(New page: ==Part B: The basics of linearity== <math>e^{2jt} \rightarrow linear-system \rightarrow te^{-2jt} </math> <math>e^{-2jt} \rightarrow linear-system \rightarrow te^{2jt} </math> From thes...) |
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From these two transformations we can tell that the system is as below: | From these two transformations we can tell that the system is as below: | ||
| − | <math>x(t) \ | + | <math>x(t) \rightarrow linear-system \rightarrow y(t) = tx(-t)</math> |
Revision as of 08:55, 18 September 2008
Part B: The basics of linearity
$ e^{2jt} \rightarrow linear-system \rightarrow te^{-2jt} $
$ e^{-2jt} \rightarrow linear-system \rightarrow te^{2jt} $
From these two transformations we can tell that the system is as below:
$ x(t) \rightarrow linear-system \rightarrow y(t) = tx(-t) $
