# Fourier Series – 4

4. In Fourier series expansion, Awill zero for _______ function and will be zero for _______ function.

(a) odd, odd
(b) odd, even
(c) even, odd
(d) even, even

Explanation
Explanation : No answer description available for this question. Let us discuss.
 Subject Name : Engineering Mathematics Exam Name : IIT GATE, UPSC ESE, RRB, SSC, DMRC, NMRC, BSNL, DRDO, ISRO, BARC, NIELIT Posts Name : Assistant Engineer, Management Trainee, Junior Engineer, Technical Assistant
 Engineering Mathematics Books Sale Elementary Engineering Mathematics (For I & II Semesters of... B.S. Grewal (Author); English (Publication Language); 623 Pages - 01/01/2004 (Publication Date) - KHANNA PUBLISHERS (Publisher) ₹ 463 Higher Engineering Mathematics Product Condition: No Defects; B. S. Grewal (Author); English (Publication Language); 1238 Pages - 01/01/1965 (Publication Date) - KHANNA PUBLISHERS (Publisher) ₹ 949 Sale Advanced Engineering Mathematics, 10ed, ISV Language Published: English; Erwin Kreyszig (Author); English (Publication Language); 1148 Pages - 01/01/2015 (Publication Date) - Wiley (Publisher) ₹ 968 Sale Engineering Mathematics for GATE & ESE (Prelims) 2019 -... Made Easy Editorial Board (Author); English (Publication Language); 472 Pages - 03/26/2018 (Publication Date) - Made Easy Publications (Publisher) ₹ 469

## Related Posts

• Fourier Series » Exercise - 12. The magnitude spectrum of a Fourier transform of a real-valued time signal has _______ symmetry. (a) no (b) odd (c) even (d) conjugate
Tags: fourier, series, exercise, odd, engineering, mathematics
• Fourier Series » Exercise - 1 6. The Fourier series for the function f(x) sin2x = is : (a) sinx + sin2x (b) 1 – cos2x (c) sin2x + cos2x (d) 0.5 – 0.5 cos2x
Tags: fourier, series, exercise, function, engineering, mathematics
• Fourier Series » Exercise - 1 1. The Fourier transform of product of two time functions [f1(t)f2(t)] is given by : (a) [f1(ω) + f2(ω)] (b) [f1(ω) / f2(ω)] (c) [f1(ω) * f2(ω)] (d) [f1(ω) x f2(ω)]
Tags: fourier, series, engineering, mathematics
• Fourier Series » Exercise - 13. The trigonometric Fourier series of a periodic time function can have only ______ terms. (a) sine (b) cosine (c) sine and cosine  (d) dc and cosine
Tags: fourier, series, exercise, function, engineering, mathematics
• Fourier Series » Exercise - 15. The inverse Fourier transform of product of two time functions [f1(ω)f2(ω)] is given by : (a) [f1(t) + f2(t)] (b) [f1(t) * f2(t)] (c) [f1(t) / f2(t)] (d) [f1(t) x f2(t)]
Tags: fourier, series, exercise, engineering, mathematics