Question

How do I find the quotient of two complex numbers in polar form?

Answer 1

If complex numbers `z_1` and `z_2` in polar form are

`{(z_1=r_1(costheta_1+isin theta_1)),(z_2=r_2(cos theta_2+i sin theta_2)):}`,

then we can write in exponential form

`{(z_1=r_1e^{i theta_1}),(z_2=r_2 e^{i theta_2}):}`.

So, the quotient `z_1/z_2` can be written as

`z_1/z_2={r_1e^{i theta_1}}/{r_2e^{i theta_2}}=r_1/r_2e^{i(theta_1-theta_2)}`

`=r_1/r_2[cos(theta_1-theta_2)+isin(theta_1-theta_2)]`

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I hope that this was helpful.