Refer to Fig. 2.4.2 in p. 19 of the notes. Suppose that ho(t) = cos 2ant/T and hi(t) = sin 2ant/T for t€ (0, T) and both

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Refer To Fig 2 4 2 In P 19 Of The Notes Suppose That Ho T Cos 2ant T And Hi T Sin 2ant T For T 0 T And Both 1 (43.18 KiB) Viewed 29 times

Refer to Fig. 2.4.2 in p. 19 of the notes. Suppose that ho(t) = cos 2ant/T and hi(t) = sin 2ant/T for t€ (0, T) and both signals are zero otherwise. n is a positive integer. a) Find So(t) and S.(t). b) Suppose that the input signal is cos 2ant/T. Find the output signals on each of the two inputs to the box labeled "max." Refer to these inputs as Y and Y2, respectively. c) Repeat Part b) when the input signal is 4 cos 2ant/T + 3 sin 2ant/T. d) Find the Fourier transform of hi(t).