Description
Problem 1. (15 points) Consider the following periodic signals x[n] and z[n], with period 3 each.
Can you relate the DTFS coefficients of x[n] with the DTFS coefficients of z[n]?
0
š„[š] 1 1
0
š§[š]
2
1 1
(Hint: Try to find a signal y[n] of period 3 such that z[n] = x[n] ~ y[n].)
Problem 2. (20 points) Determine the DTFTs of the following sequences:
(a). (10 points) x[n] =
1
2
nā3
u[n] +
1
3
n
u[n ā 1].
(b). (10 points) x[n] =
1
4
nā1
u[n] + cos
Ļ
3
n
.
Problem 3. (a). (10 points) Determine the IDTFT of the following:
X(ā¦) = Ļ
2
Ā· rect
ā¦
Ļ
6
Ā· e
āj2ā¦
where we define the rectangular function rect(Ā·) as
rect
ā¦
ā¦c
,



1, |ā¦| < ā¦c
0, ā¦c ⤠|ā¦| ⤠Ļ
(b). (5 points) Determine the following quantity for the same signal x[n] in (a):
Xā
n=āā
|x[n]|

