1 - i Explanation: Multiply numerator and denominator by the complex conjugate of (1 - i ) which is ( 1 + i ). This ensures the denominator is real. (Remember that : \displaystyle{i}^{{2}}=-{1}{)} ...

Multiply the numerator and denominator by the conjugate of the denominator to find \displaystyle\frac{{{2}+{i}}}{{{1}-{i}}}=\frac{{1}}{{2}}+\frac{{3}}{{2}}{i} Explanation: The conjugate of a ...

\displaystyle\frac{{5}}{{2}}+\frac{{1}}{{2}}{i} Explanation: Multiply by the complex conjugate of the denominator. \displaystyle\frac{{{3}-{2}{i}}}{{{1}-{i}}}{\left(\frac{{{1}+{i}}}{{{1}+{i}}}\right)}=\frac{{{3}+{i}-{2}{i}^{{2}}}}{{{1}-{i}^{{2}}}} ...

\displaystyle{\frac{{{5}}}{{{2}}}}-{\frac{{{5}}}{{{2}}}}{i} Explanation: The complex conjugate of a complex number is of the form \displaystyle{\left({a}+{b}{i}\right)}^{{\ast}}={a}-{b}{i} ...

\displaystyle{1}+{3}{i} Explanation: You must eliminate the complex number in the denominator by multiplying by its conjugate: \displaystyle\frac{{{4}+{2}{i}}}{{{1}-{i}}}=\frac{{{\left({4}+{2}{i}\right)}{\left({1}+{i}\right)}}}{{{\left({1}-{i}\right)}{\left({1}+{i}\right)}}} ...

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)