Let \displaystyle f(x)=\frac{d g(x)}{dx} \displaystyle\implies \frac{d g(x)}{dx}=\int_{-1}^1\frac{d g(x)}{dx}dx=g(1)-g(-1) \displaystyle\implies d g(x)=[g(1)-g(-1)] dx Integrating either sides ...

This is absolutely correct ! Well done! Though the contradiction is easier to see than what you said. Just notice that \lim_{n\to \infty} \frac {M}{n+1}=0 so you can not have 1\leqslant \frac {M}{n+1} ...

For the first part, use the fact that a continuous function on [0,1] is bounded, say |f(x)|\le M. Then \Bigg|\int_0^1 x^nf(x)\,dx\Bigg|\le\int_0^1 Mx^n\,dx =\frac{M}{n+1}\to 0 \quad\text{as}\quad n\to\infty. ...

Since 2 + \sin^2 x \in [1,3] we have: \int_{-1}^1 |f(x)|^2\,dx \le \int_{-1}^1 |f(x)|^2(2 + \sin^2x)\,dx \le 3\int_{-1}^1 |f(x)|^2\,dx So, one of the integrals is finite if and only if the other ...

You are correct: The space of continuous functions on [-1,1] is not a Hilbert space under the inner product (f,g)=\int_{-1}^{1}f(x)g(x)dx. However, for any inner product space X, and fixed f \in X ...

There are two issues: local regularity and decay at infinity which are in duality via the Fourier transform. Here one needs to introduce distributions primarily in order to allow very bad local ...