I'm pretty sure that last one need to be n > \frac{\ln \varepsilon}{\ln \frac{2}{3}}. But then that this works. For every \varepsilon you give an explicit way to find N\left(= \frac{\ln \varepsilon}{\ln \frac{2}{3}})\right) ...

You can modify your argument as follows: You can assume that n \geq 4 because shifting the terms of a sequence does not affect its convergence or the value of convergence. Then \left|\frac{3^n}{n!} - 0\right| = \frac{3^n}{n!} =\frac{27}{3\times 2\times 1} \frac{3^{n-3}}{n \times(n-1)\times\cdots\times 4}\lt 5 \times \frac{3^{n-3}}{4^{n-3}} \lt \varepsilon ...

The series converges uniformly on subsets of M_{n}(\mathbb{C}) such that \left\|A\right\|\le R for some R>0. Then uniform convergence is guaranteed by the uniform convergence of the power series ...

Hint: For the second, write n^{n^{1/2}}= 2^{n^{1/2}\log_2 n}. Then \frac{n^{n^{1/2}}}{2^n} = \frac{2^{n^{1/2}\log_2 n}}{2^n} = 2^{\sqrt{n}\log_2 n - n}. What can you say about the limit of \sqrt{n}\log_2 n - n ...

I asume that you want to prove: \lim_n\displaystyle\frac{r^n}{n!}=0 and r>0 is fixed. Let N be an integer number such that N> r. Then for n>N the following holds: \displaystyle\frac{r^n}{n!}=\displaystyle\frac{r}{1}\cdots\displaystyle\frac{r}{N-1}\displaystyle\frac{r}{N}\cdots\displaystyle\frac{r}{n}<\displaystyle\frac{r}{1}\cdots\displaystyle\frac{r}{N-1}(\displaystyle\frac{r}{N})^{n-N} ...

Let \epsilon > 0. Then if n > 2\epsilon, you have \left|{(-1)^n\over n}\right| < {\epsilon\over 2}. Moreover, if m, n > 2/\epsilon, you have \left|{(-1)^n\over n} - {(-1)^m\over m}\right| < \epsilon.