See a solution process below: Explanation: First, multiply the \displaystyle{x} terms within the parenthesis using this rule for exponents: \displaystyle{x}^{{{a}}}\times{x}^{{{b}}}={x}^{{{\left({a}\right)}+{\left({b}\right)}}} ...

smendyka Feb 26, 2017 We will use these three rules for exponents to simplify this expression: \displaystyle{a}={a}^{{{1}}} and \displaystyle{x}^{{{a}}}\times{x}^{{{b}}}={x}^{{{\left({a}\right)}+{\left({b}\right)}}} ...

See a solution process below: Explanation: First, we can use these rules for exponents to simplify the two terms in parenthesis: \displaystyle{a}={a}^{{{1}}} and \displaystyle{\left({x}^{{{a}}}\right)}^{{{b}}}={x}^{{{\left({a}\right)}\times{\left({b}\right)}}} ...

\displaystyle{72}{x}^{{9}} Explanation: using the \displaystyle\text{laws of exponents} \displaystyle{\left(\overline{{\underline{{{\left|{\left(\frac{{2}}{{2}}\right)}{\left({\left({a}^{{m}}{b}^{{n}}\right)}^{{p}}={a}^{{{m}{p}}}{b}^{{{n}{p}}}\ \text{ and }\ {a}^{{m}}\times{a}^{{n}}={a}^{{{m}+{n}}}\right)}{\left(\frac{{2}}{{2}}\right)}\right|}}}}}\right)} ...

\displaystyle{x}^{{{n}^{{2}}}} Explanation: Consider; \displaystyle\ \text{ }\ {\left({x}^{{n}}\right)}^{{{n}-{m}}}\ \text{ }\ this can be written as \displaystyle\ \text{ }\ \frac{{{\left({x}^{{n}}\right)}^{{n}}}}{{\left({x}^{{n}}\right)}^{{m}}} ...

Real solution: \displaystyle{x}=-\frac{{1}}{{6}} Complex solutions: \displaystyle{x}=-\frac{{1}}{{6}}+\frac{{{n}\pi}}{{{3}{\ln{{2}}}}}{i}\ \text{ }\ for any integer \displaystyle{n} ...