To divide the given complex numbers using the complex form
of complex numbers we have to first convert each of the complex numbers into the complex
form. Any complex number of the form z = x + i*y can be written as |z|<A>,
where the absolute value |z| = sqrt ( x^2 + y^2) and the argument A = arc tan (
y/x)
2 - 2i = (sqrt(2^2 + 2^2)) <arc tan
(-2/2)>
=> 2*sqrt 2 <-
pi/4>
-1 - i = (sqrt(1^2 + 1^2)) <arc tan
(-1/ - 1)>
=> sqrt 2
<-3*pi/4>
The result when the two complex
numbers are divided is given by dividing the absolute value and finding the difference
of the arguments.
=> (2*sqrt 2/ sqrt 2)
<-pi/4 + 3*pi/4>
=> 2 < pi/2
>
The result of dividing the complex
numbers is 2 <pi/2>
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