What is z in polar coordinates?
Understand the Problem
The question is asking for the representation of a complex number z in polar coordinates. This involves converting the rectangular coordinates of z into a polar form, which includes finding the magnitude and angle (argument) of the complex number.
Answer
z = r (cosθ + i sinθ)
The final answer is z = r (cosθ + i sinθ)
Answer for screen readers
The final answer is z = r (cosθ + i sinθ)
More Information
In the polar form, a complex number is represented as z = r (cosθ + i sinθ), where r is the magnitude (or modulus) and θ is the angle (or argument) of the complex number.
Sources
- The web page with info on - Cuemath - cuemath.com
- What is Z in polar coordinates? - BYJU'S - byjus.com
- Polar Form of a Complex Number - Varsity Tutors - varsitytutors.com
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