The integral is zero when we consider the principal value of the integral. I assume that this is what Wolfram Alpha confirms. To prove this, split the integral up over its positive and negative parts ...

Your standard formula for calculating areas between curves has the form: \int_a^b (f(x)-g(x)) dx where f(x) is the upper curve and g(x) is the lower curve. This makes the integral positive, ...

The mistake is that x varies between -2 and 0, not between 0 and 1. The second interval is where y is located, but in your calculation you're integrating with respect to x, hence you ...

Note that \frac{n}{k(2n-k+1)}=\frac{n}{2n+1}\left(\frac{1}{k}+\frac{1}{2n+1-k}\right) Therefore, as n goes to infinity \sum_{k=1}^{n}\frac{n}{k(2n-k+1)}=\underbrace{\frac{n}{2n+1}}_{\to 1/2}\cdot\underbrace{\sum_{k=1}^{2n}\frac{1}{k}}_{\to +\infty}\to +\infty ...

For x=0, no problem. So, you are concerned by S_p=\sum_{n=1}^{p}\frac{1}{2n(2n)!} which will converge very fast as shown below \left( \begin{array}{cc} p & S_p \\ 1 & 0.25000000000000000000 \\ 2 & 0.26041666666666666667 \\ 3 & 0.26064814814814814815 \\ 4 & 0.26065124834656084656 \\ 5 & 0.26065127590388007055 \\ 6 & 0.26065127607785304545 \\ 7 & 0.26065127607867238442 \\ 8 & 0.26065127607867537159 \\ 9 & 0.26065127607867538027 \end{array} \right) ...

The integral does not converge, but the Cauchy-Principal value does. \begin{align} PV\int_1^3\frac{x}{2-x}dx&=\lim_{\epsilon \to 0}\left(\int_1^{2-\epsilon}\frac{x}{2-x}dx+\int_{2+\epsilon}^{3}\frac{x}{2-x}dx\right)\\\\ &=\lim_{\epsilon \to 0}\left(\left .(2\log|2-x|-x)\right|_{1}^{2-\epsilon}+\left .(2\log|2-x|-x)\right|_{2+\epsilon}^{3}\right)\\\\ &=\lim_{\epsilon \to 0}\left((\epsilon-1)+2\log|\epsilon|+(\epsilon-1)+2\log|1/\epsilon|\right)\\\\ &=-2 \end{align}