Electronics and Communication Engineering (ECE) Exam  >  Electronics and Communication Engineering (ECE) Tests  >  GATE ECE (Electronics) Mock Test Series 2025  >  Test: Continuous Time Fourier Series - Electronics and Communication Engineering (ECE) MCQ

Test: Continuous Time Fourier Series - Electronics and Communication Engineering (ECE) MCQ


Test Description

8 Questions MCQ Test GATE ECE (Electronics) Mock Test Series 2025 - Test: Continuous Time Fourier Series

Test: Continuous Time Fourier Series for Electronics and Communication Engineering (ECE) 2024 is part of GATE ECE (Electronics) Mock Test Series 2025 preparation. The Test: Continuous Time Fourier Series questions and answers have been prepared according to the Electronics and Communication Engineering (ECE) exam syllabus.The Test: Continuous Time Fourier Series MCQs are made for Electronics and Communication Engineering (ECE) 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Continuous Time Fourier Series below.
Solutions of Test: Continuous Time Fourier Series questions in English are available as part of our GATE ECE (Electronics) Mock Test Series 2025 for Electronics and Communication Engineering (ECE) & Test: Continuous Time Fourier Series solutions in Hindi for GATE ECE (Electronics) Mock Test Series 2025 course. Download more important topics, notes, lectures and mock test series for Electronics and Communication Engineering (ECE) Exam by signing up for free. Attempt Test: Continuous Time Fourier Series | 8 questions in 30 minutes | Mock test for Electronics and Communication Engineering (ECE) preparation | Free important questions MCQ to study GATE ECE (Electronics) Mock Test Series 2025 for Electronics and Communication Engineering (ECE) Exam | Download free PDF with solutions
Test: Continuous Time Fourier Series - Question 1

If, f(t) = -f(-t)and f(t) satisfy the dirichlet conditions then f(t) can be expanded in a fourier series containing

Test: Continuous Time Fourier Series - Question 2

The trigonometric Fourier series expansion of an odd function shall have

1 Crore+ students have signed up on EduRev. Have you? Download the App
Test: Continuous Time Fourier Series - Question 3

A periodic triangular wave is shown in figure its fourier components will consists only of

Detailed Solution for Test: Continuous Time Fourier Series - Question 3

Since given wave has symmetry about origin, so it has odd symmetry. Therefore, it consists only odd sine terms.

Test: Continuous Time Fourier Series - Question 4

Determine the Fourier series coefficient for given periodic signal x(t) is

Detailed Solution for Test: Continuous Time Fourier Series - Question 4

Test: Continuous Time Fourier Series - Question 5

Consider the three continuous time signals with fundamental period of T = 1/2
x(t) = cos4πt
y(t) = sin 4πt
z(t) = x(t)·y(t)

The Fourier co-efficient of z(t) are given by

Detailed Solution for Test: Continuous Time Fourier Series - Question 5


Test: Continuous Time Fourier Series - Question 6

Consider a continuous time periodic signal x(t) given by

Detailed Solution for Test: Continuous Time Fourier Series - Question 6

Test: Continuous Time Fourier Series - Question 7

The Fourier series coefficient of time domain signal have been given. Determine the corresponding time domain signal and choose correct option.

Detailed Solution for Test: Continuous Time Fourier Series - Question 7

Test: Continuous Time Fourier Series - Question 8

The Fourier series for f(x) = sin2 x defined over the range -π ≤ x ≤ π is

Detailed Solution for Test: Continuous Time Fourier Series - Question 8

25 docs|263 tests
Information about Test: Continuous Time Fourier Series Page
In this test you can find the Exam questions for Test: Continuous Time Fourier Series solved & explained in the simplest way possible. Besides giving Questions and answers for Test: Continuous Time Fourier Series, EduRev gives you an ample number of Online tests for practice

Top Courses for Electronics and Communication Engineering (ECE)

Download as PDF

Top Courses for Electronics and Communication Engineering (ECE)