\displaystyle{2} Explanation: The expression is a notable product of this kind: \displaystyle{\left({a}+{b}\right)}{\left({a}-{b}\right)}={a}^{{2}}-{b}^{{2}} So \displaystyle{\left(\sqrt{{13}}+\sqrt{{11}}\right)}{\left(\sqrt{{13}}-\sqrt{{11}}\right)}={\left(\sqrt{{13}}\right)}^{{2}}-{\left(\sqrt{{11}}\right)}^{{2}}={13}-{11}={2}

\displaystyle{\left(\sqrt{{12}}-\sqrt{{2}}\right)}{\left(\sqrt{{12}}+\sqrt{{2}}\right)}={10} Explanation: To simplify \displaystyle{\left(\sqrt{{12}}-\sqrt{{2}}\right)}{\left(\sqrt{{12}}+\sqrt{{2}}\right)} ...

\displaystyle{10}\sqrt{{{13}}}-{6}\sqrt{{{11}}} Explanation: Note that both 11 and 13 are prime numbers. So the roots can not be simplified any further Set \displaystyle\sqrt{{{13}}}={a} ...

\displaystyle{\left(\sqrt{{{10}}}+\sqrt{{{13}}}\right)}{\left(\sqrt{{{10}}}-\sqrt{{{13}}}\right)}=-{3} Explanation: The two binomials in the expression are conjugates, as they have the form \displaystyle{\left({a}+{b}\right)}{\left({a}-{b}\right)} ...

\displaystyle={\left(\sqrt{{14}}-{5}\right.} Explanation: \displaystyle{\left({\left(\sqrt{{7}}-{2}\sqrt{{2}}\right)}\right)}.{\left(\sqrt{{7}}+{3}\sqrt{{2}}\right)} \displaystyle={\left(\sqrt{{7}}\right)}.{\left(\sqrt{{7}}+{3}\sqrt{{2}}\right)}-{\left({2}\sqrt{{2}}\right)}.{\left(\sqrt{{7}}+{3}\sqrt{{2}}\right)} ...

\displaystyle{5}\sqrt{{8}}-{4}\sqrt{{72}}+{3}\sqrt{{96}}={12}\sqrt{{6}}-{14}\sqrt{{2}} Explanation: \displaystyle{5}\sqrt{{8}}-{4}\sqrt{{72}}+{3}\sqrt{{96}} = \displaystyle{5}\sqrt{{\underline{{{2}\times{2}}}\times{2}}}-{4}\sqrt{{\underline{{{2}\times{2}}}\times{2}\times\underline{{{3}\times{3}}}}}+{3}\sqrt{{\underline{{{2}\times{2}\times{2}\times{2}}}\times{2}\times{3}}} ...