Difference between revisions of "HW3.1 Carlos Leon ECE301Fall2008mboutin" - Rhea

Latest revision as of 21:38, 23 September 2008

Lets define the signal

$\ x(t) = (1+2j)cos(t)+5sin(4t)$

Knowing that its Fourier series is

$\ x(t) = (1+2j)(\frac{e^{jt} + e^{-jt}}{2}) + 5(\frac{e^{j4t} - e^{-j4t}}{2j})$

We simplify

$\ x(t) = \frac{1+2j}{2} e^{jt} + \frac{1+2j}{2} e^{-jt} + \frac{5}{2j}e^{j4t} - \frac{5}{2j}e^{-j4t}$

Revision as of 21:38, 23 September 2008 (view source) Cdleon (Talk) (→‎CT Signal & its Fourier coefficients) ← Older edit		Latest revision as of 21:38, 23 September 2008 (view source) Cdleon (Talk) (→‎CT Signal & its Fourier coefficients)
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	We simplify		We simplify

−	<math>\ x(t) = \frac{1+2j}{2} e^{jt} + \frac{1+2j}{2} e^{-jt} + 5 \frac{e^{j4t~~}}{2j~~} - 5\frac{e^{-j4t~~}}{2j~~} </math>	+	<math>\ x(t) = \frac{1+2j}{2} e^{jt} + \frac{1+2j}{2} e^{-jt} + \frac{5}{2j}e^{j4t} - \frac{5}{2j}e^{-j4t} </math>