Question: Problem Solution of Differential Equations using the Laplace Transform. Case #2: Repeated Roots. (Handout, pages 13-16 of 48) Use the method of Laplace transforms and

Problem Solution of Differential Equations using the Laplace Transform. Case #2:

Problem Solution of Differential Equations using the Laplace Transform. Case #2: Repeated Roots. (Handout, pages 13-16 of 48) Use the method of Laplace transforms and partial fractions expansion to obtain the solution Y(t), as a deviation from its initial steady-state condition y(0), of the following differential equations. The forcing function is the unit step function, x(t) = u(t). dy(t) dy(t) 18 + 24 dt? + 8 y(t) = 8x(t) - 5 dt dyt) dy(t) + 6 dt + yt) 2x(t) + 3 dt2

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