\displaystyle{8}{\sqrt[{3}]{{{25}}}} Explanation: If cube roots are being multiplied, then we can combine them into a single root. Write the numbers as the product of their prime factors so we ...

\displaystyle{7}\sqrt{{6}} Explanation: Break each number down into its prime factors first, Then combine the two roots into one and see where we go from there.... \displaystyle\sqrt{{{2}\times{7}}}\times\sqrt{{{3}\times{7}}}=\sqrt{{{2}\times{3}\times{7}\times{7}}} ...

\displaystyle{3}\times\sqrt{{8}}+\sqrt{{18}}={9}\sqrt{{2}} Explanation: \displaystyle{3}\times\sqrt{{8}}+\sqrt{{18}} Factor \displaystyle\sqrt{{8}} . \displaystyle\sqrt{{{2}\times{2}\times{2}}}= ...

Kushagra May 16, 2018 Well you can perceive it as \displaystyle{a}{b}+{a}{c} Where \displaystyle{a}=\sqrt{{3}} \displaystyle{b}={5} \displaystyle{c}={4} Factorize \displaystyle\sqrt{{3}}{\left({5}+{4}\right)} ...

3rd root 7 ×3rd root 49 = (7)^(1/3) × (49)^(1/3) = (7×49)^(1/3) = (7³)^(1/3) = 7

\displaystyle{9.536} Explanation: \displaystyle{3}\times\sqrt{{5}}+{2}\times\sqrt{{2}} \displaystyle{3}\sqrt{{5}}+{2}\sqrt{{2}} \displaystyle\sqrt{{5}}={2.236} \displaystyle\sqrt{{2}}={1.414} ...