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The [[Hw3ECE438F10|third homework]] is due next Wednesday. It basically consists in computing the inverse z-transforms of the signal you used in [[Hw2ECE38F10|HW2]] and in doing the peer review of [[Hw2ECE38F10|HW2]]. | The [[Hw3ECE438F10|third homework]] is due next Wednesday. It basically consists in computing the inverse z-transforms of the signal you used in [[Hw2ECE38F10|HW2]] and in doing the peer review of [[Hw2ECE38F10|HW2]]. | ||
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+ | Did everybody hand in their homework 2 in the "Assignment 2" box in Prof. Mimi's dropbox? Note that this is NOT the same as Prof. Mimi's dropbox. | ||
Previous: [[Lecture6ECE438F10|Lecture 6]]; Next: [[Lecture8ECE438F10|Lecture 8]] | Previous: [[Lecture6ECE438F10|Lecture 6]]; Next: [[Lecture8ECE438F10|Lecture 8]] |
Latest revision as of 11:30, 8 September 2010
Lecture 7 Blog, ECE438 Fall 2010, Prof. Boutin
Wednesday September 8, 2010.
In Lecture #7, we talked about convergence of the z-transform at infinity. We also talked about the time-shifting property of the z-transform. Finally, we gave an explicit formula for the inverse z-transform, and described a straightforward procedure for computing it using power series. If you do not feel completely comfortable with the geometric series, this is a good time to brush up on the subject.
Related Rhea pages (please feel free to comment/discuss directly on these pages):
- Some tricks to deal with the geometric series (from William Schmidt)
- Yes, the geometric series also holds for complex numbers!
- Be careful if the argument is equal to one!!!
- Please consider writing a page on the geometric series! (You will get up to 0.5% bonus points for doing so, depending on the quality/content.)
The third homework is due next Wednesday. It basically consists in computing the inverse z-transforms of the signal you used in HW2 and in doing the peer review of HW2.
Did everybody hand in their homework 2 in the "Assignment 2" box in Prof. Mimi's dropbox? Note that this is NOT the same as Prof. Mimi's dropbox.
Previous: Lecture 6; Next: Lecture 8