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Unformatted text preview: 1 Solutions 77 36. Apply the inverse Laplace transform to the partial fraction expansion 37. Apply the inverse Laplace transform to the partial fraction expansion 38. Apply the inverse Laplace transform to the partial fraction expansion 39. Apply the inverse Laplace transform to the partial fraction expansion 40. Apply the inverse Laplace transform to the partial fraction expansion where The last equality is true since the product rule for derivatives implies that that is, the derivative of
evaluated at one of the roots is obtained
by deleting the term
from
and then evaluating at and this is
the same expression which is evaluated to put in the denominator of the
coeﬃcient .
41. This is directly from Table 2.3.
42. Apply the inverse Laplace transform to the partial fraction expansion 43. This is directly from Table 2.3. ...
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This note was uploaded on 12/22/2011 for the course MAP 2302 taught by Professor Bell,d during the Fall '08 term at UNF.
 Fall '08
 BELL,D

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