\displaystyle{a}^{{5}}\times{b}^{{7}}\times{c} Explanation: \displaystyle\sqrt{{{a}^{{3}}\times{b}^{{2}}}}\times\sqrt{{{a}^{{2}}\times{b}^{{5}}\times{c}}} Solution \displaystyle\sqrt{{{a}^{{3}}\times{b}^{{2}}}}\times\sqrt{{{a}^{{2}}\times{b}^{{5}}\times{c}}} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left(-{3}\cdot{4}\right)}{\left(\sqrt{{{6}{p}^{{2}}}}\sqrt{{{12}{p}}}\right)}\Rightarrow \displaystyle-{12}\sqrt{{{6}{p}^{{2}}}}\sqrt{{{12}{p}}} ...

\displaystyle{100}\cdot{2}^{{{\frac{{{1}}}{{{4}}}}}}\cdot{a}^{{{\frac{{{7}}}{{{4}}}}}} Explanation: This is fairly easy to do if you remember this rule (definition): \displaystyle\sqrt{{{x}}}={x}^{{{\frac{{{1}}}{{{2}}}}}} ...

First of all, a few words about the arithmetic operations and about the equality. Let there be equality: x = 1 We can add or subtract from both sides any number and equality will remain true. And the ...

See a solution process below: Explanation: First, use this rule for radicals to rewrite the expression: \displaystyle\sqrt{{{\left({a}\right)}}}\cdot\sqrt{{{\left({b}\right)}}}=\sqrt{{{\left({a}\right)}\cdot{\left({b}\right)}}} ...

\displaystyle\sqrt{{{27}{b}}}\cdot\sqrt{{{3}{b}^{{2}}{L}}}={9}{b}\sqrt{{{b}{L}}} Explanation: As \displaystyle\sqrt{{a}}\cdot\sqrt{{b}}=\sqrt{{{a}\times{b}}} Therefore \displaystyle\sqrt{{{27}{b}}}\cdot\sqrt{{{3}{b}^{{2}}{L}}} ...