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In Lecture 8, we presented the formula for the inverse z-transform and illustrated its use on a very simple example. We concluded that using the formula essentially boils down to comparing the power series of the z-transform with the formula for the z-transform (the trick we presented earlier). We discussed three important properties of the z-transform and gave a mathematical proof for one of them. We finished the lecture by beginning another example of computation of the inverse z-transform. | In Lecture 8, we presented the formula for the inverse z-transform and illustrated its use on a very simple example. We concluded that using the formula essentially boils down to comparing the power series of the z-transform with the formula for the z-transform (the trick we presented earlier). We discussed three important properties of the z-transform and gave a mathematical proof for one of them. We finished the lecture by beginning another example of computation of the inverse z-transform. | ||
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| + | ==Relevant Rhea Pages== | ||
| + | *[[Z_Transform_table|Table of z-transform pairs and properties]] | ||
==Action items == | ==Action items == | ||
Revision as of 12:47, 9 September 2011
Lecture 8 Blog, ECE438 Fall 2011, Prof. Boutin
Friday September 9, 2010 (Week 3) - See Course Outline.
In Lecture 8, we presented the formula for the inverse z-transform and illustrated its use on a very simple example. We concluded that using the formula essentially boils down to comparing the power series of the z-transform with the formula for the z-transform (the trick we presented earlier). We discussed three important properties of the z-transform and gave a mathematical proof for one of them. We finished the lecture by beginning another example of computation of the inverse z-transform.
Relevant Rhea Pages
Action items
Solve the following practice problems and share your answer on the corresponding pages:
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