Take the function defined by the series f(t) = 2+1 cos(nat). Find the antiderivative which is in the form F(t) = Ct+2+1 an cos(nat) + b, sin(nπt), and such that F(0) = 7 C = ao = an = bn =

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Take the function defined by the series f(t) = 2+1 cos(nat).
Find the antiderivative which is in the form F(t) = Ct+2+1 an cos(nat) + bn sin(nπt), and such that F(0) = 7
C =
ao =
an =
bn
=
Transcribed Image Text:Take the function defined by the series f(t) = 2+1 cos(nat). Find the antiderivative which is in the form F(t) = Ct+2+1 an cos(nat) + bn sin(nπt), and such that F(0) = 7 C = ao = an = bn =
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