\displaystyle-\frac{{1}}{{5}}+\frac{{2}}{{5}}{i} Explanation: \displaystyle\text{multiply the numerator/denominator by the }\ \text{conjugate} \displaystyle\text{of the denominator} \displaystyle\text{this ensures that the denominator is real} ...

In Trigonometric form \displaystyle\frac{\sqrt{{13}}}{\sqrt{{5}}}{\left[{\cos{{\left(-{60.26}\right)}}}+{i}{\sin{{\left({97.12}\right)}}}\right]} Explanation: In trigonometric form consider Z1 ...

\displaystyle{\left(\frac{{-{4}+{2}{i}}}{{{3}-{i}}}\approx-{1.4}-{0.2}{i}\right.} Explanation: To divide \displaystyle\frac{{-{4}+{2}{i}}}{{{3}-{i}}} using trigonometric form. \displaystyle{z}_{{1}}={\left(-{4}+{2}{i}\right)},{z}_{{2}}={\left({3}-{i}\right)} ...

\displaystyle{\frac{{{7}{i}-{4}}}{{{13}}}} Explanation: The complex conjugate of \displaystyle{2}-{3}{i} is \displaystyle{2}+{3}{i} . \displaystyle{\frac{{{1}+{2}{i}}}{{{2}-{3}{i}}}}={\frac{{{1}+{2}{i}}}{{{2}-{3}{i}}}}\cdot{\frac{{{2}+{3}{i}}}{{{2}+{3}{i}}}} ...

I found: \displaystyle\frac{{5}}{{17}}-\frac{{20}}{{17}}{i} Explanation: To evaluate both fractions you first need to change the denominator into a pure real (manipulating the entire fraction). ...

\displaystyle\frac{{{3}-{2}{i}}}{{{3}+{2}{i}}}=\frac{{5}}{{13}}-\frac{{12}}{{13}}{i} Explanation: Given a complex number \displaystyle{a}+{b}{i} , the complex conjugate of that number is \displaystyle{a}-{b}{i} ...