\displaystyle\frac{{p}^{{2}}}{{{4}{a}}} Explanation: Dividing fractions is the same as multiplying by the reciprocal. This allows us to rewrite our expression as \displaystyle\frac{{{5}{m}^{{4}}{p}}}{{{12}{a}^{{2}}}}\cdot\frac{{{18}{a}{p}}}{{{30}{m}^{{4}}}} ...

\displaystyle{3}{m}^{{2}}-{18}{m}+{24} Explanation: Let's factorise everything we've got: \displaystyle\frac{{{3}{m}^{{2}}-{12}{m}}}{{1}}\div\frac{{{m}^{{2}}-{4}{m}}}{{{m}^{{2}}-{6}{m}+{8}}} ...

Mauricio M. Mar 10, 2018 \displaystyle=\frac{{\frac{{{s}^{{2}}-{3}{s}}}{{{s}^{{2}}-{s}-{6}}}}}{{\frac{{{s}-{6}}}{{{s}+{2}}}}} \displaystyle=\frac{{{\left({s}^{{2}}-{3}{s}\right)}{\left({s}+{2}\right)}}}{{{\left({s}^{{2}}-{s}-{6}\right)}{\left({s}-{6}\right)}}} ...

Don't Memorise May 8, 2015 we are given : \displaystyle\frac{{{m}+{3}}}{{{4}{m}}} / \displaystyle\frac{{{m}^{{2}}-{9}}}{{{32}{m}^{{2}}{\left({m}-{3}\right)}}} for multiplying we ...

\displaystyle{m} Explanation: We have the problem: \displaystyle\frac{{m}^{{2}}}{{{m}-{2}}}\div\frac{{{m}^{{2}}-{3}{m}}}{{{m}^{{2}}-{5}{m}+{6}}} 1) Reciprocate the second term, and change ...

\displaystyle\frac{{1}}{{{4}{a}+{8}}} where \displaystyle{a}\ne{4},-{2},{\quad\text{or}\quad}{5} Explanation: \displaystyle\frac{{{a}-{4}}}{{{\left({a}^{{2}}-{2}{a}-{8}\right)}}}\div\frac{{{\left({4}{a}-{20}\right)}}}{{{a}-{5}}} ...