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Show that the system with impulse response h(t) = e-2t cos(10nt) u(t) • Is it stable?...
Exercise 2.5 response of the LTI system with impulse response h(t)-e cos(2t)u(t)
Question 3) Given a system with an impulse response of: h(t) = te-2t(U(t)-U(t-4)). Use MATLAB to compute the output of the system with an input of: x(t)-3(U(t -2)-U(t - 5) Question 3) Given a system with an impulse response of: h(t) = te-2t(U(t)-U(t-4)). Use MATLAB to compute the output of the system with an input of: x(t)-3(U(t -2)-U(t - 5)
3.21. An LTI system has the impulse response h()-u(t+7)-u(t-8) (a) Determine whether this system is causal (b) Determine whether this system is stable. (c) Find the system response to the input x(f) 8(t-2)-28(t+ 2)
The unit impulse response and the input to an LTI system are given by: h(t) u(t) - u(t - 4) x(t) e2[u(t)-u(t - 4)] x(t) 1 y(t) h(t) 1. Determine the output signal, i.e.y(t), you may use any method. 2. Is this system memoryless? Why? 3. Is this system causal? Why? 4. Is this system BIBO stable? Why?
Please love from a to e, thanks 3.19. An LTI system has the impulse response h(t) = e'ul-t). (a) Determine whether this system is causal. (b) Determine whether this system is stable. (c) Find and sketch the system response to the unit step input x(t) = u(t). (d) Repeat Parts (a), (b), and (c) for h(t) = e'u(t). (e) Determine whether the systems given before part (a) and in part (d) are memoryless
The impulse response of some LTI systems are given below. Determine which ones are stable and/or causal? e. hn] (-0.5)"u[n] (1.02)"u[1-n] ht)2u(t 2) -2t t h, h(t)-sin()
6) Consider the impulse response system, h(t) = (1 - e-0.51)u(t), determine whether the system is stable or not. Hint: use integral definition to prove it.
3. (20 points) A system has an impulse response given by h (t) sin (2t) rt (a) Find the frequency response function of this system H (w). (b) Find the frequency domain output Y (w) if the input to the system is z (t) cos (3t).
3. For following input/output system relationships, determine the impulse response h(t). Clearly show all the steps arriving to your answer. p(-)x(1-)a L(2- r)x(1)dr-L*-1)x(1)dr (10 points) y(t) a. b. (10 points) y(t) -00 4. (10 points) An LTI system has the impulse response: h(t) = 4e-0.75(-1)[u(t + 4) - u(t - 10)]. this system Causal or Non-Causal? You must justify your answer. A correct answer with no justification worth only 4 points Is 3. For following input/output system relationships, determine the...
Question 14 5 pua 14. Consider the system with impulse response: 1- h,[n] = u nl Which of these statements about the system is true? A. The system is stable, but not causal. B. The system is causal, but not stable. C. The system is both causal and stable. D. The system is neither causal nor stable. OB O c