CHAPTER 13: DISCRETE-TIME SIGNAL (TEXTBOOK SIGNALS AND SYSTEM BY MAHMOOD NAHVI 11. In an LTI system,...

CHAPTER 11: DISCRETE-TIME SIGNAL (TEXTBOOK SIGNALS AND SYSTEM BY MAHMOOD NAHVI)' 54. Given x(n) = 0.5nu(n),...

CHAPTER 11: DISCRETE-TIME SIGNAL (TEXTBOOK SIGNALS AND SYSTEM BY MAHMOOD NAHVI)' 54. Given x(n) = 0.5nu(n), sketch and label the following a) ?(? − 3) b) x(3 - n) c) ?(? + 3) d) ?(−? − 3)

An LTI discrete-time system has the impulse response h[n] = (1.2)^n * u[-n]. Find the system...

An LTI discrete-time system has the impulse response h[n] = (1.2)^n * u[-n]. Find the system response to a unit step input x[n] = u[n]. Please explain the shifting im having a hard time grasping the concept (especially for the U[-n+k] shift Note:u[n] is the unit step function

The signal x[n] is the input of an LTI system with impulse function of h[n]. x[n]...

The signal x[n] is the input of an LTI system with impulse function of h[n]. x[n] = (0.4)^n u[n] and h[n] = (0.2)^n u[n]. (a) What is the DTFT of the output of the LTI system? (b) What are the Energy density spectrums of the input and output signals? (c) What would be the inverse DTFT: X(w) = 1/(1-0.25e^-j(w-2)) (d) How would part (c) differ for the DTFT: X(w) = 1/(1-0.25e^-j(w-2)) + 1/(1-0.25e^-j(w+2))

For the LTI system described by the following system functions, determine (i) the impulse response (ii)...

For the LTI system described by the following system functions, determine (i) the impulse response (ii) the difference equation representation (iii) the pole-zero plot, and (iv) the steady state output y(n) if the input is x[n] = 3cos(πn/3)u[n]. a. H(z) = (z+1)/(z-0.5), causal system (Hint: you need to express H(z) in z-1 to find the difference equation ) b. H(z) = (1 + z-1+ z-2)/(1-1.7z-1+0.6z-2), stable system c. Is the system given in (a) stable? Is the system given in...

Problem 1 Consider the discrete-time LTI system characterized by the following difference equation with input and...

Problem 1 Consider the discrete-time LTI system characterized by the following difference equation with input and initial conditions specified: y[n] - 2 y[n-1] – 3 y[n-2] = x[n] , with y[0] = -1 and y[1] = 0, x[n] = (-1/2)n u[n-2]. ? Write a MATLAB program to simulate this difference equation. You may try the commands ‘filter’ or ‘filtic’ or create a loop to compute the values recursively. ? Printout and plot the values of the input signal, x[n] and...

Solve this signal problem. Suppose the output y[n] of a DT LTI system with input x[n]...

Solve this signal problem. Suppose the output y[n] of a DT LTI system with input x[n] is y[n-1] - 10/3y[n] + y[n+1] = x[n] The system is stable and the impulse response of h[n] = A1*(B1)^n*C1 + A2*(B2)^n*C2 is then, What is A1? What is B1? What is C1? What is A2? What is B2? What is C2?

An LTI system has an impulse answer of h[n] = a^(n)H[n], H[n] is the Heaviside step...

An LTI system has an impulse answer of h[n] = a^(n)H[n], H[n] is the Heaviside step function. Obtain the output y[n] from the system when the input is x[n]=H[n]. 2. Consider the discrete system defined by> y[n] - ay[n-1] =x[n] Find the output when the input is x[n] = Kb^(n)H[n], and y[-1]=y_(-1)\ Find the output when the input is x[n] = K ẟ [n], and y[-1]=a Find the impulse response when the system is initially at rest. Find the Heaviside...

Consider a causal LTI system described by the difference equation: y[n] = 0.5 y[n-1] + x[n]...

Consider a causal LTI system described by the difference equation: y[n] = 0.5 y[n-1] + x[n] – x[n-1] (a) Determine the system function H(z) and plot a pole-zero pattern in the complex z-plane. (b) Find the system response using partial fraction expansion when the input is x[n] = 2u[n]. Plot the result.

2. Consider the following impulse responses h[n] of linear time-invariant (LTI) systems. In each case, (i)...

2. Consider the following impulse responses h[n] of linear time-invariant (LTI) systems. In each case, (i) provide the transfer function H(z) (ZT of h[n]) and its ROCh, (ii) sketch the ROCh in the z-plane, (iii) mark the pole and zero locations of H(z) (on the same plot in the z-plane), and (iv) discuss whether or not the LTI system is stable. (a) h1[n] = (0.4)^n u[n] + (2 - 3j)^n u(n -2) (b) h2[n] = (0.2)^(n+2) u[n] + (2 -...

Using the facilities of numpy, write a python program that reads the input signal as a...

Using the facilities of numpy, write a python program that reads the input signal as a space separated sequence of numbers on one line, and the system impulse response as a space separated sequence of numbers on the next line, and outputs (on one line) the output of the DT LTI system. The input lines should be interpreted as x[0] x[1] x[2] ... x[N-1] h[0] h[1] h[2] ... h[M-1] and the output should be produced in the same order: y[0]...