\displaystyle{v}=\sqrt{{\frac{{g}}{{k}}}}{\left({\text{tanh}{{\left(\sqrt{{{g}{k}}}{\left({t}+{C}_{{0}}\right)}\right)}}}\right)} Explanation: This is a separable differential equation so \displaystyle\frac{{{d}{v}}}{{{g}-{k}{v}^{{2}}}}={\left.{d}{t}\right.} ...

Other answers are generally correct, in that \frac{(m-1)^2}{m^2-1} \cdot \frac{m+1}{2m(1-m)} = \frac{-1}{2m} However, note the difference in domains. The original expression is undefined for m = -1 \text{ , } m = 0 \text{ and } m = 1 ...

Note that part of the product converges to -1/4. Additionally, there is an alternating sign, so the sequence will alternately approach 1/4 and -1/4 every other term in the limit. The even terms ...

Sequence is \displaystyle{\left\lbrace\frac{{3}}{{4}},\frac{{3}}{{2}},\frac{{15}}{{4}},\frac{{25}}{{2}},\frac{{425}}{{8}},\ldots\ldots\ldots\ldots\right\rbrace} Explanation: As \displaystyle{a}_{{1}}=\frac{{3}}{{4}} ...

You might find it easier to write \dfrac{n^2+2}{2n^2-1} = \dfrac{1}{2} \times \dfrac{2n^2+4}{2n^2-1} = \dfrac{1}{2} + \dfrac{5}{4n^2-2} and note you can make \dfrac{5}{4n^2-2} as small as you ...

\displaystyle\frac{{1}}{{n}^{{2}}} Explanation: Note that: \displaystyle\frac{{n}^{{5}}}{{{n}-{6}}}\cdot\frac{{{n}^{{2}}-{6}{n}}}{{n}^{{8}}}=\frac{{n}^{{6}}}{{{n}-{6}}}\frac{{{n}-{6}}}{{n}^{{8}}} ...