(Amplitude Modulation)
(Amplitude Modulation)
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<math>      = \frac{1}{2\pi}2\pi\delta(w-w_{c}) * X(w) = X(w-w_{c})</math> , where * is convolution
 
<math>      = \frac{1}{2\pi}2\pi\delta(w-w_{c}) * X(w) = X(w-w_{c})</math> , where * is convolution
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 +
Thus, X(w) was delayed by <math> w_{c}</math>
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To demodulate, multiply <math> y(t) </math> by <math> e^{jw_{c}t}</math>.
  
 
(2) Sinusidal type
 
(2) Sinusidal type

Revision as of 11:24, 16 November 2008

Amplitude Modulation

The signal is transmitted to receiver by communication channel.

In this process, information bearing signal, x(t), is embeded by carrier signal, c(t) which has its amplitude.

So the modulated signal is the product of these two signals:

$ y(t) = x(t)c(t) $

Here are two types of carriers.

(1) complex exponential type

Suppoese $ c(t) $ is $ e^{jw_{c}t}. $

$ y(t) = e^{jw_{c}t} $

$ Y(w) = F(e^{jw_{c}t}x(t)) = \frac{1}{2\pi}F(e^{jw_{c}t})X(w) $

$ = \frac{1}{2\pi}2\pi\delta(w-w_{c}) * X(w) = X(w-w_{c}) $ , where * is convolution

Thus, X(w) was delayed by $ w_{c} $

To demodulate, multiply $ y(t) $ by $ e^{jw_{c}t} $.

(2) Sinusidal type

Alumni Liaison

Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

Dr. Paul Garrett