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! colspan="2" style="background: #eee;" | Euler's Formula and Related Equalities
 
! colspan="2" style="background: #eee;" | Euler's Formula and Related Equalities
 
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| align="right" style="padding-right: 1em;" | Euler's formula || <math>e^{jw_0t}=\cos w_0t+j\sin w_0t</math>
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| align="right" style="padding-right: 1em;" | Euler's formula || <math>e^{jw_0t}=\cos w_0t+j\sin w_0t \ </math>
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| align="right" style="padding-right: 1em;" | A really cute formula || <math>e^{j\pi}=-1 \ </math>
 
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| align="right" style="padding-right: 1em;" | Cosine function in terms of complex exponentials|| <math>\cos\theta=\frac{e^{j\theta}+e^{-j\theta}}{2}</math>
 
| align="right" style="padding-right: 1em;" | Cosine function in terms of complex exponentials|| <math>\cos\theta=\frac{e^{j\theta}+e^{-j\theta}}{2}</math>

Revision as of 08:47, 30 October 2009

Complex Number Identities and Formulas
Basic Definitions
imaginary number $ i=\sqrt{-1} \ $
electrical engineers imaginary number $ j=\sqrt{-1}\ $
conjugate of a complex number if $ z=a+jb $, for $ a,b\in {\mathbb R} $, then $ \bar{z}=a-jb $
magnitude of a complex number $ \| z \| = z \bar{z} $
magnitude of a complex number $ \| z \| = \sqrt{\left(Re(z)\right)^2+\left(Im(z)\right)^2} $
magnitude of a complex number $ \| a+jb \| = \sqrt{a^2+b^2} $, for $ a,b\in {\mathbb R} $
magnitude of a complex number $ \| r e^{j \theta} \| = r $, for $ r,\theta\in {\mathbb R} $
Euler's Formula and Related Equalities
Euler's formula $ e^{jw_0t}=\cos w_0t+j\sin w_0t \ $
A really cute formula $ e^{j\pi}=-1 \ $
Cosine function in terms of complex exponentials $ \cos\theta=\frac{e^{j\theta}+e^{-j\theta}}{2} $
Sine function in terms of complex exponentials $ \sin\theta=\frac{e^{j\theta}-e^{-j\theta}}{2j} $

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