- I The Generator Polynomial Of A Cyclic Code Is Given As G X 1 X X4 Draw The Diagram Of Feedback Shift Register E 1 (91.92 KiB) Viewed 51 times
i. The generator polynomial of a cyclic code is given as g(x) = 1 + x + x4 Draw the diagram of feedback shift register e
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i. The generator polynomial of a cyclic code is given as g(x) = 1 + x + x4 Draw the diagram of feedback shift register e
i. The generator polynomial of a cyclic code is given as g(x) = 1 + x + x4 Draw the diagram of feedback shift register encoder for the Linear Cyclic code (3 Marks) ii. Illustrate the encoding procedure with the message vector [10111 ] by using the states of the register(the right most bit is the earliest bit) and obtain the final codeword. (7 Marks) jii. Verify the codeword obtained in part c polynomial division method (3 Marks) iv. Derive a syndrome computation circuit for this code. (2 Marks) v. Let r=[ 1001101 ) be a received vector. Compute the syndrome of r(t). Display the contents of the syndrome register after each digit of r has been shifted into the syndrome computation circuit. (6 Marks) Compare the syndrome computation performed part v by performing polynomial division method. (4 Marks) vi.