What happens if f(x) is an odd function? Express the following periodic function by a Fourier series. f(x) k TH -T -k 27 (a) The given function f(x) (Periodic rectangular wave) 1 1 1 1 Using the result in (e), calculate the value of 1--+--- - 3579 +....

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
Section: Chapter Questions
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2.
A periodic function is defined by f(x + p) = f(x), where p is the period of f(x). Assume a
periodic function is with period 27 and the inner product of 2 periodic functions is defined as
1
•2π
27 10²t* f.gdt.
(f.g) =
(a)
Please verify that = {1, cos x, cos 2x, ..., cos mx, .... sin x, sin 2x, ..., sin nx, ...} is
an orthogonal set in a Hilbert space defined in C([0, 27]) and m, n are positive integers.
(b)
Demonstrate that a periodic function f(x) with a period of 27 can be expressed as a linear
combination of ß by f(x) = a₁ + Σ(a, cos nx+b, sin nx) and find such a; and b¡. Such an
00
n=1
(c)
(d)
(e)
expression is called as Fourier series after the name of Joseph Fourier, a French
mathematician.
Prove that if f(x) is an even function, then all b;'s are 0.
What happens if f(x) is an odd function?
Express the following periodic function by a Fourier series.
f(x)
k
THE
0
-k
- [[]]
2π
(a) The given function f(x) (Periodic rectangular wave)
1
Using the result in (e), calculate the value of 1-
3
+
1 1 1
--+-
5 7 9
Transcribed Image Text:2. A periodic function is defined by f(x + p) = f(x), where p is the period of f(x). Assume a periodic function is with period 27 and the inner product of 2 periodic functions is defined as 1 •2π 27 10²t* f.gdt. (f.g) = (a) Please verify that = {1, cos x, cos 2x, ..., cos mx, .... sin x, sin 2x, ..., sin nx, ...} is an orthogonal set in a Hilbert space defined in C([0, 27]) and m, n are positive integers. (b) Demonstrate that a periodic function f(x) with a period of 27 can be expressed as a linear combination of ß by f(x) = a₁ + Σ(a, cos nx+b, sin nx) and find such a; and b¡. Such an 00 n=1 (c) (d) (e) expression is called as Fourier series after the name of Joseph Fourier, a French mathematician. Prove that if f(x) is an even function, then all b;'s are 0. What happens if f(x) is an odd function? Express the following periodic function by a Fourier series. f(x) k THE 0 -k - [[]] 2π (a) The given function f(x) (Periodic rectangular wave) 1 Using the result in (e), calculate the value of 1- 3 + 1 1 1 --+- 5 7 9
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