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* Transfer function
 
* Transfer function
  
<math>H(z) = \frac{1}{(1-p_1p^{-1})(1-p_2p^{-1})}, \text{where } p_1 \text{and } p_2 \text{ are poles of the filter.}</math>
+
<math>H(z) = \frac{1}{(1-p_1z^{-1})(1-p_2z^{-1})}, \text{where } p_1 \text{and } p_2 \text{ are poles of the filter.}</math>
  
 
In order for the filter's impulse response to be real-valued, the two poles must be complex conjugates. So we assume that:
 
In order for the filter's impulse response to be real-valued, the two poles must be complex conjugates. So we assume that:

Revision as of 18:31, 29 November 2010

Practice Question 5, ECE438 Fall 2010, Prof. Boutin

Filter Design


Define a two-pole band-pass filter such that

  1. The center of its band-pass is at $ \omega=\pi/2 $.
  2. There is no gain at the center of its band-pass
  3. The filter has a zero frequency response at $ \omega=0 $ and $ \omega=\pi $.

Express the system using a constant coefficient difference equation.


Post Your answer/questions below.

  • Transfer function

$ H(z) = \frac{1}{(1-p_1z^{-1})(1-p_2z^{-1})}, \text{where } p_1 \text{and } p_2 \text{ are poles of the filter.} $

In order for the filter's impulse response to be real-valued, the two poles must be complex conjugates. So we assume that:

  • $ p_1 = re^{j\theta} $
  • $ p_2 = re^{-j\theta} $

So

$ \begin{align} H(z) &= \frac{1}{(1-p_1p^{-1})(1-p_2p^{-1})} \\ &= \frac{1}{(1-re^{j\theta}p^{-1})(1-re^{-j\theta}p^{-1})} \\ &= \frac{1}{1-2rcos(\theta)p^{-1}+r^2p^{-2}} \end{align} $

Then the frequency response of the filter is

$ H(e^{j\omega}) = \frac{1}{1-2rcos(\theta)e^{-j\omega}+r^2e^{-j2\omega}} $

Constant input gain is zero.

$ H(e^{j\omega})|_{\omega=0} = \frac{1}{1-2rcos(\theta)+r^2} = 0 $(*)

Filter has zero frequency response at $ \omega = 0,\pi $

$ H(e^{j\omega})|_{\omega=0} = \frac{1}{1-2rcos(\theta)+r^2} = 0 $

$ H(e^{j\omega})|_{\omega=\pi} = \frac{1}{1+2rcos(\theta)-r^2} = 0 $

I am unsure if this is correct way to tackle this problem. I don't wish to continue until the posted steps have been verified. Thanks!


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