EDB — 1M7

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Exercises

  1. [1M7]If \(z=x+iy\) with \(x,y∈ℝ\), then we can express the complex exponential as a product \(e^{z}=e^ xe^{iy}\). Use power series developments to show Euler’s identity \(e^{iy}=\cos y + i \sin y~ .\)

    Solution 1

    [1M8]

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Bibliography
Book index
  • Euler
  • Euler, identity
  • power series
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