That's not what “using partitions” mean. It means to use the definition of the Riemann integral. So, let P_n=\left\{0,\frac1n,\frac2n,\ldots,1\right\} . The upper sum with respect to this partition ...

You can consider the Riemann sums . For instance, the left Riemann sum \sum_{i=0}^{n-1} f(x_i) \Delta x_i = \sum_{i=0}^{n-1} \left(\frac{b}{n}i\right)^3\frac{b}{n} = \frac{b^4}{n^4}\sum_{i=0}^{n-1} i^3 = \frac{b^4}{n^4}\left({n}^{4}/4 - {n}^{3}/2+ {n}^{2}/4\right)\longrightarrow_{n\to \infty} \frac{b^4}{4} ...

Not entirely sure I am understanding you correctly, but I think that what this question comes down to is the definition of the integral. It seems as if you are saying that the integral is defined to ...

Divide the interval from x= 3 to x= 7 into n equal length subintervals. Each has length (7- 3)/n= 4/n. The x values at the endpoints of the subintervals are x_0= 3 , x_1= 3+ 4/n= (3n+ 4)/n , ...

Hint 1. Fix a and write F(x) = \int_a^{x^2} f(t) \, dt - \int_a^{x} f(t) \, dt. Hint 2. If g(x) = \int_a^{x} f(t) \, dt, can you express F(x) using the function g?

As part of the sentence \lim_{x\to\infty} g(x) exists you are assuming that g(x) exists for all x > a (for example). In particular, you know that f\in \mathcal{R}[a,x] for any x. This means ...