(Some Operations)
(Definition)
 
(19 intermediate revisions by the same user not shown)
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== Definition ==
 
== Definition ==
* the complex numbers are combinations of both real parts and imaginary parts, denoted ''i''.
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* The complex numbers are combinations of both real parts and imaginary parts, denoted ''i''.
 
* These can be written ''a+bi'', where a and b are real numbers.
 
* These can be written ''a+bi'', where a and b are real numbers.
  
 
== Some Operations ==
 
== Some Operations ==
* <math>i^2 = -1</math>
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* <math>j^2 = -1</math>
* <math>|a+bi| =\sqrt(a^2+b^2)</math>
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* <math>|a+bj| =\sqrt{a^2+b^2}</math>
 
* <math>|z| = |\overline z|</math> , where z is complex number
 
* <math>|z| = |\overline z|</math> , where z is complex number
* Euler Equation :  <math>exp^(ia)</math> = = cos a+isin a
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* '''Euler Equation''' :  <math>e^{aj} = cos a + isin a</math>
 +
 
 +
== Examples ==
 +
*<math>|1+2j| = \sqrt{1^2+2^2} = \sqrt{5}</math>
 +
*<math>|1-2j| = \sqrt{1^2+(-2)^2} =\sqrt{5}</math>
 +
*<math>e^{j60} = cos 60 + jsin 60</math>
 +
*<math>e^{-j60} = cos 60 - jsin 60</math>

Latest revision as of 17:59, 2 September 2008

Definition

  • The complex numbers are combinations of both real parts and imaginary parts, denoted i.
  • These can be written a+bi, where a and b are real numbers.

Some Operations

  • $ j^2 = -1 $
  • $ |a+bj| =\sqrt{a^2+b^2} $
  • $ |z| = |\overline z| $ , where z is complex number
  • Euler Equation : $ e^{aj} = cos a + isin a $

Examples

  • $ |1+2j| = \sqrt{1^2+2^2} = \sqrt{5} $
  • $ |1-2j| = \sqrt{1^2+(-2)^2} =\sqrt{5} $
  • $ e^{j60} = cos 60 + jsin 60 $
  • $ e^{-j60} = cos 60 - jsin 60 $

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