(2 intermediate revisions by the same user not shown)
Line 9: Line 9:
 
----
 
----
 
==Question 1==
 
==Question 1==
Below we describe the ROAC of the transfer function of an LTI system. For each ROAC, determine which each of these system properties apply. (Just list the letters of the properties that apply.)
+
Below we describe the ROAC of the transfer function of an LTI system. For each ROAC, determine which of these system properties apply. (Just list the letters of the properties that apply.)
 
:a) the system is causal;
 
:a) the system is causal;
 
:b) the system is BIBO stable;
 
:b) the system is BIBO stable;
 
:c) the system has a well defined and finite frequency response function;
 
:c) the system has a well defined and finite frequency response function;
:d) the system is FIR;
+
:d) the system is an FIR filter;
:e) The system is IIR;
+
:e) The system is an IIR filter;
 
:f) the unit impulse response of the system is right-sided;
 
:f) the unit impulse response of the system is right-sided;
 
:g) the unit impulse response of the system is left-sided;
 
:g) the unit impulse response of the system is left-sided;
Line 41: Line 41:
  
 
'''1.12''' ROAC= all complex numbers z with 0.5<|z|<2.  
 
'''1.12''' ROAC= all complex numbers z with 0.5<|z|<2.  
 
+
----
 
==Question 2==
 
==Question 2==
 
Compute the z-transform of the signal
 
Compute the z-transform of the signal
  
 
<math>x[n]= 6^n u[n-1]  \ </math>
 
<math>x[n]= 6^n u[n-1]  \ </math>
 
+
----
 
==Questions 3==
 
==Questions 3==
 
Compute the z-transform of the signal
 
Compute the z-transform of the signal
  
 
<math>x[n]= \left( \frac{1}{5} \right)^n u[-n] </math>
 
<math>x[n]= \left( \frac{1}{5} \right)^n u[-n] </math>
 
+
----
 
==Questions 4==
 
==Questions 4==
 
Compute the z-transform of the signal
 
Compute the z-transform of the signal
  
 
<math>x[n]= 3^{-|n+1|} \ </math>
 
<math>x[n]= 3^{-|n+1|} \ </math>
 
+
----
 
== Question 5  ==
 
== Question 5  ==
 
Compute the z-transform of the signal
 
Compute the z-transform of the signal
  
 
<math>x[n]= 2^{n}u[n]- 3^{n}u[-n+1]  \ </math>
 
<math>x[n]= 2^{n}u[n]- 3^{n}u[-n+1]  \ </math>
 
+
----
 
== Question 6 ==
 
== Question 6 ==
 
Compute the inverse z-transform of  
 
Compute the inverse z-transform of  
  
 
<math>X(z)=\frac{7}{1+z}, \text{ ROC } |z|<1 </math>
 
<math>X(z)=\frac{7}{1+z}, \text{ ROC } |z|<1 </math>
 
+
----
 
+
 
== Question 7 ==
 
== Question 7 ==
 
Compute the inverse z-transform of  
 
Compute the inverse z-transform of  
  
 
<math>X(z)=\frac{1}{1-3 z}, \text{ ROC } |z|> \frac{1}{3} </math>
 
<math>X(z)=\frac{1}{1-3 z}, \text{ ROC } |z|> \frac{1}{3} </math>
 
+
----
 
== Question 8 ==
 
== Question 8 ==
 
Compute the inverse z-transform of  
 
Compute the inverse z-transform of  
  
 
<math>X(z)=\frac{1}{1+z^2}, \text{ ROC } |z|< 1</math>
 
<math>X(z)=\frac{1}{1+z^2}, \text{ ROC } |z|< 1</math>
 
+
----
 
== Question 9 ==
 
== Question 9 ==
  
Line 83: Line 82:
  
 
<math>X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC }  |z|<1</math>
 
<math>X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC }  |z|<1</math>
 
+
----
 
+
 
== Question 10 ==
 
== Question 10 ==
  
Line 90: Line 88:
  
 
<math>X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC }  |z|>3</math>
 
<math>X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC }  |z|>3</math>
 
+
----
 
== Question 11 ==
 
== Question 11 ==
  

Latest revision as of 14:35, 8 November 2016


Homework 8, ECE438, Fall 2016, Prof. Boutin

Hard copy due in class, Wednesday November 9, 2016.


Question 1

Below we describe the ROAC of the transfer function of an LTI system. For each ROAC, determine which of these system properties apply. (Just list the letters of the properties that apply.)

a) the system is causal;
b) the system is BIBO stable;
c) the system has a well defined and finite frequency response function;
d) the system is an FIR filter;
e) The system is an IIR filter;
f) the unit impulse response of the system is right-sided;
g) the unit impulse response of the system is left-sided;

1.1 ROAC= all finite complex numbers, but not infinity.

1.2 ROAC= all complex numbers, including infinity.

1.3 ROAC= all complex numbers z with |z|>0.5, including infinity.

1.4 ROAC= all finite complex numbers z with |z|>0.5, but not infinity.

1.5 ROAC= all complex numbers z with |z|>3, including infinity.

1.6 ROAC= all finite complex numbers z with |z|>3, but not infinity.

1.7 ROAC= all complex numbers z with |z|<0.5.

1.8 ROAC= all complex numbers z with 0<|z|<0.5.

1.9 ROAC= all complex numbers z with |z|<3.

1.10 ROAC= all complex numbers z with 0<|z|<3.

1.11 ROAC= all complex numbers z with 2<|z|<3.

1.12 ROAC= all complex numbers z with 0.5<|z|<2.


Question 2

Compute the z-transform of the signal

$ x[n]= 6^n u[n-1] \ $


Questions 3

Compute the z-transform of the signal

$ x[n]= \left( \frac{1}{5} \right)^n u[-n] $


Questions 4

Compute the z-transform of the signal

$ x[n]= 3^{-|n+1|} \ $


Question 5

Compute the z-transform of the signal

$ x[n]= 2^{n}u[n]- 3^{n}u[-n+1] \ $


Question 6

Compute the inverse z-transform of

$ X(z)=\frac{7}{1+z}, \text{ ROC } |z|<1 $


Question 7

Compute the inverse z-transform of

$ X(z)=\frac{1}{1-3 z}, \text{ ROC } |z|> \frac{1}{3} $


Question 8

Compute the inverse z-transform of

$ X(z)=\frac{1}{1+z^2}, \text{ ROC } |z|< 1 $


Question 9

Compute the inverse z-transform of

$ X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC } |z|<1 $


Question 10

Compute the inverse z-transform of

$ X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC } |z|>3 $


Question 11

Compute the inverse z-transform of

$ X(z)=\frac{1}{(1+ z)(3-z)}, \text{ ROC } 1< |z|<3 $



Hand in a hard copy of your solutions. Pay attention to rigor!

Presentation Guidelines

  • Write only on one side of the paper.
  • Use a "clean" sheet of paper (e.g., not torn out of a spiral book).
  • Staple the pages together.
  • Include a cover page.
  • Do not let your dog play with your homework.

Discussion

  • Write question/comment here.
    • answer will go here

Back to ECE438, Fall 2016, Prof. Boutin

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang