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* [[ECE438_Week9_Quiz_Q1sol|Solution]]. | * [[ECE438_Week9_Quiz_Q1sol|Solution]]. | ||
---- | ---- | ||
| − | Q2. | + | Q2. When we have a LTI system, the impulse response <math>h[n]</math> must be real |
| + | |||
| + | in order for <math>y[n]</math> to be real whenever <math>x[n]</math> is real. | ||
| + | |||
| + | The condition for <math>h[n]</math> to be real is | ||
| + | |||
| + | <math> h[n]=h^{\ast}[n] </math> | ||
| + | |||
| + | Then, what is the condition of the frequency response of <math>H(w)</math> for <math>h[n]</math> to be real? | ||
| + | |||
| + | (Hint: Apply DTFT to the above equation) | ||
* [[ECE438_Week9_Quiz_Q2sol|Solution]]. | * [[ECE438_Week9_Quiz_Q2sol|Solution]]. | ||
Revision as of 10:58, 20 October 2010
Quiz Questions Pool for Week 9
Q1. Consider the following second order FIR filter with the two zeros on the unit circle as shown below.
The transfer function for this filter is given by $ H(z) = (1-e^{j\theta}z^{-1})(1-e^{-j\theta}z^{-1})=1-2\cos\theta z^{-1}+z^{-2} $
- a. Find the difference equation of this filter.
- b. Find the frequency response $ H(w) $ from the difference equation by the following two approaches:
- i. apply the input $ e^{jwn} $ to the difference equation describing the system,
- ii. find the DTFT of the impulse response,
- and verify that both methods lead to the same result.
- c. Find the response of this system to the input
- $ x[n]=\left\{ \begin{array}{rl} 1, & \text{ if }n=-1,\\ 1, & \text{ if }n=0,\\ 0, & \text{ else. } \end{array} \right. $
- d. When $ \theta=\pi/2 $, is this filter a lowpass, highpass, bandpass or a bandstop filter?
- e. An interference signal modulated at 2kHz and sampled at 8kHz is being inputted to this system and you want to eliminate this interference. What must be the value of $ \theta $ to eliminate this signal?
Q2. When we have a LTI system, the impulse response $ h[n] $ must be real
in order for $ y[n] $ to be real whenever $ x[n] $ is real.
The condition for $ h[n] $ to be real is
$ h[n]=h^{\ast}[n] $
Then, what is the condition of the frequency response of $ H(w) $ for $ h[n] $ to be real?
(Hint: Apply DTFT to the above equation)
Q3.
Q4.
Q5.
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