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EULER’S FORMULA FOR COMPLEX EXPONENTIALS

EULER’S FORMULA FOR COMPLEX EXPONENTIALS

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The complex logarithm Using polar coordinates and Euler’s formula allows us to define the complex exponential as ex+iy = ex eiy (11) which can be reversed for any non-zero complex number written in polar form as ‰ei` by inspection: x = ln(‰); y = ` to which we can also add any integer multiplying 2… to y for another solution! 4.

  Formula, Complex, Exponential, The complex, The complex exponential

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