A causal closed-loop LTI system Q(s) with input x(t) and output y(t) is represented by the differential equation d^2 y(t)/d t^2 + dy(t)/dt + y(t) = dx(t)/dt with the feedback configuration shown in Figure 1. If G(s) = 1/s, determine H(s).

10.1 - A causal closed-loop LTI system Q(s) with input x(t) and output y(t) is represented by the differential equation d^2 y(t)/d t^2 + dy(t)/dt + y(t) = dx(t)/dt with the feedback configuration shown in Figure 1. If G(s) = 1/s, determine H(s).

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images - A causal closed-loop LTI system Q(s) with input x(t) and output y(t) is represented by the differential equation d^2 y(t)/d t^2 + dy(t)/dt + y(t) = dx(t)/dt with the feedback configuration shown in Figure 1. If G(s) = 1/s, determine H(s).

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