A. Fourier Transform properties
(a) If x ( t ) is real and even, show that its Fourier transform is real for all ω (i.e., its imaginary part is identically 0).
(b) If x ( t ) is real and odd, show that its Fourier transform is imaginary for all ω (i.e., its real part is identically 0)
B.Discrete-time Fourier Transform (DTFT)
B. Compute the DTFT of the following signals:
(a) a [ n ] = δ [ n − 2] + δ [ n + 2]
(b) b [ n ] = u [ n ] − u [ n − 4]
(c) c [ n ] = ( sin (( π/ 4) n )/ πn ) ^2
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