\displaystyle\frac{{{a}+{10}}}{{{a}-{10}}} Explanation: To begin flip the second fraction upside-down to turn the divide into a multiply: \displaystyle\frac{{{5}{a}^{{2}}+{49}{a}-{10}}}{{{14}{a}^{{2}}+{30}{a}+{4}}}\div\frac{{{5}{a}^{{2}}-{51}{a}+{10}}}{{{14}{a}^{{2}}+{30}{a}+{4}}} ...

Use Stirling's approximation n! \sim n^n e^{-n} \sqrt{2 \pi n} \quad (n \to \infty) You should be able to conclude that the radius of convergence is e.

Hint. \sum_{n=1}^\infty\frac{a_n}{1+na_n}=\sum_{k=1}^\infty\frac{a_{k^2}}{1+k^2 a_{k^2}}+\sum_{n\text{ is not a square}} \frac{a_n}{1+na_n} From what you've done we know \sum_{k=1}^\infty\frac{a_{k^2}}{1+k^2 a_{k^2}}=\sum_{k=1}^\infty\frac 1{k(k+1)}<\infty ...

If the initial conditions are zero, we can write the differential equation as \frac{1}{\hat{h}(s)}\hat{y}(s) = \hat{f}(s), or equivalently, \hat{y}(s) = \hat{h}(s) \hat{f}(s). You have worked out ...

Let v_n = \frac{n!}{n^n } then \frac{v_{n+1}}{v_n } =\frac{(n+1)! }{(n+1)^{n+1}} \cdot \frac{n^n }{n!} =\frac{n^n}{(n+1)^n }=\frac{1}{\left(1+\frac{1}{n}\right)^n}\to \frac{1}{e} hence \frac{\sqrt[n]{n!} }{n} =\sqrt[n]{v_n} \to\frac{1}{e} .

Hint. We have that 0<\sqrt[3]{n+1}-\sqrt[3]{n}=\frac{1}{(n+1)^{\tfrac{2}{3}}+n^{\tfrac{1}{3}}(n+1)^{\tfrac{1}{3}}+n^{\tfrac{2}{3}}}\leq \frac{1}{n^{2/3}} and then use the Squeeze Theorem.