\displaystyle\frac{{{9}{n}}}{{{n}-{7}}} Explanation: \displaystyle\text{factor the numerators/denominators} \displaystyle=\frac{{{\left({n}-{1}\right)}{\left({n}-{9}\right)}}}{{{\left({n}-{9}\right)}{\left({n}+{6}\right)}}}\div\frac{{{\left({n}-{1}\right)}{\left({n}-{7}\right)}}}{{{9}{n}{\left({n}+{6}\right)}}} ...

\displaystyle{\frac{{{\left({k}-{1}\right)}^{{2}}}}{{{\left({k}+{1}\right)}{\left({3}{k}-{1}\right)}}}} Explanation: \displaystyle{\frac{{{3}{k}^{{2}}-{2}{k}-{1}}}{{{3}{k}^{{2}}+{10}{k}+{7}}}}\div{\frac{{{9}{k}^{{2}}-{1}}}{{{3}{k}^{{2}}+{4}{k}-{7}}}} ...

Noah G Dec 21, 2016 Convert to a multiplication. \displaystyle=\frac{{{5}{n}^{{4}}+{40}{n}^{{3}}}}{{{n}^{{2}}-{19}{n}+{48}}}\cdot\frac{{{n}^{{2}}-{16}{n}}}{{{3}{n}^{{2}}+{15}{n}-{72}}} ...

Mic May 15, 2017 First get the reciprocal of \displaystyle\frac{{{r}+{9}}}{{{r}^{{2}}+{12}{r}+{27}}} and then multiply it to \displaystyle\frac{{{r}^{{2}}-{3}{r}-{18}}}{{{3}{r}^{{2}}-{18}{r}}} ...

\displaystyle\frac{{{7}{n}-{35}}}{{{7}{n}-{2}}} Explanation: Once, I simplified fractions separately, \displaystyle\frac{{{28}{n}^{{2}}-{175}}}{{{2}{n}^{{2}}-{7}{n}+{5}}} = \displaystyle\frac{{{7}\cdot{\left({4}{n}^{{2}}-{25}\right)}}}{{{2}{n}^{{2}}-{7}{n}+{5}}} ...

Given: \frac{S_m}{S_n}=\frac{m^2}{n^2} \Rightarrow \frac{\frac{2a_1+d(m-1)}{2}\cdot m}{\frac{2a_1+d(n-1)}{2}\cdot n}=\frac{m^2}{n^2} \Rightarrow \frac{2a_1+d(m-1)}{2a_1+d(n-1)}=\frac{m}{n} \Rightarrow\\ 2a_1n+dn(m-1)=2a_1m+dm(n-1) \Rightarrow \\ 2a_1(n-m)=d(n-m) \Rightarrow d=2a_1. ...