\displaystyle={9} Explanation: \displaystyle\sqrt{{3}}\cdot\sqrt{{27}} \displaystyle\sqrt{{27}} can be simplified by prime factorisation. (expressing a number as a product of its prime ...

Guilherme N. May 18, 2015 By expanding your roots and also adopting the exponential rule \displaystyle\sqrt{{{n}}}^{{2}}={n} \displaystyle{5}\sqrt{{{3}}}\cdot\sqrt{{{3}\cdot{8}}} ...

It’s neither. The radical sign denotes the principal square root. The principal square root of a positive number is the positive square root. The principal square root of a negative number is i ...

\displaystyle{12}\sqrt{{2}} Explanation: \displaystyle{2}\sqrt{{36}}\cdot\sqrt{{2}} We know that \displaystyle\sqrt{{36}}={6} . That means it becomes \displaystyle{2}\cdot{6}\cdot\sqrt{{2}} ...

\displaystyle{8}\sqrt{{6}} Explanation: \displaystyle{2}\sqrt{{3}}\cdot{4}\sqrt{{2}}={\left({2}\cdot{4}\right)}\cdot{\left(\sqrt{{3}}\cdot\sqrt{{2}}\right)} \displaystyle\sqrt{{a}}\cdot\sqrt{{b}}=\sqrt{{{a}\cdot{b}}} ...

Alan P. Apr 29, 2015 Note that \displaystyle\sqrt{{{a}}}\cdot\sqrt{{{b}}}=\sqrt{{{a}\cdot{b}}} \displaystyle{3}\sqrt{{{3}}}\cdot\sqrt{{{2}}} \displaystyle={\left({3}\cdot\sqrt{{{3}}}\right)}\cdot\sqrt{{{2}}} ...