Pick \epsilon > 0 , and let A_n = \{ x \in [0, 1] : |f_n(x)| > \epsilon \} . Then, we must have that m(A_n) \to 0 . Indeed, assume not, then there is some R > 0 such that for infinitely ...

You just have to remember that |z| = \sqrt{ \mathcal{R}(z)^2 + \mathcal{I}(z)^2} Hence |1-t+it| = \sqrt{(1-t)^2+t^2} Then \int_0^1|1-t+it|^2 dt = \int_0^1 (1-t)^2+t^2 dt and this is a ...

Your calculation of c is wrong. If you show how you calculated c, I can help you find the mistake. Your method for calculating E(X) is correct, but your result is wrong because c is not ...

Your calculation, as far as you took it, is right, you want \pi\int_0^{10}\left(\frac{y^2}{4}-5y+25\right)\,dy. For the integration, an antiderivative is \frac{y^3}{12}-\frac{5y^2}{2}+25y. When ...

Under the L^1 norm, C[0,1] is not a Banach space. Your example f_n(x) = x^n doesn't do the trick since \|f_n(x) - 0\| \to 0 as n \to \infty, so there is a limit to this sequence in C[0,1]. ...

Let p=c, c is a non-zero constant. Degree of p is 0 and p\neq 0 but \|p\|=\sup_{x\in [0,1]}|p'(x)|=0 so 4 is not a norm. EDIT: Thanks for warnings. Degree of p is n+1 so it is not in ...