A continuous – time system is represented by the following differential equation, d²y(t) dy(t) + 7 dt + 6y(t) = 2 x(t). dt2 Compute the output response of the system where x(t) = 6 u(t) and the initial condition on the system are given by y(0) = 1 and dy(t) = 1 when t = 0. Apply the second order dt differential equation method.

A continuous – time system is represented by the following differential equation, d²y(t) dy(t) + 7 dt + 6y(t) = 2 x(t). dt2 Compute the output response of the system where x(t) = 6 u(t) and the initial condition on the system are given by y(0) = 1 and dy(t) = 1 when t = 0. Apply the second order dt differential equation method.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Please use the method mentioned and please show all calculations steps, so that I can understand well, and thank you for your help

A continuous – time system is represented by the following differential equation,
d²y(t)
dy(t)
+ 7
dt
+ 6y(t) = 2 x(t).
dt2
Compute the output response of the system where x(t) = 6 u(t) and the initial condition
on the system are given by y(0) = 1 and
dy(t)
= 1 when t = 0. Apply the second order
dt
differential equation method.

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