Please solve 10.3.11) thanks 10.3.11) Verify that sin(t) – sin(2t) + sin(3t) – sin(4t) + · .= ; for -T < t

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Description: Please solve 10.3.11) thanks 10.3.11) Verify that sin(t) – sin(2t) + sin(3t) – sin(4t) + · .= ; for -T < t

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Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.4: Multiple-angle Formulas

Problem 28E

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Statements and Logic

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Please solve 10.3.11) thanks

10.3.11) Verify that sin(t) – sin(2t) + sin(3t) – sin(4t) + · .= ; for -T < t <n.
Use this to conclude that 1- +-+..
= 1.
T
%D
10.5.2) We know that fi (t) = 2(-1)* sin(nt) = t for -7 <t <n. Use this and the formulas for integration
n=D1
n
to compute the Fourier series of
a) f2(t) = t².

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