\displaystyle-{4}\sqrt{{{10}}}+{6}\sqrt{{{4}}}={8}\sqrt{{{10}}} Explanation: \displaystyle\sqrt{{{40}}}=\sqrt{{{4}}}\cdot\sqrt{{{10}}}={2}\sqrt{{{10}}} So \displaystyle{6}\sqrt{{{40}}}={6}\cdot{2}\sqrt{{{10}}}={12}\sqrt{{{10}}} ...

\displaystyle{10}\sqrt{{3}}+{3}\sqrt{{2}} You must distribute the \displaystyle\sqrt{{6}} Explanation: Radicals can be multiplied, no matter the value under the sign. Multiply \displaystyle\sqrt{{6}}\cdot\sqrt{{3}} ...

\displaystyle\sqrt{{{150}}}+\sqrt{{{40}}}=\sqrt{{{2}}}{\left({5}\sqrt{{{3}}}+{2}\sqrt{{{5}}}\right)}=\sqrt{{{10}{\left({19}+{4}\sqrt{{{15}}}\right)}}} Explanation: Hmm. Not sure if this is what ...

\displaystyle\sqrt{{{252}}}-{2}\sqrt{{{6}}}+{2}\sqrt{{{42}}}-{4} Explanation: We have \displaystyle{\left(\sqrt{{{6}}}+{2}\right)}{\left(\sqrt{{{42}}}-{2}\right)} . We can write this as: \displaystyle\sqrt{{{6}}}{\left(\sqrt{{{42}}}-{2}\right)}+{2}{\left(\sqrt{{{42}}}-{2}\right)} ...

\displaystyle-{15} Explanation: \displaystyle{\left(\sqrt{{10}}+{5}\right)}{\left(\sqrt{{10}}-{5}\right)} FOIL \displaystyle\sqrt{{10}}\cdot\sqrt{{10}}-{5}\sqrt{{10}}+{5}\sqrt{{10}}-{25} ...

\displaystyle{12}\sqrt{{5}} Explanation: In most questions involving powers and roots, a good strategy is to break numbers down into their prime factors. This tells us what we are working with. ...