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Homework Problem: 1. Consider the following differential equation that governs a continuous-time system: (t) - 29/(t)...
2.6.1-2.6.62.6.1 Consider a causal contimuous-time LTI system described by the differential equation$$ y^{\prime \prime}(t)+y(t)=x(t) $$(a) Find the transfer function \(H(s)\), its \(R O C\), and its poles.(b) Find the impulse response \(h(t)\).(c) Classify the system as stable/unstable.(d) Find the step response of the system.2.6.2 Given the impulse response of a continuous-time LTI system, find the transfer function \(H(s),\) the \(\mathrm{ROC}\) of \(H(s)\), and the poles of the system. Also find the differential equation describing each system.(a) \(h(t)=\sin (3 t) u(t)\)(b)...
Question 3: A continuous-time system is modelled by the following differential equation y" ()+27' ()+ y(t) = x(1-1) (a) Find the transfer function and frequency response of this system, (10 marks) (b) Find the impulse response of this system. (10 marks) (e) Is the system stable? Explain (5 marks)
Consider a continuous time system given by the differential equation j(t) + 4y(t) + 4y(t) = 4ü(t) + 2i(t) + 4v(t). Suppose that the input v(t) is given by y(t) = e-2 u(t)where u(t)equals the step signal. Determine the corresponding response y(t), showing all your workings.
Problem 1 (25 points): Consider a system described by the differential equation: +0)-at)y(t) = 3ú(1); where y) is the system output, u) is the system input, and a(t)is a function of time t. o) (10 points): Is the system linear? Why? P(15 points): Ifa(t) 2, find the state space equations?
Problem 3: Consider the following system governed by the differential equation YOU +370 + 5 + 7420 + 9 y(t) = 11 440 + 13 u (t), where u (t) is the input for the system, and y(t) is the output for the system. a) (30 pts) Use the Laplace transform to derive the transfer function of the system. b) (30 pts) Express the transfer function in the standard form.
1. A Consider the following nonhomogeneous differential equation: j(t) + (a - b)y(t) - aby(t) = x(t). Assume a and b are both strictly positive. The answers to nearly all of the questions below will be in terms of a and b. (a) (5 points) Is this system internally stable or unstable? Why? (b) (10 points) For arbitrary inital conditions yo and yo, write the zero-input response (ZIR) for t > 0. (c) (10 points) Derive this system's impulse response...
Problem 1: Consider the continuous-time signal r(t) as shown in Figure 1. r(t) Figure 1: A continuous-time signal r(t) (a) Determine the fundamental period and the fundamental angular frequency of r(). 5 (b) Write down the equation for z(0) as the Fourier Series in exponential form and identify (c) Sketch the spectrum of this signal indicating the complex amplitudes and the frequen- points the Fourier Series coefficients. (15 points cies. [10 points
Consider a (continuous-time) linear system x=Ax + Bu. We introduce a time discretization tk-kAT, where ΔT = assume that the input u(t) is piecewise constant on the equidistant intervals tk, tk+1), , and N > 0, and N 1 a(t) = uk for t E [tk, tk+1). (a) Verify that the specific choice of input signals leads to a discretization of the continuous-time system x = Ax + Bu in terms of a discrete-time system with states x,-2(tr) and inputs...
Consider the continuous-time system given by the equation y(t) = (v *v)(t). Is this system time- invariant? If yes, give a proof; if no, show why not by giving a counterexample.
Consider a second order linear time invariant system represented by the following ordinary differential equation: 4. dx(t) dt dt dt Y (s) X(s) a. Find the transfer function H(s) of the system. (5 Points)