The transfer function of a linear system is defined as the ratio of the Laplace transform of the output function y(t) to the Laplace transform of the input function g(t), when all initial conditions are zero. If a linear system is governed by the differential equation below, use the linearity property of the Laplace Y(s) transform and Theorem 5 to determine the transfer function H(s) = = G(s) system. y''(t) + 3y' (t) + 5y(t) = g(t), t> 0 Click here to view Theorem 5. H(s) = for this

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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The transfer function of a linear system is defined as the ratio of the Laplace
transform of the output function y(t) to the Laplace transform of the input
function g(t), when all initial conditions are zero. If a linear system is governed
by the differential equation below, use the linearity property of the Laplace
Y(s)
transform and Theorem 5 to determine the transfer function H(s) =
G(s)
system.
y'' (t) + 3y' (t) + 5y(t) = g(t), t> 0
Click here to view Theorem 5.
H(s) =
for this
Transcribed Image Text:The transfer function of a linear system is defined as the ratio of the Laplace transform of the output function y(t) to the Laplace transform of the input function g(t), when all initial conditions are zero. If a linear system is governed by the differential equation below, use the linearity property of the Laplace Y(s) transform and Theorem 5 to determine the transfer function H(s) = G(s) system. y'' (t) + 3y' (t) + 5y(t) = g(t), t> 0 Click here to view Theorem 5. H(s) = for this
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