This is not a general approach, but it will lead you to the final answer quickly. Let's say \int_a^b \frac{dx}{A} \le K for some given constant K , then by Cauchy Schwarz K \int_a^b A(x) dx \ge \int_a^b \frac{dx}{A(x)} \int_a^b A(x) dx \stackrel{CS}{\ge} \left(\int_a^b dx\right)^2 = (b-a)^2 ...

It's easier to do integration by parts here: \int C(x)\mathrm dx=x\,C(x)-\int x\cos(x^2)\mathrm dx Can you take it from here?

P(x) must be a fourth degree polynomial a+bx+cx^2+dx^3+ex^4. If you solve the system\left\{\begin{array}{l}p(1)=1\\p(1)+p(2)=2^5\\p(1)+p(2)+p(3)=3^5\\p(1)+p(2)+p(3)+p(4)=4^5\\p(1)+p(2)+p(3)+p(4)+p(5)=5^5\text,\end{array}\right. ...

In general, F(x)=\int_{-\infty}^x f(t)\,dt, where f is the density function. If you prefer, you can write \int_{-\infty}^x f(x)\,dx. (The second notation can be confusing, since x appears ...

Following your comment, the upper sum of a partition where every subinterval is of equal witdh is \displaystyle \sum_{i=1}^k \frac{3i}{k^2} = \frac{3}{k^2}\sum_{i=1}^k i = \frac{3}{k^2} \frac{k (k+1)}{2} = \frac{3}{2}\frac{k+1}{k} ...

Given \varepsilon > 0, let N be the smallest integer such that 1/N < \varepsilon/2. For each i \in \{2, 3, \ldots, N - 1\}, let B_i = [1/i - \delta, 1/i + \delta], and for i = 1, let B_1 = [1 - \delta, 1] ...