...

First note that: (\cos (x^2))'=-2x\sin (x^2); \ \ (\sin (x^2))'=2x\cos (x^2). The integral: \begin{align}\int2x^3\cos(x^2)dx&=\int2x\cos (x^2)\cdot x^2\ dx=\\ &=\int (\sin (x^2))'\cdot x^2 \ dx=\\ &=\int (\sin (x^2))'\cdot x^2 +2x\sin (x^2)-2x\sin (x^2)\ dx=\\ &=\int (\sin (x^2))'\cdot x^2 +(x^2)'\sin (x^2)+(\cos (x^2))'\ dx=\\ &=\int (\sin (x^2)\cdot x^2)'+(\cos (x^2))' \ dx=\\ &=\int (x^2\cdot \sin (x^2))' \ dx+\int (\cos (x^2))' \ dx=\\ &=x^2\sin(x^2)+\cos(x^2)+C,\end{align} ...

The answer is \displaystyle={0} Explanation: We need \displaystyle\int{\cos{{x}}}{\left.{d}{x}\right.}={\sin{{x}}}+{C} Therefore, \displaystyle{\int_{{0}}^{\pi}}{\cos{{\left({3}{x}\right)}}}{\left.{d}{x}\right.}={{\left[\frac{{\sin{{\left({3}{x}\right)}}}}{{3}}\right]}_{{0}}^{\pi}} ...

\int_0^{\pi} x\cos(x)dx=\int_0^{\frac \pi 2} x\cos(x)dx+\int_{\frac \pi 2} ^{\pi} x\cos(x)dx let u=\pi-x in the second integral \int_0^{\pi} x\cos(x)dx=\int_0^{\frac \pi 2} x\cos(x)dx - \int_0^{\frac \pi 2} (\pi-u)\cos(u)du ...

\frac{1}{n}.\frac{\sin((n+\frac{1}{2})(\frac{1}{n}))}{2\sin(\frac{1}{2n})}=\frac{1}{2n}.\frac{\sin(1+\frac{1}{2n})}{\sin(\frac{1}{2n})}=\frac{\frac{1}{2n}}{\sin(\frac{1}{2n})}\sin\left(1+\frac{1}{2n}\right) ...