2. In this exercise we show how the symmetries of a function imply certainproperties of its Fourier coefficients. Let f be a 27-periodic Riemann integrablefunction defined on R.(a) Show that the Fourier series of the function f can be written asf(0) ~ ƒ(0) + L (n) + ƒ(-n)] cos no + i[f(n) – ƒ(-n)] sin nô.n21(b) Prove that if ƒ is even, then f (n) = f(-n), and we get a cosine series.

Answered: Image /qna-images/answer/3dbe798c-bff1-4935-91c1-1e7cd7ee0ded.jpg

Answered: 2. In this exercise we show how the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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5) Find the Fourier coefficients ao, an, bn for the following periodic function: - 2
WHAT IS THE FOURIER EXPANSION OF THE PERIODIC FUNCTION WHOSE DEFINITION IN ONE PERIOD IS : F(t) = for -I
6) Find Fourier transform of: 1) 90 88 e-n(y² +y)(x-y)e-lx-yldy f 2) -πy² nye dy
3. For the function f(x) shown in the graph, f(x) determine the Fourier transform 1 g(a) = (x -icox dx . -1 1 -1 What is the limit of g(a) as a → 0? Is g(a) even, odd, or neither? Explain.
Suppose that f(t) is periodic with period [-T, 7) and has the following complex Fourier coefficients: -4, C1 —3+ 41, С2 —D —1- 21, C3 2. (A) Compute the following complex Fourier coefficients. C_3 = 2 C_2 =-1+2i C_1 = (B) Compute the real Fourier coefficients. (Remember that ei kt cos(kt) + i sin(kt).) ao = a1 = -6 , a2 = -2 , az = 4 b, = b2 = b3 = (C) Compute the complex Fourier coefficients of the following. (i) The derivative f' (t). Co = C1 = -4-31 C2 = C3 = (ii) The shifted function f(t + Co = C = C2 = C3 = (iii) The function f(3t). Co = C = C2 = C3 =
1 Practice with Fourier Transforms (**) For the listed functions A) through D), do the following: • Plot the function f(x) and its magnitude |ƒ(x)|. • Compute the Fourier transform of f(x): A) f(x) = e-|x| 1, B) f(x) = { 1 g(k) |x| ≤ 1 | • Compute and plot the magnitude |g(k)| as a function of k. • For each function and its transform, think about (but do not compute!) Parseval's Theorem: lg(k)|²dk = |f(x)|²da 0, otherwise = -∞ 1 √2π Lx f(x)e-iker dar (1) Based on your drawings of the function and its Fourier transform, which side of Parseval's theorem would be easier to compute? (2)
find the fourier trasnforms of the the function provided. Also can you write an explanantion of th eprocess to understand better.
A 2 -periodic function f: R! R is due to its values on [?; ] given:a) Sketch f (x) on the interval [?3; 3].b) Find the Fourier coefficients of f.
Sketch for the Fourier transform of f(x)

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