6. Consider the linear feedback shift register (LFSR) with k - 5 5, p 2, and c- (11101). Then (a)...
(a) List the specication of an m-bit Linear Feedback Shift Register (LFSR). (b) An m-sequence is a maximal sequence that can be generated using an LFSR, show how you can construct a maximum output sequence from an m-bit LFSR. (c) What is the maximum period of the output sequence? (d) What is the linear span of an m-sequence?
5.28 The Verilog code in Figure P5.9 represents a 3-bit linear-feedback shift register (LFSR) This type of circuit generates a counting sequence of pseudo-random numbers that repeats after 2" - 1 clock cycles, where n is the number of flip-flops in the LFSR. Synthesize a circuit to implement the LFSR in a chip. Draw a diagram of the circuit. Simulate the circuit's behavior by loading the pattern 001 into the LFSR and then enabling the register to count. What is...
Consider the LSFR (Linear Feedback Shift Register) with 4 register. Suppose the first 8 bits of the output stream are 0010 0011. What are the secret key(s)?
1) Consider a (15,5) linear block code (cyclic) in systematic form. The generator polynomial is given as. g(x) = 1 + x + x2 + x5 + x + x10. a. Design and draw the circuit of the feedback shift register encoder and decoder.(6 Marks) b- Use the encoder obtained in part a to find the code word for the message (11101] (Assume the right most bit is the earliest bit) (5 Marks) c- Repeat the steps of part b...
1) Consider a (15,5) linear block code (cyclic) in systematic form. The generator polynomial is given as g(x) = 1 + x + x2 + x5 + x + x10. a. Design and draw the circuit of the feedback shift register encoder and decoder (6 Marks) b. Use the encoder obtained in part a to find the code word for the message (10110). (Assume the right most bit is the earliest bit) (5 Marks) C. Repeat the steps of part...
1) (6 pts) A message M = 11101 is to be transmitted from node A to node B using CRC coding. The CRC generator polynomial is G(x) = x2 + 1. a) (2 pts) What is the derived CRC code? Perform the polynomial long division to find this result. (b) (2 pts) Suppose transmitter applies Non-Return-to-Zero Inverted (NRZI) to convert the binary stream of message along with the CRC code to the analog form. What will be the waveform? c)...
Consider the unity feedback system shown below R(s) C(s) Gp(s) 5(s+6 with G,(6)(s +2)(s+25) You are given that s+27s +55s+30 is a stable polynomial. a. What is the system type? For the questions below (in this Problem), set K-1 b. Determine the error constants Ko, K, and K, (also known as K,K, and K, c. Determine the steady-state errors eo, ei, and e2 (also known as epey, and e.) d. What is the steady-state error if the input is 5tu(t)?
2. Consider a unity feedback system, where (5+5 marks) P(s) = 5+1 K(s) = 548 Find values of a and B that assure (a) Zero steady-state error to a step command. (b) Steady-state error to a ramp command less than 0.01.
Consider a unity feedback control architecture where P(s) =
1/s^2 and C(s) = K * ((s + z)/(s + p)) . It is desired to design
the controller to place the dominant closed-loop poles at sd = −2 ±
2j. Fix the pole of the compensator at −20 rad/sec and use root
locus techniques to find values of z and K to place the closed–loop
poles at sd .
Problem 4 (placing a zero) Consider a unity feedback control architecture...
Problem 2 (50 pts): Consider the unity-feedback system: R(2) E(z) Y(2) K G(2) 2 G(2) = is the transfer-function of the plant and zero-order hold. (2 – 1)(z – 0.2) a) (5 points) Find the closed-loop transfer-function Hyr(2). b) (5 points) Find the characteristic polynomial. c) (20 points) Determine the range of K for closed-loop stability.