\displaystyle{3}\frac{{1}}{{2}} Explanation: \displaystyle\sqrt{{{5}\frac{{1}}{{16}}\cdot{2}\frac{{34}}{{81}}}}=\sqrt{{\frac{\cancel{{81}}}{{16}}\cdot\frac{{196}}{\cancel{{81}}}}}=\sqrt{{\frac{{14}^{{2}}}{{4}^{{2}}}}}=\frac{{14}}{{4}}=\frac{{7}}{{2}}={3}\frac{{1}}{{2}} ...

hev1 Apr 6, 2018 \displaystyle{4}\sqrt{{{2}}}{\left(\frac{{3}}{{16}}\right)}\cdot{1}{\left(\frac{{2}}{{5}}\right)} \displaystyle=\frac{{{4}\sqrt{{{2}}}\cdot{3}}}{{16}}\cdot\frac{{2}}{{5}} ...

Alan P. Apr 22, 2015 \displaystyle{\left(\sqrt{{\frac{{21}}{{7}}}}\right)}\cdot{\left(\sqrt{{\frac{{21}}{{32}}}}\right)} \displaystyle=\sqrt{{{3}}}\cdot\frac{{\sqrt{{{3}}}\cdot\sqrt{{{7}}}}}{{{4}\sqrt{{{2}}}}} ...

Konstantinos Michailidis Sep 13, 2015 It is \displaystyle\sqrt{{\frac{{32}}{{3}}}}\cdot\sqrt{{\frac{{6}}{{50}}}}=\sqrt{{\frac{{{32}\cdot{6}}}{{{3}\cdot{50}}}}}=\sqrt{{\frac{{{2}^{{5}}}}{{{2}\cdot{3}\cdot{5}^{{2}}}}}}=\frac{{4}}{{{5}\cdot\sqrt{{3}}}}

\displaystyle{i}\frac{\sqrt{{{3}}}}{{3}}{\left(\sqrt{{{2}}}+{4}\right)} Explanation: Simplify: \displaystyle{2}\cdot\sqrt{{-\frac{{1}}{{6}}}}+\sqrt{{-\frac{{4}}{{3}}}} \displaystyle{2}\cdot{i}\sqrt{{\frac{{1}}{{6}}}}+{i}\sqrt{{\frac{{4}}{{3}}}} ...

\displaystyle\sqrt{{\frac{{3}}{{16}}}}\cdot\sqrt{{\frac{{9}}{{5}}}}=\frac{{{3}\sqrt{{{15}}}}}{{20}} Explanation: Note that if \displaystyle{a},{b}\ge{0} then: \displaystyle\sqrt{{{a}{b}}}=\sqrt{{{a}}}\sqrt{{{b}}} ...