progrocklover
Mar24-11, 09:17 AM
http://i.imgur.com/VSkh4.jpg
For part i, I found that the answer is
F(w) = (4sinw - 4wcosw)/w^3
For part ii, I consider
[F(x)]^2 which is equal to 16[(xcosx - sinx)^2]/x^6
and then i tried to use the Convolution relation
[F(x)]^2 = Fourier Transform of [ f*f] = Fourier Transform of (integrate from -infinity to infinity[f(t-k)f(k)]dk)
However, the integration is not converge, so I think there must be some mistakes.
Please gives me some idea on this........
For part i, I found that the answer is
F(w) = (4sinw - 4wcosw)/w^3
For part ii, I consider
[F(x)]^2 which is equal to 16[(xcosx - sinx)^2]/x^6
and then i tried to use the Convolution relation
[F(x)]^2 = Fourier Transform of [ f*f] = Fourier Transform of (integrate from -infinity to infinity[f(t-k)f(k)]dk)
However, the integration is not converge, so I think there must be some mistakes.
Please gives me some idea on this........