Don't Memorise May 14, 2015 To rationalise a numerical expression, the irrational denominator needs to be made rational. Here the denominator is 3, which is already RATIONAL. It cannot be ...

Jim H Apr 22, 2015 To keep the numbers smaller, try to reduce first. Both \displaystyle{55} and \displaystyle{10} are divisible by \displaystyle{5} . Use that to write: \displaystyle\frac{\sqrt{{55}}}{\sqrt{{10}}}=\frac{{\sqrt{{5}}\sqrt{{11}}}}{{\sqrt{{5}}\sqrt{{2}}}}=\frac{\sqrt{{11}}}{\sqrt{{2}}} ...

\displaystyle\frac{{{2}\sqrt{{{5}}}}}{{5}} Explanation: Your starting expression is \displaystyle\frac{{4}}{{\sqrt{{{5}}}+\sqrt{{{5}}}}} Notice that you can combine the two radical terms ...

\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 ...

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}}

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}}}}}= ...