See the entire simplification process below: Explanation: First, apply this rule for exponents: \displaystyle{\left({x}^{{{a}}}\right)}^{{{b}}}={x}^{{{\left({a}\right)}\times{\left({b}\right)}}} ...

\displaystyle{a}^{{19}} Explanation: We know \displaystyle{a}^{{-{{1}}}}=\frac{{1}}{{a}}.{T}{h}{e}{n}\frac{{1}}{{a}^{{-{{1}}}}}={a}^{{1}} Hence \displaystyle\frac{{{a}^{{7}}.{a}^{{6}}}}{{a}^{{-{{6}}}}}={a}^{{7}}.{a}^{{6}}.{a}^{{6}} ...

First: addition inside the bracket. Third: multiplication Fifth: addition Explanation: We follow the Order of Operations, also known as PEMDAS: \displaystyle{\left({P}\right)} - Parentheses ...

\displaystyle{b}^{{2}} Explanation: \displaystyle\frac{{{b}^{{3}}\cdot{b}^{{-{{3}}}}}}{{b}^{{-{{2}}}}} \displaystyle=\frac{{{b}^{{{3}-{3}}}}}{{b}^{{-{{2}}}}} \displaystyle=\frac{{b}^{{0}}}{{b}^{{-{{2}}}}} ...

I found: \displaystyle{\sqrt[{4}]{{{8}}}} Explanation: You can use the following facts: \displaystyle{x}^{{a}}\cdot{x}^{{b}}={x}^{{{a}+{b}}} \displaystyle{\left({x}^{{a}}\right)}^{{b}}={x}^{{{a}\cdot{b}}} ...

See a solution process below: Explanation: First, use this rule of exponents to eliminate the negative exponent in the numberator: \displaystyle{x}^{{{a}}}=\frac{{1}}{{x}^{{-{a}}}} \displaystyle\frac{{2}^{{-{1}}}}{{{2}^{{3}}\cdot{\left({2}^{{2}}\right)}^{{-{{4}}}}}}\Rightarrow\frac{{1}}{{{2}^{{--{1}}}\cdot{2}^{{3}}\cdot{\left({2}^{{2}}\right)}^{{-{{4}}}}}}\Rightarrow\frac{{1}}{{{2}^{{{1}}}\cdot{2}^{{3}}\cdot{\left({2}^{{2}}\right)}^{{-{{4}}}}}} ...