\displaystyle{12}\sqrt{{{2}}} Explanation: We'll just simplify each square root individually to start out: \displaystyle\sqrt{{{72}}}={3}\sqrt{{{8}}}={6}\sqrt{{{2}}} \displaystyle\sqrt{{{8}}}={2}\sqrt{{{2}}} ...

See a solution process below: Explanation: First, expand the terms in parenthesis by multiplying each term within the parenthesis by the term outside the parenthesis: \displaystyle{\left(\sqrt{{{11}}}\right)}{\left(\sqrt{{{6}}}-\sqrt{{{7}}}\right)}\Rightarrow ...

See a solution process below: Explanation: First, square each side of the equation to eliminate the radicals while keeping the equation balanced: \displaystyle{\left(\sqrt{{{12}{t}-{5}}}\right)}^{{2}}={\left(\sqrt{{{9}{t}+{14}}}\right)}^{{2}} ...

\displaystyle{\left({5}\sqrt{{2}}+{2}\sqrt{{3}}\right.} Explanation: \displaystyle\sqrt{{8}}+\sqrt{{12}}+\sqrt{{18}} \displaystyle\therefore=\sqrt{{{2}\cdot{2}\cdot{2}}}+\sqrt{{{2}\cdot{2}\cdot{3}}}+\sqrt{{{2}\cdot{3}\cdot{3}}} ...

\displaystyle-{12}+{8}\sqrt{{3}} Explanation: We can distribute the \displaystyle-\sqrt{{6}} to both terms on the parenthesis. Doing this, we get \displaystyle-{2}\sqrt{{{6}\cdot{6}}}+{4}\sqrt{{{2}\cdot{6}}} ...

\displaystyle\sqrt{{{50}}}+\sqrt{{{32}}}-\sqrt{{{8}}}={\left({7}\sqrt{{2}}\right.} Explanation: Simplify: \displaystyle\sqrt{{{50}}}+\sqrt{{{32}}}-\sqrt{{{8}}} Terms with square roots can ...