How do you write the complex number -2i in polar form?

2 Answers
Douglas K.
Mar 23, 2017

Please see the explanation.

Explanation:

Because the real part (a) of the complex number is zero, you cannot use theta = tan^-1(b/a); you must know that the angle is either pi/2 or 3pi/2. Because the sign of the complex part is negative, you must know that this makes the angle the latter, 3pi/2.

theta = 3pi/2

You can see that the magnitude is 2.

The polar form is:

2(cos(3pi/2)+isin(3pi/2))

kamil9234
Mar 23, 2017

I hope a get it right: 2*(cos(270)+isin(270))

Explanation:

r=sqrt(x^2+y^2)=sqrt(4)=2
alpha=ctg^(-1)(0/-2)=90
alpha=360-90=270

In polar:
2*(cos(270)+isin(270))

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