\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}}} ...

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}}} ...

See full explanation below: Explanation: First step we will take is to rewrite this expression in the form below: \displaystyle\frac{{\frac{{{64}{a}^{{2}}{b}^{{5}}}}{{{35}{b}^{{2}}{c}^{{3}}{f}^{{4}}}}}}{{\frac{{{12}{a}^{{4}}{b}^{{3}}{c}}}{{{70}{a}{b}{c}{f}^{{2}}}}}} ...

\displaystyle{b}={6} \displaystyle{a}={2} \displaystyle\frac{{{p}^{{{a}+{b}}}}}{{{q}^{{{a}-{b}}}}}=\frac{{{p}^{{{2}+{6}}}}}{{{q}^{{{2}-{6}}}}}=\frac{{{p}^{{{8}}}}}{{{q}^{{-{4}}}}} ...

\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}}} ...

\displaystyle\frac{{{p}-{7}}}{{{4}{p}+{3}}} Explanation: Let's begin by factorizing each quadratic trinomial. \displaystyle\Rightarrow{6}{p}^{{2}}+{p}−{12} \displaystyle={6}{p}^{{2}}+{9}{p}-{8}{p}−{12} ...