B = C = 12 X 0 Use the correspondence scheme above to convert the following to numeric values, in the form of a 3x8 matrix (8 columns of 3x1 vectors). Remember, the encryption/decryption process is down the first column, then to the next column, so the first column should be the equivalent of MAR in the plaintext below. If necessary, use space(s) at the end to fill in your matrix. Don't forget the spaces and period! Name your plaintext matrix B. MARY_HAD_A_LITTLE_LAMB. 17 D = A B 0 1 96 Calculate C=A*B. 373 24 70 28 PQ 15 16 7 0 Define the encryption matrix A= 8 14 0 24 17 5 3 21 2 584 C DE F G H 2 3 4 5 6 7 3 28 42 108; 191 0 R S T U V W X Y Z ? 17 18 19 20 21 22 23 24 25 26 27 28 28 19 11 8 19 11 4 I 8 28 392 330 144 JKL 9 10 11 11 0 12 88 531 610 472 324 647 119 610 461 173 57 1 26 28 372 MNO 12 13 14 606 605 Convert C into (mod 29). In other words, express each entry of C as its equivalent in (mod 29).

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B = C = 12 X 0 17 D = A 0 96 373 24 Calculate C=A*B. 70 28 P 15 7 B 1 584 Q 16 Use the correspondence scheme above to convert the following to numeric values, in the form of a 3x8 matrix (8 columns of 3x1 vectors). Remember, the encryption/decryption process is down the first column, then to the next column, so the first column should be the equivalent of MAR in the plaintext below. If necessary, use space(s) at the end to fill in your matrix. Don't forget the spaces and period! Name your plaintext matrix B. MARY_HAD_A_LITTLE_LAMB. 108 0 с 2 3 28 Define the encryption matrix A = 8 14 0 24 17 5 3 21 2 D 3 42 R S 17 18 647 119 0 28 E 4 11 T 19 F 5 U V W 20 21 22 23 8 19 G 6 19 H I 7 8 392 330 11 4 28 144 J 9 X Y Z 11 0 12 K L 10 11 88 610 461 173 57 ? 24 25 26 27 28 1 26 28 191 531 610 472 324 606 372 M 12 N O 13 14 605 Convert C into (mod 29). In other words, express each entry of C as its equivalent in (mod 29).