Code: A-06/C-04/T-04 Subject: SIGNALS & SYSTEMS
Time: 3 Hours Max. Marks: 100
NOTE: There are 11 Questions in all.
· Question 1 is compulsory and carries 16 marks. Answer to Q. 1. must be written in the space provided for it in the answer book supplied and nowhere else.
· Answer any THREE Questions each from Part I and Part II. Each of these questions carries 14 marks.
· Any required data not explicitly given, may be suitably assumed and stated.
Q.1 Choose the correct or best alternative in the following: (2x8)
a. The system described by the following transfer function is stable
(A) 
. (B)
.
(C) 
. (D)
.
b. If the z-transform of
x(n) is X(z) with ROC 
then the z-transform of 
a>0 and its
ROC are
(A)
. (B)
.
(C)
. (D)
.
c. Events A and B are not mutually exclusive, then P (A or B) equals
(A)
. (B)
.
(C) 
. (D) 
.
d. The power
spectral density 
of a wide sense stationary random
process X(t) satisfies the properties
(A)
.
(B)
.
(C)
.
(D)
.
e. The
system described by 
is
(A) linear, time varying and stable.
(B) nonlinear, time-invariant and unstable.
(C) nonlinear, time varying and stable.
(D) linear, time varying and unstable.
f. The convolution of a finite sequence with an infinite sequence
(A) may be a finite or infinite sequence.
(B) is always a finite sequence.
(C) is always an infinite sequence.
(D) cannot be found.
g. The Fourier
transform of 
is
(A)
. (B)
.
(C) 
. (D)
.
h. Three signals 
and 
are sampled at
the rate of 10 Hz. Let the resulting signals be 
, 
and 
. Then
(A)
.
(B)
.
(C) 
is different.
(D) 
is different.
PART I
Answer any THREE Questions. Each question carries 14 marks.
Q.2 a. (i) Sketch the spectrum of the signal resulting from sampling x (t) = cos2t
at 6 r/s.
(ii) Sketch the spectrum of the signal resulting from sampling x(t) of (i) at
3 r/s. (3+3=6)
b. Determine and sketch the magnitude and phase response of the system characterized by the difference equation
in the range 
. (8)
Q.3 a. Determine and sketch the magnitude and phase response of the linear time-invariant causal system described by the differential equation
. (4)
b. Find the impulse response of the system whose frequency response is given by
and
. (10)
Q.4 a. Show
that for an LTI system, when the input is 
, the output is of the form 
. How is 
related to the
impulse response of the system? (4)
b. Determine the spectrum of the triangular
pulse shown below. Determine also the value at d.c. and the lowest frequency
at which the spectrum is zero valued. (10)
Q.5 a. Show that the DTFT
of 
is 
. (3)
b. If
the DTFT of x(n) is 
, determine the DTFT of the signal
. (8)
c. State the conditions for the existence of Fourier series for a periodic function x (t) of period T. (3)
Q.6 a. Show that for a discrete-time LTI system to be stable, the necessary and sufficient condition is that the impulse response should be absolutely summable. (8)
b. Determine the following convolutions
.
(6)
PART II
Answer any THREE Questions. Each question carries 14 marks.
Q.7 a. Define the terms auto-correlation function and spectral density and write down the relationship between the two. (4)
b. Determine
the autocorrelation function and the spectral density of the sinusoidal process
where 
is a uniformly
distributed random variable over the interval 
. (10)
Q.8 a. A random variable X is uniformly distributed over the interval (a, b). Write down an expression for its probability density function and determine its probability distribution function. Sketch both functions. (7)
b. The random variable X is
uniformly distributed over the interval . Find the probability density
function of 
,
and its expected value. (7)
Q.9 a. Determine
the impulse response h(t) of a system having a double order pole at 
and a zero at 
, where a, b > 0
and 
.
It is also given that h(0) = 2. (7)
b. Determine the impulse response h(t) and the system function H(s) of an LTI causal system from the following facts
(i)
When the input to the system is 
, the output is 
; and
(ii)
h(t) satisfies the differential equation 
Where b is an unknown constant. Your answer must not contain any unknown constant. (7)
Q.10 a. Determine
the inverse Laplace transform of 
. (6)
b. Determine
the z-transform and its region of convergence for the signal 
for (i) a >
1 and (ii) a < 1. (8)
Q.11 a. Solve, by using the z-transform, the difference equation
. (8)
b. Find the z-transform and
its ROC for the signal 
. Also determine and sketch the
poles and zeros of the z-transform for N = 4. (6)