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a. Is this a linear system? Is it space invariant? <br/>
 
a. Is this a linear system? Is it space invariant? <br/>
 
b. What is the 2D impulse response of this system? <br/>
 
b. What is the 2D impulse response of this system? <br/>
c. Calculate its frequency response H(<math>e^{j\mu},e^{j\nu}</math>). <br/>
+
c. Calculate its frequency response H(u,v). <br/>
 
d. Describe how the filter behaves when <math>\lambda</math> is positive and large. <br/>
 
d. Describe how the filter behaves when <math>\lambda</math> is positive and large. <br/>
 
e. Describe how the filter behaves when <math>\lambda</math> is negative and bigger than -1. <br/>
 
e. Describe how the filter behaves when <math>\lambda</math> is negative and bigger than -1. <br/>

Revision as of 11:36, 28 November 2010

Quiz Questions Pool for Week 14


Q1. Assume we know (or can measure) a function

$ \begin{align} p(x) &= \int_{-\infty}^{\infty}f(x,y)dy \end{align} $

Using the definition of the CSFT, derive an expression for F(u,0) in terms of the function p(x).


Q2. Consider the following 2D system with input x(m,n) and output y(m,n)

$ y(m,n) = x(m,n) + \lambda \left( x(m,n) - \frac{1}{9} \sum_{k=-1}^{1}\sum_{l=-1}^{1}x(m-k,n-l) \right) $

a. Is this a linear system? Is it space invariant?
b. What is the 2D impulse response of this system?
c. Calculate its frequency response H(u,v).
d. Describe how the filter behaves when $ \lambda $ is positive and large.
e. Describe how the filter behaves when $ \lambda $ is negative and bigger than -1.


Back to ECE 438 Fall 2010 Lab Wiki Page

Back to ECE 438 Fall 2010

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BSEE 2004, current Ph.D. student researching signal and image processing.

Landis Huffman