Consider the function f(t) ==0,1,0,-2 ≤ t < -1-1

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0, Consider the function f(t) = 1, 0, -2 ≤ t < -1 −1≤t<1 1< t < 2 . Find the Fourier series on [-2, 2] for f. Describe the convergence properties of your Fourier series. Be sure to state what the Fourier series converges to point-wise at each point in the interval [-2 2].

0, Consider the function f(t) = 1, 0, -2 ≤ t < -1 −1≤t<1 1< t < 2 . Find the Fourier series on [-2, 2] for f. Describe the convergence properties of your Fourier series. Be sure to state what the Fourier series converges to point-wise at each point in the interval [-2 2].

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section: Chapter Questions

Problem 63RE

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Question

Consider the function f(t) =
=
0,
1,
0,
-2 ≤ t < -1
-1<t<1 .
1≤t < 2
(a) Find the Fourier series on [-2, 2] for f.
(b) Describe the convergence properties of your Fourier series. Be sure to state what the
Fourier series converges to point-wise at each point in the interval [-2 21.

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