1. Find the z-transform (ZT) of the discrete-time (DT) sequence provide the region of convergence (ROC)
3. For each of the following discrete-time sequences: (i) Find the Z-transform (ZT), if it exists, and plot the region of convergence (ROC) in the Z-plane (ii) Find the poles and zeros and plot them in the 2-plane (iii) Determine whether the DTFT of the sequence exists (a) x[n] = 8[n – 1] + 28[n – 3] (b) [n] = (0.9e-j*)" u[n + 2] – 2-ul-n - 1] (c) x[n] = 2-" un + 1]
Part 1 (Calculation): The Z-transform (ZT) converts a discrete time-domain signal, which is a sequence of real or complex numbers, into a complex frequency-domain representation. It is the equivalent of the Laplace transform for discrete systems. The one-sided ZT, used for causal signals and systems, is defined as follows: Consider the digital system (filter) described by the input/output difference equation and z-domain transfer function Hz: yn-0.88 yn-1=0.52 xn-0.4 xn-1 Hzz=Y(z)X(z)=0.52-0.4 z-11-0.88 z-1=0.52 z-0.4z-0.88 Assuming a unit step function input, i.e.,...
In-class Assignment 4 Z-transform OGY 8 2. Determine the z-transform and the associated region of convergence ROC 5) u(k) e2(k) = ( ) k u(k-1) 3. The error signal e(t) = Be-"u(t) is sampled at the rte of 20Hz. The z-transform of the resulting number sequence is E(c) , Determine B and a. -0.8 4. Determien the initial and value of the sequence e(k) if the E(z) is given be 2z E (z) = z2-1
True False Question 9 Consider the discrete-time signal a[k] with Z-transform, 2+3z-1 X(z) = and ROC /z/ > . Use long-division to find the signal value x [2]. You find that z[2] = O-1 None of the listed answers 0.5 2.
(40pts) Find the z transform of the following discrete-time signals. Please remember to include the "region of convergence" for each signal: (a) x(n)=3e * (n) +2 (4) (-1-1) +5d(n) (b) x(n)=nu(n-1) x(n) = 4 cos(ant)u(n) x(n) = 2 cos[0.27(n-1)Ju(n) (e) x(n)=(n-1) cos[@nju(n-1)
4. Find the z-transform (if it exists) and the corresponding region of convergence for each of the following signals. To the extent possible, use the properties of the z-transform to enable the re-use of standard results and reduce calculations. Simplify your expressions. (Recall that for real-valued signals, the transform should only have real-valued coefficients.) (a) z[n] = (1)(n-1) sin(竽幔)u[n-2] (b) x[n-2"u[n] + 0.5"u[n-2] (d)-[n] = n(j)nuln-3]
Question 18 (1 point) a then the associated time If X(z)=z/(z-a) with ROC of z]< sequence x(n) is Question 18 options: x(n)= -a'n u(-n) -a^n u(-n-1) - a^n | e^(-jwn) -a^n u(-n+1) None of the answers
10. Find the ROC of the Z-transform of x[n] (a) [:l> (6) 31 (0)1> (a) not (a), not (b) and not () 11. Calculate the DFT of the following discrete-time signal with: x[0] = 2, x[1] = -1, x[2] = 3, x[3] = -2. The value of the DFT required for this question is X(0). (a) 2 + j3. (b) 2-4, (c) 6, (d) not (a), not (b) and not e
b) Present your answer in part (a) in closed form c) What is the region of convergence (ROC)? Please do a, b, and c and show work please! Problem 1 Consider the foll owing waveform: rn 0 I1 TI 9 12 3 a) Find the z- transform of the following waveform. (8 points) Problem 1 Consider the foll owing waveform: rn 0 I1 TI 9 12 3 a) Find the z- transform of the following waveform. (8 points)
2. Find the region of convergence (if it exists) in the z plane, of the z transform of these signals: (a) x[n] = u[n] + [n] (b) x[n] = u[n] - u[n - 10] (c) x[n] = 4n un + 1] (Hint: Express the time-domain function as the sum of a causal function and an anticausal function, combine the z-transform results over a common denominator, and simplify.) (d) x[n] = 4n u[n - 1] (e) x[n] = 12 (0.85)" cos(2tn/10)...