\displaystyle-{8}{\left(\sqrt{{{5}}}+\sqrt{{{7}}}\right)} Explanation: To simplify this expression, you have to rationalize the denominator by using its conjugate expression. For a binomial, ...

\displaystyle\frac{{{\sqrt[{5}]{{{12}}}}}}{{{4}{\sqrt[{5}]{{-{4}}}}}}={\left(-\frac{{\sqrt[{5}]{{{3}}}}}{{4}}\right)} Explanation: \displaystyle\frac{{\sqrt[{5}]{{{12}}}}}{{{4}{\sqrt[{5}]{{-{4}}}}}} ...

I found: \displaystyle\sqrt{{{3}}} Explanation: We can write it as: \displaystyle\sqrt{{\frac{{{12}^{{2}}}}{{3}}}}-\sqrt{{{3}\cdot{9}}}=\sqrt{{{4}\cdot{12}}}-{3}\sqrt{{{3}}}={2}\sqrt{{{12}}}-{3}\sqrt{{{3}}}= ...

\displaystyle{\left(\Rightarrow\frac{{11}}{{4}}-\frac{{{5}\sqrt{{5}}}}{{4}}\right.} Explanation: \displaystyle\frac{{{2}-\sqrt{{5}}}}{{{3}+\sqrt{{5}}}} \displaystyle\Rightarrow\frac{{{\left({2}-\sqrt{{5}}\right)}\cdot{\left({3}-\sqrt{{5}}\right)}}}{{{\left({3}+\sqrt{{5}}\right)}{\left({3}-\sqrt{{5}}\right)}}} ...

Konstantinos Michailidis Feb 27, 2016 Multiply the denominator with \displaystyle\sqrt{{3}}-\sqrt{{2}} to get \displaystyle\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{\left(\sqrt{{3}}+\sqrt{{2}}\right)}\cdot{\left(\sqrt{{3}}-\sqrt{{2}}\right)}}}=\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{\left(\sqrt{{3}}\right)}^{{2}}-{\left(\sqrt{{2}}\right)}^{{2}}}}=\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{1}}}=\sqrt{{3}}-\sqrt{{2}}

\displaystyle\frac{{1}}{{\sqrt{{2}}+\sqrt{{7}}}}=\frac{{\sqrt{{7}}-\sqrt{{2}}}}{{5}} Explanation: We simplify \displaystyle\frac{{1}}{{\sqrt{{2}}+\sqrt{{7}}}} by rationalizing the ...