![4-12 A discrete-time system is given by xIn+ 1] (a) Is the system BIBO-stable? Justify your (b) Is the system memoryless? Justify your (c) Is the system causal? Justify your answer. answer. answer.](http://img.homeworklib.com/questions/7fbca350-5c0b-11eb-9ba3-cf676ac92c88.png?x-oss-process=image/resize,w_560)
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4-12...
A system with input x(t) and output y(t) is described by y(t) = 5 sin(x(t)). Identify...
A system with input x(t) and output y(t) is described by y(t) = 5 sin(x(t)). Identify the properties of the given system. Select one: a. Non-linear, time invariant, BIBO stable, memoryless, and causal b. Non-linear, time invariant, unstable, memoryless, and non-causal c. Linear, time varying, unstable, not memoryless, and non-causal d. Linear, time invariant, BIBO stable, not memoryless, and non-causal e. Linear, time invariant, BIBO stable, memoryless, and non-causal 0
The impulse response of a discrete-time (DT) LTI system is given as a. State whether or...
The impulse response of a discrete-time (DT) LTI system is given as a. State whether or not the system is (i) memoryless, (ii) causal, (ii) stable. Justify your answers mathematically. b. Find an impulse response ho[n] such that the system with impulse response hln] + holn] (the parallel connection) is (i) a memoryless system, (ii) a causal system.
1. Consider a discrete-time system H with input x[n] and output y[n]Hn (a) Define the following...
1. Consider a discrete-time system H with input x[n] and output y[n]Hn (a) Define the following general properties of system H () memoryless;(ii BIBO stable; (ii) time-invariant. (b) Consider the DT system given by the input-output relation Indicate whether or not the above properties are satisfied by this system and justify your answer.
1) Determine if the discrete-time system,y[k] =x[k] +r·y[k−1]is linear / time-invariant / causal / memoryless. Show...
1) Determine if the discrete-time system,y[k] =x[k] +r·y[k−1]is linear / time-invariant / causal / memoryless. Show your work and explain each property. Start by assuming,x1[k]→y1[k], x2[k]→y2[k]. 2) Determine if the discrete-time system,y[k] =x[k] +rk·y[k−1]is linear / time-invariant / causal / memoryless. Show your work and explain each property. 3) For the system in part 1), if x[k] = 100·u[k−1] and y[k] = 0 for k<0, what is the range of values for r that makes this system BIBO stable? Show...
A system is given by: yt=5xt+1-3 Is the system BIBO stable? Justify Is the system memoryless?...
A system is given by: yt=5xt+1-3 Is the system BIBO stable? Justify Is the system memoryless? Explain Is the system causal? Explain Is the system time invariant? Justify Is the system linear? Justify What is the impulse response h(t) of the system? Is the system internally stable? If you could not figure out h(t) from part f, use the h(t) from the problem below. ht=5e-tut-u(t-4)
Will thumbs up if completed. Please show all work and have clear images, thank you. 5....
Will thumbs up if completed. Please show all work and have clear
images, thank you.
5. Determine whether the following LTI systems, whose impulse responses given below, are i) Memoryless ii) causal iii) stable systems. Justify your answers. (15 points) a. h[n] =(n-1)u[n] b. h[n]=a[n+4] - u[n-4] c. h[n] = (0.2)"u[-n]
Please help with parts D, E, and F. Properties are listed below 1-5. (signals and systems...
Please help with parts D, E, and F. Properties are listed below
1-5. (signals and systems course)
1.28. Determine which of the properties listed in Problem 1.27 hold and which do not hold for each of the following discrete-time systems. Justify your answers. In each example, y[n] denotes the system output and x[n] is the system input. (1) Memoryless (2) Time invariant (3) Linear (4) Causal (5) Stable x[n], x[n + 1], ns-I xln], n 2 1 x[n], n s...
i need all questions quickly. - Answer the following questions in details. 1) Determine whether the...
i need all questions quickly.
- Answer the following questions in details. 1) Determine whether the following signals are periodic or non-periodic. If they are periodic, find the fundamental period. a) b) te=cos(+1) 2) Find the even and odd parts of the following signals: x(t) = (1 + r) cos (104) X(t) = ejt 3) A discrete-time signal [n] is shown below. Sketch and label each of the following signals. (a) xn-21 (b) x[21] (c)--) (d) x[-n21 a) 4) Determine...
please answer them indetail. thanks 4. Let x(n) be a causal sequence. a) b) what conclusion...
please answer them indetail. thanks
4. Let x(n) be a causal sequence. a) b) what conclusion can you draw about the value of its z-transform x(z) at z 00, Use the result in part (a) to check which of the following transforms cannot be associated with a causal sequence (z-1* (z (1-^2-1)- i, x(z) = 321) iii, x(z) = A causal pole-zero system is BIBO stable if its poles are inside the unit circle. Consider now a pole- zero system...
Problem 3 Determine whether each of the following system is memoryless, stable. Justify your answer time-invariant,...
Problem 3 Determine whether each of the following system is memoryless, stable. Justify your answer time-invariant, linear, causal or (a) y(t)r(t -2)+x(-t2) b) y(t) cos(3t)(t) (c) y(t) =ar(r)dT d) y(t)t/3) (e) y(t) =
A system with input x(t) and output y(t) is described by y(t) = 5 sin(x(t)). Identify the properties of the given system. Select one: a. Non-linear, time invariant, BIBO stable, memoryless, and causal b. Non-linear, time invariant, unstable, memoryless, and non-causal c. Linear, time varying, unstable, not memoryless, and non-causal d. Linear, time invariant, BIBO stable, not memoryless, and non-causal e. Linear, time invariant, BIBO stable, memoryless, and non-causal 0
The impulse response of a discrete-time (DT) LTI system is given as a. State whether or not the system is (i) memoryless, (ii) causal, (ii) stable. Justify your answers mathematically. b. Find an impulse response ho[n] such that the system with impulse response hln] + holn] (the parallel connection) is (i) a memoryless system, (ii) a causal system.
1. Consider a discrete-time system H with input x[n] and output y[n]Hn (a) Define the following general properties of system H () memoryless;(ii BIBO stable; (ii) time-invariant. (b) Consider the DT system given by the input-output relation Indicate whether or not the above properties are satisfied by this system and justify your answer.
Will thumbs up if completed. Please show all work and have clear
images, thank you.
5. Determine whether the following LTI systems, whose impulse responses given below, are i) Memoryless ii) causal iii) stable systems. Justify your answers. (15 points) a. h[n] =(n-1)u[n] b. h[n]=a[n+4] - u[n-4] c. h[n] = (0.2)"u[-n]
Please help with parts D, E, and F. Properties are listed below
1-5. (signals and systems course)
1.28. Determine which of the properties listed in Problem 1.27 hold and which do not hold for each of the following discrete-time systems. Justify your answers. In each example, y[n] denotes the system output and x[n] is the system input. (1) Memoryless (2) Time invariant (3) Linear (4) Causal (5) Stable x[n], x[n + 1], ns-I xln], n 2 1 x[n], n s...
i need all questions quickly.
- Answer the following questions in details. 1) Determine whether the following signals are periodic or non-periodic. If they are periodic, find the fundamental period. a) b) te=cos(+1) 2) Find the even and odd parts of the following signals: x(t) = (1 + r) cos (104) X(t) = ejt 3) A discrete-time signal [n] is shown below. Sketch and label each of the following signals. (a) xn-21 (b) x[21] (c)--) (d) x[-n21 a) 4) Determine...
please answer them indetail. thanks
4. Let x(n) be a causal sequence. a) b) what conclusion can you draw about the value of its z-transform x(z) at z 00, Use the result in part (a) to check which of the following transforms cannot be associated with a causal sequence (z-1* (z (1-^2-1)- i, x(z) = 321) iii, x(z) = A causal pole-zero system is BIBO stable if its poles are inside the unit circle. Consider now a pole- zero system...
Problem 3 Determine whether each of the following system is memoryless, stable. Justify your answer time-invariant, linear, causal or (a) y(t)r(t -2)+x(-t2) b) y(t) cos(3t)(t) (c) y(t) =ar(r)dT d) y(t)t/3) (e) y(t) =
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