See the entire simplification process below: Explanation: First use this rule of exponents to simplify the denominator: \displaystyle{a}^{{{0}}}={1} \displaystyle\frac{{c}^{{-{{1}}}}}{{{c}^{{{0}}}\cdot{c}^{{{0}}}\cdot{c}^{{{0}}}}}=\frac{{c}^{{-{{1}}}}}{{{1}\cdot{1}\cdot{1}}}=\frac{{c}^{{-{{1}}}}}{{1}}={c}^{{-{{1}}}} ...

\displaystyle\frac{{64}}{{{a}^{{3}}{b}^{{9}}}} Explanation: \displaystyle{2}{a}\cdot{2}{a}{b}^{{2}}={4}{a}^{{3}}{b}^{{2}} (To multiply two numbers with indices, add the powers) Take away \displaystyle{b}^{{2}} ...

\displaystyle-{4}{a}^{{4}}{b}^{{9}} Explanation: \displaystyle\frac{{{2}{b}{a}^{{4}}\cdot{\left(-{2}{a}{b}^{{4}}\right)}^{{2}}}}{{-{2}{a}^{{2}}}} First, we square the factor in ...

See a solution process below: Explanation: First, rewrite this expression as: \displaystyle\frac{{{6}\cdot{8}}}{{{4}\cdot{9}}}\cdot\frac{{{b}\cdot{b}^{{4}}}}{{{b}^{{2}}\cdot{b}^{{5}}}} Next, ...

\displaystyle{\frac{{{2}}}{{{3}{a}{b}^{{4}}}}} Explanation: Step 1 Identify like terms. Exponentials with the same base are considered like terms. \displaystyle\frac{{\ {\left({a}\right)}\ {\left({b}\right)}^{{-{4}}}\cdot\ {\left({2}\right)}\ {\left({b}\right)}}}{{\ {\left({3}\right)}\ {\left({b}\right)}\ {\left({a}\right)}^{{2}}}} ...

Please see below. Explanation: . \displaystyle\frac{{\left({c}^{{4}}\right)}^{{3}}}{{4}}\cdot\frac{{{12}{d}^{{-{6}}}}}{{\left({15}{c}{d}\right)}^{{-{1}}}}=\frac{{{\left({12}{c}^{{12}}\right)}{\left({15}{c}{d}\right)}}}{{{4}{d}^{{6}}}}=\frac{{{45}{c}^{{13}}{d}}}{{d}^{{6}}}=\frac{{{45}{c}^{{13}}}}{{d}^{{5}}}