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+ | [[Category:Formulas]] | ||
+ | |||
+ | keywords: magnitude, conjugate, de Moivre, Euler | ||
+ | |||
+ | <center><font size= 4> | ||
+ | '''[[Collective_Table_of_Formulas|Collective Table of Formulas]]''' | ||
+ | </font size> | ||
+ | |||
+ | '''Complex Number Identities and Formulas''' | ||
+ | |||
+ | click [[Collective_Table_of_Formulas|here]] for [[Collective_Table_of_Formulas|more formulas]] | ||
+ | |||
+ | </center> | ||
+ | ---- | ||
+ | |||
{| | {| | ||
|- | |- | ||
− | ! colspan="2" style="background: #e4bc7e; font-size: 110%;" | Complex Number Identities and Formulas [[more_on_complex_numbers|(info)]] | + | ! colspan="2" style="background: #e4bc7e; font-size: 110%;" | [[more_on_complex_numbers|Complex Number]] Identities and Formulas [[more_on_complex_numbers|(info)]] |
|- | |- | ||
! colspan="2" style="background: #eee;" | Basic Definitions | ! colspan="2" style="background: #eee;" | Basic Definitions | ||
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| align="right" style="padding-right: 2em;" | imaginary number || <math>i=\sqrt{-1} \ </math> | | align="right" style="padding-right: 2em;" | imaginary number || <math>i=\sqrt{-1} \ </math> | ||
|- | |- | ||
− | | align="right" style="padding-right: 2em;" | electrical engineers' imaginary number || <math>j=\sqrt{-1}\ </math> | + | | align="right" style="padding-right: 2em;" | [[ECE|electrical engineers]]' imaginary number || <math>j=\sqrt{-1}\ </math> |
|- | |- | ||
− | | align="right" style="padding-right: 2em;" | [[more_on_complex_conjugate|(info)]] conjugate of a complex number || | + | | align="right" style="padding-right: 2em;" | [[more_on_complex_conjugate|(info)]] conjugate of a complex number || <math> \text{if}\ z=a+ib,\ \text{for}\ a,\ b \in {\mathbb R},\ \text{then} \ \bar{z}=a-ib </math> |
|- | |- | ||
− | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| z \| = z \bar{z} </math> | + | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| z \| = \sqrt{ z \bar{z} } </math> |
|- | |- | ||
| align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math> \| z \| = \sqrt{\left(Re(z)\right)^2+\left(Im(z)\right)^2}</math> | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math> \| z \| = \sqrt{\left(Re(z)\right)^2+\left(Im(z)\right)^2}</math> | ||
|- | |- | ||
− | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| a+ib \| = \sqrt{a^2+b^2} | + | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| a+ib \| = \sqrt{a^2+b^2},\ \text{for}\ a,b\in {\mathbb R}</math> |
|- | |- | ||
− | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| r e^{i \theta} \| = r | + | | align="right" style="padding-right: 2em;" | [[more_on_complex_magnitude|(info)]] magnitude of a complex number || <math>\| r e^{i \theta} \| = r,\ \text{for}\ r,\theta\in {\mathbb R}</math> |
|- | |- | ||
! colspan="2" style="background: #eee;" | Complex Number Operations | ! colspan="2" style="background: #eee;" | Complex Number Operations | ||
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|- | |- | ||
| align="right" style="padding-right: 2em;" |multiplication || <math>(a+ib) (c+id)=(ac-bd) + i (ad+bc) \ </math> | | align="right" style="padding-right: 2em;" |multiplication || <math>(a+ib) (c+id)=(ac-bd) + i (ad+bc) \ </math> | ||
+ | |- | ||
+ | | align="right" style="padding-right: 2em;" |multiplication in polar form|| <math>\left( r_1 (\cos \theta_1 + i \sin \theta_1) \right) \left( r_2 (\cos \theta_2 + i \sin \theta_2) \right)= r_1 r_2 \left( \cos (\theta_1+\theta_2)+i \sin (\theta_1-\theta_2) \right)\ </math> | ||
|- | |- | ||
| align="right" style="padding-right: 2em;" |division || <math>\frac{a+ib} {c+id}=\frac{ac+bd} {c^2+d^2}+ i \frac{bc-ad} {c^2+d^2} \ </math> | | align="right" style="padding-right: 2em;" |division || <math>\frac{a+ib} {c+id}=\frac{ac+bd} {c^2+d^2}+ i \frac{bc-ad} {c^2+d^2} \ </math> | ||
+ | |- | ||
+ | | align="right" style="padding-right: 2em;" |division in polar form|| <math>\frac{ r_1 (\cos \theta_1 + i \sin \theta_1)}{ r_2 (\cos \theta_2 + i \sin \theta_2) }= \frac{r_1}{ r_2} \left( \cos (\theta_1-\theta_2)+i \sin (\theta_1+\theta_2) \right)\ </math> | ||
|- | |- | ||
| align="right" style="padding-right: 2em;" | exponentiation || <math> i^n =\left\{ \begin{array}{ll}1,& \text{when }n\equiv 0\mod 4 \\ i,& \text{when }n\equiv 1\mod 4 \\-1,& \text{when }n\equiv 2\mod 4 \\-i,& \text{when }n\equiv 3\mod 4 | | align="right" style="padding-right: 2em;" | exponentiation || <math> i^n =\left\{ \begin{array}{ll}1,& \text{when }n\equiv 0\mod 4 \\ i,& \text{when }n\equiv 1\mod 4 \\-1,& \text{when }n\equiv 2\mod 4 \\-i,& \text{when }n\equiv 3\mod 4 | ||
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|- | |- | ||
| align="right" style="padding-right: 2em;" | De Moivre's theorem ||<math>\left(\cos x+i\sin x\right)^n=\cos\left(nx\right)+i\sin\left(nx\right).\,</math> | | align="right" style="padding-right: 2em;" | De Moivre's theorem ||<math>\left(\cos x+i\sin x\right)^n=\cos\left(nx\right)+i\sin\left(nx\right).\,</math> | ||
+ | |- | ||
+ | | align="right" style="padding-right: 2em;" | Root of a complex number || <math>\left( r (\cos x+i\sin x) \right)^{\frac{1}{n}}=r^{\frac{1}{n}} | ||
+ | \cos\left(\frac{x+2 k \pi}{n}\right) | ||
+ | +i\sin\left(\frac{x+2 k \pi}{n} \right), k=0,1,\ldots, n-1.\,</math> | ||
|- | |- | ||
|} | |} | ||
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[[Collective_Table_of_Formulas|Back to Collective Table]] | [[Collective_Table_of_Formulas|Back to Collective Table]] | ||
[[Category:Formulas]] | [[Category:Formulas]] | ||
+ | [[Category:complex numbers]] |
Latest revision as of 11:57, 24 February 2015
keywords: magnitude, conjugate, de Moivre, Euler
Complex Number Identities and Formulas
click here for more formulas
Complex Number Identities and Formulas (info) | |
---|---|
Basic Definitions | |
imaginary number | $ i=\sqrt{-1} \ $ |
electrical engineers' imaginary number | $ j=\sqrt{-1}\ $ |
(info) conjugate of a complex number | $ \text{if}\ z=a+ib,\ \text{for}\ a,\ b \in {\mathbb R},\ \text{then} \ \bar{z}=a-ib $ |
(info) magnitude of a complex number | $ \| z \| = \sqrt{ z \bar{z} } $ |
(info) magnitude of a complex number | $ \| z \| = \sqrt{\left(Re(z)\right)^2+\left(Im(z)\right)^2} $ |
(info) magnitude of a complex number | $ \| a+ib \| = \sqrt{a^2+b^2},\ \text{for}\ a,b\in {\mathbb R} $ |
(info) magnitude of a complex number | $ \| r e^{i \theta} \| = r,\ \text{for}\ r,\theta\in {\mathbb R} $ |
Complex Number Operations | |
addition | $ (a+ib)+(c+id)=(a+c) + i (b+d) \ $ |
multiplication | $ (a+ib) (c+id)=(ac-bd) + i (ad+bc) \ $ |
multiplication in polar form | $ \left( r_1 (\cos \theta_1 + i \sin \theta_1) \right) \left( r_2 (\cos \theta_2 + i \sin \theta_2) \right)= r_1 r_2 \left( \cos (\theta_1+\theta_2)+i \sin (\theta_1-\theta_2) \right)\ $ |
division | $ \frac{a+ib} {c+id}=\frac{ac+bd} {c^2+d^2}+ i \frac{bc-ad} {c^2+d^2} \ $ |
division in polar form | $ \frac{ r_1 (\cos \theta_1 + i \sin \theta_1)}{ r_2 (\cos \theta_2 + i \sin \theta_2) }= \frac{r_1}{ r_2} \left( \cos (\theta_1-\theta_2)+i \sin (\theta_1+\theta_2) \right)\ $ |
exponentiation | $ i^n =\left\{ \begin{array}{ll}1,& \text{when }n\equiv 0\mod 4 \\ i,& \text{when }n\equiv 1\mod 4 \\-1,& \text{when }n\equiv 2\mod 4 \\-i,& \text{when }n\equiv 3\mod 4 \end{array} \right. \ $ |
Euler's Formula and Related Equalities (info) | |
(info) Euler's formula | $ e^{iw_0t}=\cos w_0t+i\sin w_0t \ $ |
A really cute formula | $ e^{i\pi}=-1 \ $ |
Cosine function in terms of complex exponentials | $ \cos\theta=\frac{e^{i\theta}+e^{-i\theta}}{2} $ |
Sine function in terms of complex exponentials | $ \sin\theta=\frac{e^{i\theta}-e^{-i\theta}}{2i} $ |
Other Formulas | |
De Moivre's theorem | $ \left(\cos x+i\sin x\right)^n=\cos\left(nx\right)+i\sin\left(nx\right).\, $ |
Root of a complex number | $ \left( r (\cos x+i\sin x) \right)^{\frac{1}{n}}=r^{\frac{1}{n}} \cos\left(\frac{x+2 k \pi}{n}\right) +i\sin\left(\frac{x+2 k \pi}{n} \right), k=0,1,\ldots, n-1.\, $ |