See a solution process below: Explanation: First, rewrite the \displaystyle{4} term as: \displaystyle{4}^{{{2}\times\frac{{1}}{{3}}}}\cdot{a}^{{\frac{{1}}{{3}}}} Next, use this rule of ...

\displaystyle{5}^{{\frac{{2}}{{3}}}}\cdot{5}^{{\frac{{4}}{{3}}}} can be simplified to \displaystyle{25} . Explanation: By exponent laws, \displaystyle{x}^{{a}}\cdot{x}^{{b}}={x}^{{{a}+{b}}} ...

\displaystyle{5}{n} Explanation: \displaystyle\frac{{{10}{n}^{{2}}}}{{4}}\times\frac{{2}}{{n}}=\frac{{{20}{n}^{{2}}}}{{{4}{n}}}=\frac{{\cancel{{{\left({4}{n}\right)}}}{5}{n}}}{\cancel{{{4}{n}}}}={5}{n}

See the entire solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left(\frac{{6}}{{3}}\right)}{\left(\frac{{c}^{{7}}}{{{c}\cdot{c}^{{2}}}}\right)}={2}{\left(\frac{{c}^{{7}}}{{{c}\cdot{c}^{{2}}}}\right)} ...

\displaystyle{15}{a}^{{4}}{c} Explanation: Simplify the like terms as follows: \displaystyle\frac{{{20}{a}^{{2}}{c}}}{{3}}\times\frac{{{9}{a}^{{2}}}}{{4}} \displaystyle{5}{a}^{{2}}{c}\times{3}{a}^{{2}} ...

Elvan Burcu K. May 28, 2015 \displaystyle{3}^{{\frac{{1}}{{2}}}}\cdot{3}^{{\frac{{2}}{{3}}}}={3}^{{{\left(\frac{{1}}{{2}}+\frac{{2}}{{3}}\right)}}}={3}^{{\frac{{7}}{{6}}}}