Revision as of 15:03, 19 September 2008 by Lee251 (Talk)

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$ e^{2jt} $ yields $ te^{-2jt} $ and $ e^{-2jt} $ yields $ te^{2jt} $

and the system is linear

since Euler's formulat states that : $ e^{jx} = \cos x + j\sin x \! $

$ e^{2jt} = \cos 2t + j\sin 2t \! $

and

$ e^{-2jt} = \cos -2t + j\sin -2t \! $ $ = \cos 2t - j\sin 2t \! $


$ \frac{e^{2jt}+e^{-2jt}}{2}=cos2t\! $

Putting $ cos2t $ as an input will yield $ \frac{te^{2jt}+te^{-2jt}}{2}=tcos2t=tcos-2t\! $

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