(Example of a tume-invariant system)
(Example of a tume-invariant system)
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Output signal y(t) can be <math>10e^t</math> by system<br>
 
Output signal y(t) can be <math>10e^t</math> by system<br>
 
Prove.<br>
 
Prove.<br>
1. <math>e^t</math> is changed to <math>e^{(t-t0)}</math> by time delay.<br>
 
  <math>e^{(t-t0)} -> 10e^{(t-t0)}</math> by system.<br>
 
  
2. <math>e^t -> 10e^t </math> by system.<br>
+
<math>e^t</math> is changed to <math>e^{(t-t0)}</math> by time delay.<br>
  <math>10e^t -> 10e^{(t-t0)}</math><br>
+
<math>e^{(t-t0)} -> 10e^{(t-t0)}</math> by system.<br>
 +
 
 +
<math>e^t -> 10e^t </math> by system.<br>
 +
<math>10e^t -> 10e^{(t-t0)}</math><br>
  
 
The output signals are same. Then we can say that the system is time-invariant.<br>
 
The output signals are same. Then we can say that the system is time-invariant.<br>

Revision as of 13:00, 9 September 2008

A time-invariant system

For any input signal x(t), a system yelids y(t). Now, suppose input signal shifted t0, x(t-t0). Then output signal also shifted t0, y(t-t0). Then we can say a system is time-invariant.

Example of a tume-invariant system

x(t) = $ e^t $
Output signal y(t) can be $ 10e^t $ by system
Prove.

$ e^t $ is changed to $ e^{(t-t0)} $ by time delay.
$ e^{(t-t0)} -> 10e^{(t-t0)} $ by system.

$ e^t -> 10e^t $ by system.
$ 10e^t -> 10e^{(t-t0)} $

The output signals are same. Then we can say that the system is time-invariant.

Alumni Liaison

has a message for current ECE438 students.

Sean Hu, ECE PhD 2009