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<math>y(t) = \frac{t}{2} * (2cos(2t))</math> | <math>y(t) = \frac{t}{2} * (2cos(2t))</math> | ||
| − | + | <math>y(t) = t * cos{(2t)}</math> | |
Revision as of 08:36, 18 September 2008
So the input will be x(t) and output will be y(t).
x(t) = cos2t
after using Euler's Formula
$ x(t) = \frac{1}{2} * e^{2jt} + \frac{1}{2} * e^{-2jt} $
$ y(t) = t * x(-t) $
$ y(t) = \frac{t}{2} * (e^{-2jt} + e^{2jt}) $
$ y(t) = \frac{t}{2} * (cos(2t) - jsin(2t) + cos(2t) + jsin(2t)) $
$ y(t) = \frac{t}{2} * (2cos(2t)) $
$ y(t) = t * cos{(2t)} $
