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Euler's identity

$ e^{j \pi} + 1 = 0, \,\! $

Euler's formula

$ e^{jx} = \cos x + i \sin x \,\! $

$ \cos x = \mathrm{Re}\{e^{ix}\} ={e^{ix} + e^{-ix} \over 2} $

$ \sin x = \mathrm{Im}\{e^{ix}\} ={e^{ix} - e^{-ix} \over 2i}. $

$ \cos(x) = {e^{-jx} + e^{jx} \over 2} $

$ \sin(x) = {e^{-jx} - e^{jx} \over 2j} $

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Basic linear algebra uncovers and clarifies very important geometry and algebra.

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