A dynamic system is described by a differential equation ä + i = 0, with initial conditions x(0) = a, i (0) = b. For finding the general solution of the system, the corresponding Laplace Transform of the differential equation is: O (s2 + s)· X(s) – b- sa - a

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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A dynamic system is described by a differential equation ä + i = 0, with initial conditions
x(0) = a, à(0) = b. For finding the general solution of the system, the corresponding Laplace
Transform of the differential equation is:
O (s? + s) · X(s) – b- sa - a
O (s? + s) · X(s)
O (s? + s) · X(s) – b – sa
O (s? + s) · X(s) – a – b
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Transcribed Image Text:A dynamic system is described by a differential equation ä + i = 0, with initial conditions x(0) = a, à(0) = b. For finding the general solution of the system, the corresponding Laplace Transform of the differential equation is: O (s? + s) · X(s) – b- sa - a O (s? + s) · X(s) O (s? + s) · X(s) – b – sa O (s? + s) · X(s) – a – b « Previous MacBook Pro DO esc F3 23 $ % & 1 2 3 4 7 8 Q E T Y A D F G K C V M col option command command option .. .- V -
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