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Note: There is a very high chance of a question like this on the final.
 
Note: There is a very high chance of a question like this on the final.
 
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Define a signal x(t) and take samples every T starting from t=0 (using a specific value of T). Store the samples in a discrete-time signal z[n]. Obtain a mathematical expression for the  Fourier transform of x(t) and sketch it. Obtain a mathematical expression for the  Fourier transform of y[n] and sketch it.  
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Define a signal x(t) and take samples every T (using a specific value of T). Store the samples in a discrete-time signal z[n]. Obtain a mathematical expression for the  Fourier transform of x(t) and sketch it. Obtain a mathematical expression for the  Fourier transform of y[n] and sketch it.  
  
 
Let's hope we get a lot of different signals from different students!
 
Let's hope we get a lot of different signals from different students!

Revision as of 10:05, 3 December 2010

Practice Question 4, ECE438 Fall 2010, Prof. Boutin

Frequency domain view of filtering.

Note: There is a very high chance of a question like this on the final.


Define a signal x(t) and take samples every T (using a specific value of T). Store the samples in a discrete-time signal z[n]. Obtain a mathematical expression for the Fourier transform of x(t) and sketch it. Obtain a mathematical expression for the Fourier transform of y[n] and sketch it.

Let's hope we get a lot of different signals from different students!


Post Your answer/questions below.

I thought I would start with a function that had a simple F.T.

$ x(t) = \delta(t), T=1 $

$ \begin{align} z[n] &= x_T[n] \\ &= \delta(t+T) \end{align} $

Fourier Transform of x(t) = 1

$ y[n] = x(t)*z[n] $ <-- is this correct?


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