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 - ...

\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\frac{{{6}-{6}{i}}}{{-{{4}}}}{i}=\frac{{3}}{{2}}+\frac{{3}}{{2}}{i} Explanation: In any question involving multiplication or division of complex number, one should always remember \displaystyle{i}^{{2}}=-{1} ...

\displaystyle\frac{{58}}{{97}}+\frac{{15}}{{97}}{i} Explanation: To divide a complex number by another , we require to \displaystyle\text{rationalise the denominator} ie. make it a real ...

Given Polar Coordinates (r,θ), find (rcosθ,rsinθ) \displaystyle{\left(-{1}{\cos{{\left(-\frac{\pi}{{6}}\right)}}},-{1}{\sin{{\left(-\frac{\pi}{{6}}\right)}}}\right)} \displaystyle{\left(-\frac{\sqrt{{3}}}{{2}},\frac{{1}}{{2}}\right)} ...

(13-i)/(3-i) Complex Division Determine the conjugate of the denominator : The conjugate of  ( 3 - i)  is  ( 3 + i)  Multiply the numerator and denominator by the conjugate:  ( 13 - i)•( 3 + i) = ...