Solution is \displaystyle-\frac{{5}}{{3}}+{\left(\frac{{2}}{{3}}\right)}{i} Explanation: To solve \displaystyle\frac{{−{2}−{5}{i}}}{{{3}{i}}} multiply numerator and denominator by \displaystyle{i} ...

\displaystyle{x}=\sqrt{{3}} \displaystyle{y}={1} Explanation: \displaystyle{x}={r}{\cos{\theta}}={\left(-{2}\right)}{\cos{{\left({\frac{{-{5}\pi}}{{{6}}}}\right)}}}=\sqrt{{3}} \displaystyle{y}={r}{\sin{\theta}}={\left(-{2}\right)}{\sin{{\left({\frac{{-{5}\pi}}{{{6}}}}\right)}}}={1}

\displaystyle-\frac{{43}}{{82}}-\frac{{23}}{{82}}{i} Explanation: Dividing complex numbers is actually simpler than it seems. We don't start by dividing, rather we multiply the top and the ...

\displaystyle\frac{{2}}{{5}}+\frac{{1}}{{5}}{i} Explanation: To simplify the fraction we require to have a rational denominator. This is achieved by multiplying the numerator/denominator by the ...

\displaystyle{\left(\Rightarrow{0.8028}{\left({0.7475}-{i}{0.6643}\right)}\right.} Explanation: \displaystyle\frac{{z}_{{1}}}{{z}_{{2}}}={\left(\frac{{r}_{{1}}}{{r}_{{2}}}\right)}{\left({\cos{{\left(\theta_{{1}}-\theta_{{2}}\right)}}}+{i}{\sin{{\left(\theta_{{1}}-\theta_{{2}}\right)}}}\right)} ...

\displaystyle{\left(\Rightarrow{0.7164}{\left(-{0.3138}+{i}{0.9495}\right)}\right.} Explanation: \displaystyle\frac{{z}_{{1}}}{{z}_{{2}}}={\left(\frac{{r}_{{1}}}{{r}_{{2}}}\right)}{\left({\cos{{\left(\theta_{{1}}-\theta_{{2}}\right)}}}+{i}{\sin{{\left(\theta_{{1}}-\theta_{{2}}\right)}}}\right)} ...