See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left({\left({2}\cdot{3}\right)}{\left({y}^{{2}}\cdot{y}^{{3}}\cdot{y}\right)}\right)}^{{3}}\Rightarrow ...

I got: \displaystyle{y}^{{{5}{a}+{4}}} Explanation: Remember that you have: \displaystyle{y}^{{a}}\cdot{y}^{{b}}={y}^{{{a}+{b}}} for example if you have: \displaystyle{2}^{{2}}\cdot{2}^{{3}}={2}^{{{2}+{3}}}={2}^{{5}}={32} ...

See a solution process below: Explanation: Use this rule of exponents to simplify the expression: \displaystyle{x}^{{{a}}}\times{x}^{{{b}}}={x}^{{{\left({a}\right)}+{\left({b}\right)}}} \displaystyle{y}^{{-{1}}}\cdot{y}^{{{20}}}\cdot{y}^{{{39}}}\Rightarrow{y}^{{{\left(-{1}\right)}+{\left({20}\right)}+{y}^{{{39}}}}}\Rightarrow{y}^{{{\left(-{1}\right)}+{59}}}\Rightarrow{y}^{{58}}

the answer is \displaystyle{y}^{{-{{15}}}} Explanation: on using basic exponential formulae we can write the given question as \displaystyle{y}^{{{6}+{9}}}={y}^{{15}} and \displaystyle{y}^{{-{6}-{4}}}={y}^{{-{{10}}}} ...

\displaystyle{8}{w}^{{8}}{y}^{{8}}\cdot{2}{y}^{{6}}\cdot{3}{w}={\left({48}{w}^{{9}}{y}^{{14}}\right.} Explanation: \displaystyle{8}{w}^{{8}}{y}^{{8}}\cdot{2}{y}^{{6}}\cdot{3}{w} Take out ...

\displaystyle={12}{w}^{{5}}{y}^{{6}} Explanation: \displaystyle{2}{w}^{{4}}{y}^{{3}}{\left({2}{y}^{{3}}\right)}{3}{w} \displaystyle{2}\times{2}\times{3}\times{w}^{{4}}{w}\times{y}^{{3}}{y}^{{3}} ...