\displaystyle\frac{{4}}{{3}}{\left(\sqrt{{7}}+{2}\right)} Explanation: \displaystyle\frac{{4}}{{\sqrt{{7}}-{2}}} .To rationalize we should multiply both denominator and numerator by the ...

\displaystyle{3}{\left(\sqrt{{{5}}}+{1}\right)} Explanation: Use the identities \displaystyle\frac{{a}}{{a}}={1} for every non-zero \displaystyle{a} \displaystyle{\left({a}+{b}\right)}{\left({a}-{b}\right)}={a}^{{2}}-{b}^{{2}} ...

Gió Jun 4, 2015 First I`ll try to get rid of the square rrot on the denominator: \displaystyle\frac{{12}}{{\sqrt{{{7}}}+{2}}}\cdot\frac{{\sqrt{{{7}}}-{2}}}{{\sqrt{{{7}}}-{2}}}=\frac{{{12}{\left(\sqrt{{{7}}}-{2}\right)}}}{{{7}-{4}}}=\frac{{{12}{\left(\sqrt{{{7}}}-{2}\right)}}}{{3}}={4}{\left(\sqrt{{{7}}}-{2}\right)}

\displaystyle\frac{{{5}\sqrt{{15}}}}{{3}} Explanation: \displaystyle\text{to simplify we require the denominator to be rational} \displaystyle\text{that is remove the radical} \displaystyle•\ \text{ note that }\ \sqrt{{a}}\times\sqrt{{a}}={a} ...

\displaystyle\frac{\sqrt{{5}}}{{12}} Explanation: You just simplify \displaystyle\frac{{2}}{{24}} to get \displaystyle\frac{{1}}{{12}} . I hope it's clear.

\displaystyle\frac{{{1}-{3}{i}}}{\sqrt{{{1}+{3}{i}}}} \displaystyle={\left(-{2}\sqrt{{\frac{{\sqrt{{{10}}}+{1}}}{{2}}}}+\frac{{3}}{{2}}\sqrt{{\frac{{\sqrt{{{10}}}-{1}}}{{2}}}}\right)}-{\left({2}\sqrt{{\frac{{\sqrt{{{10}}}-{1}}}{{2}}}}+\frac{{3}}{{2}}\sqrt{{\frac{{\sqrt{{{10}}}+{1}}}{{2}}}}\right)}{i} ...