you are solving z^6=\sqrt{2}e^{i(\frac{\pi}{4}+k.2\pi)}thereforez=2^{\frac{1}{12}}\left(\cos(\frac{\pi}{24}+k\frac{\pi}{3})+i\sin(\frac{\pi}{24}+k\frac{\pi}{3})\right)

On multiplying numerator and denominator by (1-i), which is the inverse of the denominator, we get = {(1-i)^2}/{(1^2) - (i^2)} = {1 + (i^2) - 2i}/{(1^2) - (i^2)} = (1 - 1 - 2i)/{1 - (-1)} = (0 - ...

(1+i)/(2-i) Complex Division Determine the conjugate of the denominator : The conjugate of  ( 2 - i)  is  ( 2 + i)  Multiply the numerator and denominator by the conjugate:  ( 1 + i)•( 2 + i) = ( ...

Tiger was unable to solve based on your input  2-4i/1+i  Unauthorized use of the imaginary unit "i" or syntax error in complex arithmetic expression ...... V 2-4i/1+i The symbol "i" is only ...

\displaystyle\frac{{4}}{{5}}-\frac{{3}}{{5}}{i} Explanation: \displaystyle\text{multiply the numerator/denominator by the} \displaystyle\text{complex conjugate}\ \text{ of the denominator} ...

In trigonometric form: \displaystyle{0.368}{\left({\cos{{5.011}}}+{i}{\sin{{5.011}}}\right)} Explanation: \displaystyle{Z}=\frac{{{1}-{2}{i}}}{{{6}+{i}}} \displaystyle{Z}={a}+{i}{b} . ...