Assumimg Out(0)=0 and RC=1
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Assumimg Out(0)=0 and RC=1
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The Laplace Transform of a function f(t) is defined as
The Laplace Transform of an integral is
The First Integration Theorem states
This can be proved using Integration by Parts
Consider the following substitutions
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The expression in square brackets is zero at both limits
The theorem is proved.
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You can read more about Laplace Transforms here.
| Copyright © Andrew Holme, 2004. |
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