Question
(Urgent please) In this problem we will study PID controllers in a state space representation. Consider the linear control system: x 1 = x2, x
(Urgent please)
In this problem we will study PID controllers in a state space representation. Consider the linear control system: x 1 = x2, x 2 = 2x1 3x2 u, y = x1.
1. Knowing that only y can be measured, design a stabilizing controller that only uses the measurement y. Relate the designed controller to a PD controller.
2. Assume now that the dynamics for x2 is affected by an unknown constant input c R, i.e.: x 2 = 2x1 3x2 u + c, and that the state x can be measured. Design a dynamic controller, i.e., a controller of the form: z = g(z, x), u = k(z, x), that guarantees limt x(t) = 0. Does the variable z converge? If so, to which value does it converge? How is this value related to c? Relate the designed controller to a PI controller.
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