\displaystyle{5}\sqrt{{5}} Explanation: \displaystyle\sqrt{{80}}+\sqrt{{45}}-\sqrt{{20}} Simplify: \displaystyle\sqrt{{{16}\cdot{5}}}+\sqrt{{{9}\cdot{5}}}-\sqrt{{{4}\cdot{5}}} \displaystyle\sqrt{{16}}\cdot\sqrt{{5}}+\sqrt{{9}}\cdot\sqrt{{5}}-\sqrt{{4}}\cdot\sqrt{{5}} ...

\displaystyle={9}\sqrt{{2}}+{2}\sqrt{{{6}}} Explanation: \displaystyle{3}\sqrt{{50}}+\sqrt{{24}}-{2}\sqrt{{18}} \displaystyle={3}\sqrt{{{2}\cdot{5}^{{2}}}}+\sqrt{{{6}\cdot{2}^{{2}}}}-{2}\sqrt{{{2}\cdot{3}^{{2}}}} ...

See a solution process below: Explanation: To multiply these two terms you multiply each individual term in the left parenthesis by each individual term in the right parenthesis. \displaystyle{\left({\left(\sqrt{{{2}}}\right)}-{\left(\sqrt{{{17}}}\right)}\right)}{\left({\left(\sqrt{{{15}}}\right)}-{\left(\sqrt{{{7}}}\right)}\right)} ...

\displaystyle{8}+{2}\sqrt{{3}}-{5}\sqrt{{5}}={15.716} Explanation: \displaystyle\sqrt{{20}}+\sqrt{{64}}-\sqrt{{125}} = \displaystyle\sqrt{{{2}\times{2}\times{5}}}+\sqrt{{{2}\times{2}\times{2}\times{2}\times{2}\times{2}}}-\sqrt{{{5}\times{5}\times{5}}} ...

\displaystyle{\left(\sqrt{{12}}-\sqrt{{2}}\right)}{\left(\sqrt{{12}}+\sqrt{{2}}\right)}={10} Explanation: To simplify \displaystyle{\left(\sqrt{{12}}-\sqrt{{2}}\right)}{\left(\sqrt{{12}}+\sqrt{{2}}\right)} ...

The answer is \displaystyle{24}\sqrt{{{5}}} . Explanation: Note: when the variables a, b, and c are used, I am referring to a general rule that will work for every real value of a, b, or c. You ...