This is an interesting question that can be tackled in many ways, there are many chances a good piece of math will come out of it. For now, I will just keep collecting and rearranging observations, ...

Here is a visualization I had previously made for myself when I was trying to get a "geometric intuition" for these integrals. I think it's useful to consider the one of the sums in the limit, \sum_{i} f(x_i) \Delta g(x_i) = \sum_{i} f(x_i) (g(x_{i+1}) - g(x_{i})) ...

Thanks for mentioning Wirtinger's inequality, i was not aware of it( have not studied fourier analysis yet). I will use two of its applications : 1) If f(a)=f(b)=0 then \frac{(b-a)^2}{\pi^2}\int_a^b(f'(x))^2dx\geq\int_0^a(f(x))^2dx ...

Your integral is the area A under the graph of y = x^2 and above y=0 for x from 0 to 1: The total area of the square 0 \le x \le 1, 0 \le y \le 1 is 1. If you choose a random point ...

Yes, everything you've written is correct. (except for that one weird chain of equations x_{0+k} = f(0+k) = k^2 which doesn't really make sense) Although this problem is simple enough that what I ...

Begin with \int_0^3 xf(x^2) dx, and perform the u-substitution u = x^2 Then du = 2x dx, so that \frac{1}{2} \int_0^3 f(x^2) 2xdx = \frac{1}{2}\int_0^9 f(u) du = 5. Note that in your ...