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Homework 2 Ben Horst: [[HW2-A Ben Horst _ECE301Fall2008mboutin| A]] :: [[HW2-B Ben Horst _ECE301Fall2008mboutin| B]] :: [[HW2-C Ben Horst _ECE301Fall2008mboutin| C]] :: [[HW2-D Ben Horst _ECE301Fall2008mboutin| D]] :: [[HW2-E Ben Horst _ECE301Fall2008mboutin| E]] | Homework 2 Ben Horst: [[HW2-A Ben Horst _ECE301Fall2008mboutin| A]] :: [[HW2-B Ben Horst _ECE301Fall2008mboutin| B]] :: [[HW2-C Ben Horst _ECE301Fall2008mboutin| C]] :: [[HW2-D Ben Horst _ECE301Fall2008mboutin| D]] :: [[HW2-E Ben Horst _ECE301Fall2008mboutin| E]] | ||
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Latest revision as of 05:59, 10 September 2008
Homework 2 Ben Horst: A :: B :: C :: D :: E
Part 1
The function I chose (at random) from homework1 can be found here.
The function x(t) = cos(t) is periodic in CT, as its period is 2$ \pi $. However, it is not periodic in DT.
Here is the function sampled at a frequency of 5 samples/unit:
Here is the function sampled at $ {\pi \over 2} $ (as closely as MATLAB is able to approximate pi)
Notice that the first image of values (from the first sampling) are not periodic. There is no integer 'N' such that sampling(n) = sampling(n+N).
However, in the second case, this does occur. One may observe that sampling(n) = sampling(n+10). Thus, the second case is periodic.
Part 2
Another non-periodic function taken at random (found here) is log(x).
In order to form a periodic signal, we can take a section of a non-periodic function and repeat it on to infinity to form a periodic function.
Take for example the following MATLAB code that will repeat a section of log(x):
delta = .0001; period = 5; repetitions = 5; t = [delta:delta:period]; a = log(t); c = []; for i=1:repetitions c = [c,a]; end t = [delta:delta:period*repetitions]; plot(t,c)
Note that the code only repeats the function over a finite interval, it simply is meant to demonstrate how it this would be done.
