Recall that the Fourier transform of and the Fourier transform of
is
(a) Determine the Fourier transform of
and roughly sketch versus Q.
(b) Now consider the exponential sequence
where is some arbitrary frequency in the range
radians. Give the most general condition that
must satisfy in order for x(n) to be periodic with period P (P is a positive integer).
(c) Let y(n) be the finite-duration sequence
where is a finite-duration rectangular sequence of length N and where x(n) is not necessarily periodic. Determine
and roughly sketch
for
What effect does N have in
(d) Suppose that
P a positive integer
and
where I a positive integer. Determine and sketch the N -point DFT of y(n). Relate your answer to the characteristics of
(e) Is the frequency sampling for the DFT in part (d) adequate for obtaining a rough approximation of directly from the magnitude of the DFF sequence
If not, explain briefly how the sampling can be increased so that it will be possible to obtain a rough sketch of
from an appropriate sequence
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