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Arguments and Polar Forms of Complex Numbers

      https://doi.org/10.1142/9789812811080_0002Cited by:0 (Source: Crossref)
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      Abstract:

      The notion of a phase or an argument of a complex number is what makes complex numbers have a flavor different from real numbers. To see what it is, let z = x + iy be a nonzero complex number. Then in terms of polar coordinates, z can be identified as (r, θ), where

      and
      Note that if z = (r, θ), then z = (r, θ + 2kθ), where k is any integer. We …