Take squares out of square roots. Explanation: Original expression: \displaystyle\frac{\sqrt{{{15}}}}{{{2}\sqrt{{{20}}}}} Using prime factorization for the values inside the square roots: \displaystyle=\frac{\sqrt{{{3}\cdot{5}}}}{{{2}\sqrt{{{2}^{{2}}\cdot{5}}}}} ...

\displaystyle\frac{{{5}\sqrt{{5}}+{5}\sqrt{{3}}}}{{{2}}} Explanation: we are given \displaystyle\frac{{5}}{{\sqrt{{3}}+\sqrt{{5}}}} , to rationalize this multiply both numerator and ...

\displaystyle\frac{\sqrt{{-{64}}}}{{-{\sqrt{{4}}}}}=-{4}{i} Explanation: \displaystyle{\left[{1}\right]}\ \text{ }\ \frac{\sqrt{{-{64}}}}{{-{\sqrt{{4}}}}} Factor out the numbers inside the ...

Gió Apr 12, 2015 You can multiply and divide by \displaystyle\sqrt{{{3}}}-\sqrt{{{2}}} to get: \displaystyle\frac{{2}}{{\sqrt{{{3}}}+\sqrt{{{2}}}}}\frac{{\sqrt{{{3}}}-\sqrt{{{2}}}}}{{\sqrt{{{3}}}-\sqrt{{{2}}}}}= ...

Kevin B. Apr 3, 2015 If by simplify, you mean, condense into a single term, the answer is: \displaystyle\frac{{{5}\sqrt{{{3}}}}}{{3}} \displaystyle\sqrt{{\frac{{1}}{{3}}}} can be ...

\displaystyle\sqrt{{3}}+\sqrt{{\frac{{1}}{{3}}}}=\frac{{4}}{\sqrt{{3}}} Explanation: \displaystyle\sqrt{{3}}+\sqrt{{\frac{{1}}{{3}}}} \displaystyle\sqrt{{3}}=\frac{{3}}{\sqrt{{3}}}= \displaystyle\sqrt{{\frac{{1}}{{3}}}}=\frac{{1}}{\sqrt{{3}}} ...