The integral \int_a^bf(x)\,dx is defined when [a,b] is included in the domain of definition of f, and if so it is =0 when a=b. When (a,b) is included in the in the domain of definition, ...

Hint: x^2+2 = 2\left(\frac{x^2}{\sqrt{2}^2}+1\right)

What you say to this depends a bit on your definition. One way to deal with integrals where you integrate over a point not in the domain, is to split the integral up into two integrals. This is the ...

\log(x) has different meanings depending on context. It can often mean: any logarithm if the base is not important (e.g. in general proofs about logarithms) the natural logarithm \log_e(x) = \ln(x) ...

First of all notice that the map x\mapsto \frac{x-1}{x} is increasing. Therefore your function has finite total variation which is equal to the supremum value of the image minus the minimum. ...

The recurrence relation derived by Jack D'Aurizio in his answer above can actually be solved explicitly for I_m. First let me quote it below, but changing the recurrence index to n: I_{n+1} = \frac{2n+1}{2n}\,I_{n} + f_n(t) \qquad (n \ge 1) \qquad (1) ...