6. Consider a continuous-time LTI system for which the input x(t) and output y(1) are related by differential equation: d'y(1)_dy(t) _2yt) = x(t) di dt Let X(s) and Y(s) denote the Laplace transforms of x(t) and y(t) , respectively, and let H(s) denote the Laplace transform of h(t) , the system impulse response. (a) Determine H(s) as a ratio of two polynomials in s. Sketch the pole-zero pattern of H(s). (b) Determine h(t) for each of the following cases: 1. The system is stable. 2. The system is causal. 3. The system is neither stable nor causal.

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6. Consider a continuous-time LTI system for which the input x(t) and output y() are related by
differential equation:
d'y(1) dy(t)
di?
-2y(1) = x(1)
dt
Let X(s) and Y(s) denote the Laplace transforms of x(t) and y(t) , respectively, and let H(s)
denote the Laplace transform of h(t) , the system impulse response.
(a) Determine H(s) as a ratio of two polynomials in s. Sketch the pole-zero pattern of H(s)..
(b) Determine h(t) for each of the following cases:
1. The system is stable.
2. The system is causal.
3. The system is neither stable nor causal.
Transcribed Image Text:6. Consider a continuous-time LTI system for which the input x(t) and output y() are related by differential equation: d'y(1) dy(t) di? -2y(1) = x(1) dt Let X(s) and Y(s) denote the Laplace transforms of x(t) and y(t) , respectively, and let H(s) denote the Laplace transform of h(t) , the system impulse response. (a) Determine H(s) as a ratio of two polynomials in s. Sketch the pole-zero pattern of H(s).. (b) Determine h(t) for each of the following cases: 1. The system is stable. 2. The system is causal. 3. The system is neither stable nor causal.
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