Description

This mock test of Fourier Analysis of Discrete Time Signals for GATE helps you for every GATE entrance exam.
This contains 10 Multiple Choice Questions for GATE Fourier Analysis of Discrete Time Signals (mcq) to study with solutions a complete question bank.
The solved questions answers in this Fourier Analysis of Discrete Time Signals quiz give you a good mix of easy questions and tough questions. GATE
students definitely take this Fourier Analysis of Discrete Time Signals exercise for a better result in the exam. You can find other Fourier Analysis of Discrete Time Signals extra questions,
long questions & short questions for GATE on EduRev as well by searching above.

QUESTION: 1

The discrete timefourier transform for the given signal x[n] - u[n] is

Solution:

where A is constant

The Fourier transform of odd real sequences must be purely imagenary, thus A = π

QUESTION: 2

The discrete time Fourier coefficients x[k] of the signal x [n ] =

Solution:

QUESTION: 3

The zero state respone y(k) for input f(k) = (0.8)^{k} u(k) is

Solution:

QUESTION: 4

Consider discrete time sequence

Solution:

QUESTION: 5

Consider a signal x(n) with following factors:

1. x(n) is real and even signal

2. The period of x(n) is N = 10

3. x(11) = 5

The signal x(n) is

Solution:

QUESTION: 6

Consider a discrete time signal x(n) = {-1, 2, -3, 2, -1} value of ∠x(e^{iω}) is equal to

Solution:

QUESTION: 7

A low pass filter with impulse response h_{1}(n) has spectrum H_{1} (e^{iω}) shown below.

Here only one period has been shown by reversing every second sign of h_{1}(n) a new filter having impulse response h_{2}(t) is created. The spectrum of H_{2}(e^{iω}) is given by

Solution:

QUESTION: 8

A red signal x[n] with Fourier transform x(e^{iΩ}) has following property:

1. x[n] = 0 for, n > 0

2. x [ 0] > 0

The signal x[n] is

Solution:

QUESTION: 9

A causal and stable LTI system has the property that,

The frequency response H(e^{iΩ}) for this system is

Solution:

QUESTION: 10

A 5-point sequence x[n] is given as 4 [- 3] = 1, x[ - 2] = 1, x[ -1 ] = 0 . x[0] = 5 , x[1] - 1

Let x(e^{iω}) denote the discrete time fourier transform of x[n].

The value of

Solution:

### Lecture 10 - Discrete-Time Fourier Series - Signals and Systems

Video | 50:22 min

### Lecture 11: Discrete-Time Fourier Transform - Signals and Systems

Video | 55:59 min

### Discrete Time Fourier Transform

Doc | 6 Pages

### Continuous and Discrete Time Signals

Video | 10:57 min

- Fourier Analysis of Discrete Time Signals
Test | 10 questions | 30 min

- Test: Discrete Time Signals
Test | 10 questions | 10 min

- Test: Discrete Time Signals & Useful Signals
Test | 20 questions | 15 min

- Fourier Analysis of Signals, Energy & Power Signals
Test | 10 questions | 30 min

- Test: Discrete Time System Analysis
Test | 10 questions | 10 min