\displaystyle{45} Explanation: separate the integers from the radicals. \displaystyle\Rightarrow{\left({3}\right)}\times{\left(\sqrt{{5}}\right)}\times{\left({3}\right)}\times{\left(\sqrt{{5}}\right)} ...

Don't Memorise May 15, 2015 \displaystyle{\left(\sqrt{{a}}\cdot\sqrt{{b}}=\sqrt{{{a}{b}}}\right.} Hence \displaystyle\sqrt{{6}}\cdot\sqrt{{2}}=\sqrt{{{6}\times{2}}}={\left(\sqrt{{{12}}}\right.} ...

\displaystyle{15}\sqrt{{15}} Explanation: You are allowed to multiply the radical numbers since they have the same index. \displaystyle{5}\sqrt{{5}}\cdot{3}\sqrt{{3}} \displaystyle={\left({5}\cdot{3}\right)}\sqrt{{{5}\cdot{3}}} ...

\displaystyle\sqrt{{-{6}}}\cdot\sqrt{{-{2}}}=-{2}\sqrt{{{3}}} Explanation: Be a little careful! \displaystyle\sqrt{{-{6}}}\cdot\sqrt{{-{2}}}={\left(\sqrt{{{6}}}{i}\right)}\cdot{\left(\sqrt{{{2}}}{i}\right)} ...

\displaystyle{15}\sqrt{{3}} Explanation: \displaystyle\sqrt{{15}}\times{3}\sqrt{{5}}={3}\sqrt{{75}} \displaystyle{3}\sqrt{{{25}\times{3}}}={15}\sqrt{{3}}

\displaystyle{3}\sqrt{{{10}}} Explanation: \displaystyle{6}={3}\times{2} \displaystyle{15}={3}\times{5} So we have: \displaystyle\sqrt{{{3}\times{2}}}\times\sqrt{{{3}\times{5}}} ...