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Q1. Find the impulse response of the following LTI systems and draw their block diagram.
 
Q1. Find the impulse response of the following LTI systems and draw their block diagram.
  
(assume that the impulse response is causal and zero when <math>n<0</math>.
+
(assume that the impulse response is causal and zero when <math>n<0</math>)
  
 
<math>{\color{White}ab}\text{a)}{\color{White}abc}y[n] = 0.6 y[n-1] + 0.4 x[n]</math>
 
<math>{\color{White}ab}\text{a)}{\color{White}abc}y[n] = 0.6 y[n-1] + 0.4 x[n]</math>

Revision as of 10:58, 8 October 2010


Under construction -Jaemin


Quiz Questions Pool for Week 8


Q1. Find the impulse response of the following LTI systems and draw their block diagram.

(assume that the impulse response is causal and zero when $ n<0 $)

$ {\color{White}ab}\text{a)}{\color{White}abc}y[n] = 0.6 y[n-1] + 0.4 x[n] $

$ {\color{White}ab}\text{b)}{\color{White}abc}y[n] = y[n-1] + 0.25(x[n] - x[n-3]) $


Q2. Suppose that the LTI filter $ h_1 $ satifies the following difference equation between input $ x[n] $ and output $ y[n] $.

$ {\color{White}ab} y[n] = h_1[n]\;\ast\;x[n] = \frac{1}{4} y[n-1] + x[n] $

Then, find the inverse LTI filter ($ h_2 $) of $ h_1 $, which satisfies the following relationship for any discrete-time signal $ x[n] $,

$ {\color{White}ab} x[n] = h_2[n]\;\ast\;h_1[n]\;\ast\;x[n] $


$ \text{Q3.} $


$ \text{Q4.} $


$ \text{Q5.} $


$ \text{Q6.} $


Back to ECE 438 Fall 2010 Lab Wiki Page

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