You wanted to calculate \int x \log^2(x) dx If you use the substitution t=\log(x), you get dt = x dx, or dt = e^t dx This gives you \int t^2 e^{2t} dt I don't think this integral will ...

You could either evaluate the integral and then differentiate or reason as follows: Explanation: The Second Fundamental Theorem of Calculus says that If \displaystyle{f} is continuous on \displaystyle{\left[{a},{b}\right]} ...

Your example has no counterterms to cancel the 1/r singularity! This explains the discrepancy. In a correctly regularized expression, the counterterms are not introduced in an ad hoc way but by ...

The first step in solving the problem is to note that u(t)=0 is always a solution of the ODE Cauchy problem under analysis , i.e. of \begin{cases} \dfrac{\mathrm{d}u(t)}{\mathrm{d}t}=u^a(t) \\ \\ u(0)\equiv u_0=0 \end{cases}\quad0\le a\le 1.\tag{1}\label{1} ...

That is because on [0,\frac12] the functions are both equal to 1, hence the integral of the difference on that interval is 0. Similarly, if n\le m, the functions are equal to 0 on [\frac12+\frac1n,1] ...

The integral is infra-red divergent. Power counting is about ultra-violet divergences. As you can check for yourself, the singular behaviour is in the lower limit: \int_\epsilon^\infty \frac{1}{x^n}\mathrm dx=(1-n)^{-1}x^{1-n}\bigg|^\infty_\epsilon\sim\epsilon^{1-n} ...