a) First, as f is continuous, f is bounded, ie |f(x)|\leq M for all x\in [0,1]. Then |\int_0^1 f(t)t^kdt|\leq M\int_0^1t^kdt=\frac{M}{k+1}, we get that c^k\to 0, hence |c|<1. (and c\in [0,1[ ...

b) is not correct. There is some c>0 such that \|x\|_{1}\leq c\|x\|_{\infty}, then \|f\|\leq c for this c, it does not mean that for every c>0, \|f\|\leq c. Rather, the question needs the ...

The FTC says that F'(x)=f(x)=\int_{1}^{x^2}{\frac{\sqrt{9+u^4}}{u}}\,du. Now use the FTC again along with the chain rule. To do that note that f(x)=g(h(x)) where g(x):=\int_{1}^{x}{\frac{\sqrt{9+u^4}}{u}}\,du ...

Let F(x) be an antiderivative of f(x). \begin{align} \frac{d}{dx} \int_1^x (x^2+f(t))\,dt & = \frac{d}{dx} \int_1^x x^2\,dt+\frac{d}{dx} \int_1^x f(t)\,dt \\ & = \frac{d}{dx}\left(x^2\int_1^x ...

This question keeps being bumped by the Community bot, so I guess I should try giving it a proper answer. \newcommand{\d}{\mathrm d} You want to minimize \int_0^T x(t)^2\ \d t with \dot P(t) = -P(t) + x(t) ...

Hint: Use the partition 1, x^{1/n}, x^{2/n}, \ldots, x and note that n(x^{1/n}-1) \to \log x .