\displaystyle{10}{i}\sqrt{{2}} Explanation: \displaystyle\sqrt{{-{200}}} \displaystyle=\sqrt{{{\left(-{1}\right)}\times{\left({200}\right)}}} \displaystyle=\sqrt{-}{1}\sqrt{{200}} ...

\displaystyle{2}{i}\sqrt{{6}} Explanation: \displaystyle\sqrt{{-{24}}} \displaystyle=\sqrt{{-{1}\cdot{24}}} We know that \displaystyle{i}=\sqrt{{-{1}}} , so: \displaystyle{i}\cdot\sqrt{{24}} ...

\displaystyle-{21}{i},-{9}{i},{9}{i}{\quad\text{and}\quad}{21}{i} or, in brief, the sum = \displaystyle{\left(\pm{6}\pm{15}\right)}{i} , where i = \displaystyle\sqrt{{-{1}}} ...

Konstantinos Michailidis May 22, 2016 It is \displaystyle{3}\sqrt{{-{27}}}={3}\cdot\sqrt{{{i}^{{2}}\cdot{3}\cdot{3}^{{2}}}}={9}\cdot{i}\cdot\sqrt{{3}} Where \displaystyle{i} is ...

Hint: The key is using the Euclidean function. Like many subrings of the complex plane, we have Euclidean function you give, \phi, such that \phi(a+bi) = a^2+b^2. We know that \phi is ...

\displaystyle{2}-{7}\sqrt{{{5}}}{i} Explanation: Start by factoring the value inside the radical. You need to find some factors that have exact roots. \displaystyle-{245}={5}\times{49}\times-{1} ...