The trick is to convert the expression inside the square root into a perfect square, so that the value can be calculated fast. Perfect squares are of the form (a+b)^2 = a^2+2ab+b^2 Taking a hint ...

\displaystyle={5}\sqrt{{3}} Explanation: \displaystyle{2}\sqrt{{12}}+\sqrt{{3}} \displaystyle\sqrt{{12}}=\sqrt{{{3}\cdot{4}}}=\sqrt{{{3}\cdot{2}\cdot{2}}}={\left({2}\sqrt{{3}}\right.} ...

\displaystyle-{5}\sqrt{{7}} Explanation: Recall that: \displaystyle\sqrt{{{m}{n}}}=\sqrt{{m}}\cdot\sqrt{{n}} Using this rule, we can rewrite your problem as: \displaystyle\sqrt{{7}}-{2}\cdot\sqrt{{{9}\cdot{7}}} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left({2}\cdot{4}\right)}{\left(\sqrt{{{10}}}\cdot\sqrt{{{15}}}\right)}\Rightarrow{8}{\left(\sqrt{{{10}}}\cdot\sqrt{{{15}}}\right)} ...

\displaystyle{5}\sqrt{{3}} Explanation: \displaystyle\sqrt{{12}}=\sqrt{{4}}\times\sqrt{{3}} = \displaystyle{2}\sqrt{{3}} So \displaystyle\sqrt{{12}}+{3}\sqrt{{3}}={2}\sqrt{{3}}+{3}\sqrt{{3}}={5}\sqrt{{3}}

George C. May 20, 2015 \displaystyle\sqrt{{{0.72}}}-\sqrt{{{0.50}}} \displaystyle=\sqrt{{\frac{{72}}{{100}}}}-\sqrt{{\frac{{50}}{{100}}}} \displaystyle=\frac{\sqrt{{{72}}}}{\sqrt{{{100}}}}-\frac{\sqrt{{{50}}}}{\sqrt{{{100}}}} ...