See the entire solution process below: Explanation: First, rewrite this expression as: \displaystyle{\left(\frac{{32}}{{2}}\right)}{\left(\frac{{n}^{{2}}}{{n}^{{4}}}\right)}{\left(\frac{{p}}{{p}}\right)}={16}\times\frac{{n}^{{2}}}{{n}^{{4}}}\times{1}={16}{\left(\frac{{n}^{{2}}}{{n}^{{4}}}\right)} ...

The series converges absolutely. Explanation: The ratio test states the following: Consider two consecutive terms \displaystyle{a}_{{k}} and \displaystyle{a}_{{{k}+{1}}} ; Divide the latter ...

It follows by parity: \ 2d^2 = n^2 is even, so \,n\, is even, since odd^2\! = odd \cdot odd = odd.

See a solution process below: Explanation: First, simplify the constants as: \displaystyle\frac{{{4}{a}{b}{c}}}{{{2}{c}^{{2}}}}=\frac{{{\left({2}\times{2}\right)}{a}{b}{c}}}{{{2}{c}^{{2}}}}=\frac{{{\left({\left(\cancel{{{\left({2}\right)}}}\right)}\times{2}\right)}{a}{b}{c}}}{{{\left(\cancel{{{\left({2}\right)}}}\right)}{c}^{{2}}}}= ...

Want u_n = 1/([\sqrt{n}]^4+n-[\sqrt{n}]^2) If (2k)^2 \le n \lt (2k+1)^2 , let j = n-(2k)^2 . Then 0 \le j \le (2k+1)^2-(2k)^2-1 =4k and \sqrt{n} \lt 2k+1 so k \gt (\sqrt{n}-1)/2 . [\sqrt{n}]^4+n-[\sqrt{n}]^2 =(2k)^4+((2k)^2+j)-(2k)^2 =(2k)^4+j \gt ((\sqrt{n}-1)/2)^4 \gt n^2/256 ...

OK, the general strategy to deal with this kind of problems is to use the squeezing theorem . This theorem states that if\,\,\,\,\left\{ \matrix{ {l_n} \le {a_n} \le {u_n}, \,\,\,\,\,\,\,\,\,\ n \ge N \hfill \cr \mathop {\lim {l_n}}\limits_{n \to \infty } = L \hfill \cr \mathop {\lim {u_n}}\limits_{n \to \infty } = L \hfill \cr} \right.\,\,\,\,\,\,then\,\,\,\,\,\,\,\mathop {\lim {a_n}}\limits_{n \to \infty } = L\tag{1} ...