\displaystyle=\sqrt{{63}}{\quad\text{or}\quad}{\left({3}\sqrt{{7}}\right.} Explanation: \displaystyle\sqrt{{{21}}}.\sqrt{{3}} \displaystyle=\sqrt{{{\left({21}\right)}{.3}}} \displaystyle=\sqrt{{{\left({3.7}\right)}{.3}}} ...

\displaystyle\sqrt{{6}} Explanation: \displaystyle\sqrt{{{a}}}\cdot\sqrt{{{b}}}=\sqrt{{{a}\cdot{b}}}, so \displaystyle\sqrt{{{2}}}\cdot\sqrt{{{3}}}=\sqrt{{{3}\cdot{2}}}=\sqrt{{{6}}}

Tom Feb 26, 2016 \displaystyle\sqrt{{{2}}}\cdot\sqrt{{{10}}}=\sqrt{{{2}}}\cdot\sqrt{{{2}}}\cdot\sqrt{{{5}}}={2}\sqrt{{{5}}} with the rule \displaystyle\sqrt{{{a}{b}}}=\sqrt{{{a}}}\cdot\sqrt{{{b}}}

\displaystyle\sqrt{{{10}}} Explanation: Recall that \displaystyle\sqrt{{{a}}}\cdot\sqrt{{{b}}}=\sqrt{{{a}\cdot{b}}} Thus, \displaystyle\sqrt{{{2}}}\cdot\sqrt{{{5}}}=\sqrt{{{2}\cdot{5}}}=\sqrt{{{10}}}

\displaystyle{2}\sqrt{{{3}}} Explanation: Write as \displaystyle\sqrt{{{2}}}\times\sqrt{{{2}\times{3}}} Combining the roots \displaystyle\sqrt{{{2}\times{2}\times{3}}}\to\sqrt{{{2}^{{2}}\times{3}}} ...

Gió Apr 30, 2015 Consider that: \displaystyle\sqrt{{{16}}}={4} \displaystyle\sqrt{{{24}}}=\sqrt{{{6}\cdot{4}}}={2}\sqrt{{{6}}} And \displaystyle\sqrt{{{a}}}\cdot\sqrt{{{b}}}=\sqrt{{{a}\cdot{b}}} ...