I think you're asking for rationalizing? Answer: \displaystyle-{12}+{11}\sqrt{{{2}}}-{2}\sqrt{{{6}}} Explanation: You rationalize it by multiply both numerator and denominator with its ...

Corrected answer: {{\left(3^{{{9}\over{4}}}+5\,3^{{{3}\over{2}}}+25\,3^{{{3}\over{4}} }+125\right)\,5^{{{2}\over{3}}}+\left(3^{{{5}\over{2}}}+5\,3^{{{7}\over{4}}}+125\,3^{{{1}\over{4}}}+75\right)\,5^{{{1}\over{3}}}+3^{{{11}\over{4}}}+25\,3^{{{5}\over{4}}}+125\,3^{{{1}\over{2}}}+45 }\over{598}} ...

Please see below. Explanation: We know that , \displaystyle{\left({\left({1}\right)}{a}^{{2}}-{b}^{{2}}={\left({a}-{b}\right)}{\left({a}+{b}\right)}\right.} Let , \displaystyle{X}=\frac{{{3}+\sqrt{{2}}}}{{{5}+\sqrt{{8}}}} ...

\displaystyle\frac{{6}}{{\sqrt{{4}}-\sqrt{{14}}}}=-\frac{{3}}{{5}}{\left(\sqrt{{4}}+\sqrt{{14}}\right)} Explanation: To rationalise a surd, we multiply the denominator and numerator by its ...

Elvan Burcu K. Apr 9, 2015 \displaystyle\frac{{{9}\sqrt{{8}}}}{{{12}\sqrt{{16}}}} = \displaystyle\frac{{{3}.{3}.\sqrt{{2}}.\sqrt{{4}}}}{{{3}.{2}.{2}.\sqrt{{16}}}} = \displaystyle\frac{{\cancel{{3}}.{3}.\sqrt{{2}}.\cancel{{2}}}}{{\cancel{{3}}.\cancel{{2}}.{2}.{4}}} ...

\displaystyle\frac{{-{16}+{4}}}{{{2}\sqrt{{{13}-{4}}}}}=-{2} Explanation: \displaystyle\frac{{-{16}+{4}}}{{{2}\sqrt{{{13}-{4}}}}} \displaystyle=\frac{{{4}-{16}}}{{{2}\sqrt{{{9}}}}} \displaystyle=\frac{{-{12}}}{{{2}\ast{3}}} ...