Factoring! After I did that, I ended up with \displaystyle\frac{{1}}{{{r}^{{2}}-{6}{r}+{5}}} Explanation: \displaystyle\frac{{{r}+{9}}}{{{r}^{{2}}-{8}{r}+{15}}}\div\frac{{{r}^{{2}}+{8}{r}-{9}}}{{{r}-{3}}} ...

\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}}} ...

\displaystyle\frac{{1}}{{v}^{{2}}} Explanation: The first step is to factorise as far as possible: \displaystyle\frac{{{2}{v}+{5}}}{{{v}^{{2}}{\left({4}{v}^{{2}}-{1}\right)}}}\div\frac{{{\left({2}{v}+{5}\right)}}}{{{\left({2}{v}+{1}\right)}{\left({2}{v}-{1}\right)}}} ...

\displaystyle\frac{{{a}+{3}}}{{\left({a}-{3}\right)}^{{2}}} Explanation: (1) Using the rules of fractions, turn the second upside down ad change to multiply. \displaystyle\frac{{{a}+{3}}}{{{a}^{{2}}+{a}-{12}}}\times\frac{{{a}^{{2}}+{7}{a}+{12}}}{{{a}^{{2}}-{9}}} ...

\displaystyle\frac{{\frac{{{2}{p}^{{3}}{q}^{{2}}}}{{{8}{p}^{{4}}{q}}}}}{{\frac{{{4}{p}{q}^{{2}}}}{{{16}{p}^{{4}}}}}}=\frac{{p}^{{2}}}{{q}} Explanation: We start off with what's given: \displaystyle\frac{{\frac{{{2}{p}^{{3}}{q}^{{2}}}}{{{8}{p}^{{4}}{q}}}}}{{\frac{{{4}{p}{q}^{{2}}}}{{{16}{p}^{{4}}}}}} ...

\displaystyle\frac{{{a}^{{2}}+{3}{a}}}{{{4}{a}^{{2}}+{24}{a}+{32}}} Explanation: \displaystyle\frac{{{a}^{{2}}+{3}{a}}}{{{4}{a}^{{2}}-{16}}} / \displaystyle\frac{{{a}^{{2}}-{16}}}{{{a}^{{2}}-{6}{a}+{8}}} ...