\displaystyle{I}=\frac{{1}}{{50}}{\ln}{\left|{2}{x}+{1}\right|}+\frac{{87}}{{25}}{\ln}{\left|{x}-{2}\right|}-\frac{{29}}{{{5}{\left({x}-{2}\right)}}}+{C} Explanation: \displaystyle{\left({x}^{{2}}-{4}{x}+{4}\right)}={\left({x}-{2}\right)}^{{2}} ...

First I will prove a theorem. We have \Gamma(x)=\displaystyle\int_{0}^{\infty}e^{-t}t^{x-1}\mathrm dt And, \text{B}(x,y)=\displaystyle\int_{0}^{1}t^{x-1}(1-t)^{y-1}\mathrm dt Then, \text{B}(x,y)=\dfrac{\Gamma(x)\Gamma(y)}{\Gamma(x+y)} ...

We know that |x|=\begin{cases}x & x\geq 0\\-x & x<0 \end{cases} So \displaystyle \int_{-1}^{1} {x^2+\dfrac{x^{2013}}{x^2}+2|x|+1}dx =\displaystyle \int_{-1}^{1} {x^2+x^{2011}+1}dx+2\int_{-1}^{0}{-x}dx+2\int_{0}^{1}{x}dx ...

Let I be the integral given by I= \int_{0}^1\frac{1+x^6}{1-x^2+x^4-x^6+x^8}dx Now, make the substitution x=u^{-1}. Then dx=-u^{-2}du and the limits of integration over u extend from \infty ...

I think the idea here is that p_n\geq 0 is a very good approximation to the delta function meaning: for all \delta>0, \lim_{n\to\infty}\int_{|y|>\delta}p_n(y)dy=0, \int p_n\equiv 1 and \sup_n\|p_n\|_{L^1}=1<+\infty ...

Yes you are correct in your derivation. A graphical representation of your answer: