(New page: (a) Compute the energy E infinity y[n]=e^2+j4.71235n <n><math>lim</math> from T to -T as T goes to infinity |y[n]|^2 |y[n]|^2= (e^2.e^jw)^2 = e^4.1 = e^4 using the E infi...)
 
 
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=[e^4](2+2)
 
=[e^4](2+2)
 
=4e^4
 
=4e^4
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==Alternative Solutions==
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[[Problem 2 (2)_Old Kiwi]]

Latest revision as of 15:16, 3 July 2008

(a) Compute the energy E infinity

y[n]=e^2+j4.71235n <n>$ lim $ from T to -T as T goes to infinity |y[n]|^2 |y[n]|^2= (e^2.e^jw)^2

       = e^4.1
       = e^4

using the E infinity formula from the textbook

=[e^4](T-(-T) =2e^4T =inf

(b) lim T->inf and integrate from -2 to 2 because of function delta(t+2)-delta(t-2) Use the same formula above.

=[e^4](2+2) =4e^4

Alternative Solutions

Problem 2 (2)_Old Kiwi

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Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

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