3. Strassen’s algorithm Question 3: Show the steps of Strassen's algorithm to multiply the following two 4 x4 matrices: X5 8 3 2 3 3 5 9 2 2 2 11 [5 4 2 11 Y7 1 4 4 15 7 4 2 To keep your answer shorter, you do not have to recursively apply Strassen's algorithm to the subproblem on 2X2 matrices. Question 3: Show the steps of Strassen's algorithm to multiply the following two 4 x4 matrices: X5...
7. + 0/10 points Previous Answers HarMathAp 12 3.2.025.MI. Use the matrices below. Perform the indicated operation. [8 3 21 [-1 4 1] A = 1 6 5 B = 1-5 4 2 (1 -3 -4 ] ( -5 11 -7] Find AB -33 86 0 -568322 34 -5223 It Need Help? Read It Watch It Master It Talk to a Tutor
Activity 15 - Matrices, Sequences and Conics Math 180 Task 6: Matrices and Cryptography messages. Using the following code, Matrices are used to encode and decode encrypted KİLİMİN 2 | 3 | 4 | 5 | 6 17 18 T-9 10111 | 12 | 13 | 14 一0一ㄧ一Pー1_Qー1.RT-s-T_T-I-U 15 16 17 18 19 20 21 ㄨㄧㄒㄧㄚ 1-2.TSPACE 24 25 26 ˇ一ㄒ一w 22 23 The sentence MATRICES ARE FUN becomes: AİRİE 13 1 20 189 3 5 19 0 1 18...
8. A different way to multiply two square matrices, called the Lie product and denoted A x B, is defined by A x B = AB - BA 1. (2 pts) Show A x B = -(B x A) 2. (4 pts) Show A ~ (B+C) (A x B) +(AXC) 3. (4 pts) Show Ax(B x C) + B x (C x A) + C (A x B) = 0
Matrices are used to encode and decode encrypted 6: Matrices and Cryptography messages. Using the following code, Task KİLİMİN | SPACE |-Z --T-T-u一ㄒㄧˇ-ㄒㄧ-w-ㄒㄧㄨㄧㄧㄧㄚ s116 17 18 19 20 21 22 23 24 25 26 The sentence MATRICES ARE FUN becomes: FİUİN AİRİE 0161211 14 9L3151 1910|111813 a. To encode the message, multiply by an invertible matrix A. Write the coded message in a 3x6 matrix, adding 0's for blanks. Calculate the product using a graphing calculator. [7-3-31「13 18 5 1...
Find the rank of each of the following matrices: [36 4 87 [18 2 -5 8 11 0] A= 2 7 1 9 B= 7 -4 C= 13 3 0 2 4 2 5 0 6 11 10 0 -6 2 2
1. Find the Jordan canonical forms of the following matrices 0 0 -1 (c) 7 6-3 (b) 2 3 2 1 0 4 0 1 -3 -10-8-6-4 0 -3 1 2 0-1 0 0 0 (d) 2 2 21-1 2 (e) 0-2-5-3 -2 0 6 85 4 0 -5 3-3 -2-3 4 1. Find the Jordan canonical forms of the following matrices 0 0 -1 (c) 7 6-3 (b) 2 3 2 1 0 4 0 1 -3 -10-8-6-4 0...
Find determinants of the following matrices: 1 5 7 -1 3 2 A= 3 2 8 B= 6 -2 3 C= 6 1 9 7 10 0 13 4 1 0 4 1 -7 2 3 -4 3 D= 4 12 -3 -9 2 6 7 8
4. Perform the operation B + BC with the given matrices: -2 -5 71 BE -8 1 2 4 C= 0 -4 10 -59 27 -55 -45 88 28 -11 O -51 -45 77 85 -54 -51 28 4 - 7 -54 24 3 -51 -3 27 - 85 -6 -7 -59 27 3 -47 This operation cannot be performed with these matrices.
7 47 1 2 3 b) Find the inverse of the matrix B slution- Multiply these two matrices: 0 7 1 -3 II 5 0 0 7 0 0 0 3 0 0 4 0 0 0 2 -1 oo