Question

find the polar form of √3+i​

Answer 1

Answer:

Express the complex number (-sqrt(3)-i) in polar form.

The given complex number is z=(-√3-i). Let its polar form be z=r(cosθ+isinθ). Now, r=|z|=√(-√3)2+(-1)2=√4=2. tanα=|Im(z)Re(z)|=|-1-√3|=1√3⇒α=π6.

Step-by-step explanation: