8 (1 point) Consider the following Gauss elimination: [10 0 1 0 1 1 0 0...
(1 point) Consider the following Gauss elimination: i [-9 | | |- |- |- |- |- |- | ſi 081 0 1 0 1 Lo 0 1] 100 0 0 1 EA A+ 0 EE, A O 0 0 1 -8 0 E, EEA 0 1 4 17 -7 7 0 3 0 1 0 0 0 What is the determinant of A? det(A) = (1 point) Given the matrix find all values of a that make A = 0....
Q.12 (1 point) Consider the following Gauss elimination 010 A 070EA 0 0 1 1 0 0 What is the determinant of A? det(A) -
Consider the following Gauss-Jordan reduction: Find... (1 point) Consider the following Gauss-Jordan reduction: TO -1 0 1 1 -9 -2 + Lo 0 1] 0 1 [o -1 O 0 0 1 -2 1] + [i 0 [o 0 -2 1 [ 100] [100] -1 0 → 0 -1 0 + 1010 = I 0 1 Lo 0 1] [o o 1] EZE, A EA E3E, E A E EZEE A Find E LEHEHEHE = 1 E3 = Write A...
Use Gauss elimination, compute the determinant of the matrix o 0 2 0-1 4 4 5 1 2 0 0 7 2 5 -1 5 6 5 0 -1 5 0 4 8
Need with help understanding gauss elimination in a simple way. −3x[2] + 7x[3] = 4 x[1] + 2x[2] − x[3] = 0 5x[1] − 2x[2] = 3 Use Gauss elimination with partial pivoting to solve for the x’s. As part of the computation, Calculate the determinant.
(1 point) Consider the following Gauss-Jordan reduction 1 0 0 200 → -2 0 01-11 00|→ 9 1 01 .10 1 01-1 E1A E2E1A E4E3E2E1A Find E2 as a product AEE E of elementary matrices 2 0 0 Write A as a product A- E EE'Eof elementary matrices 1 2 3 4 91 31
Solve with GAUSS Elimination in MATLAB 4. 4 1 0 4 5 3 1 2 -9 2 -1 5 Solve with GAUSS Elimination in MATLAB 4. 4 1 0 4 5 3 1 2 -9 2 -1 5
(1 point) Consider the following Gauss Jordan reduction: 0 BB-01-03-03 01) 08] [100] [100] 103000 [ 0 0 1 0 0 1 EEE, SA Find Write A as a product A E 'E'E', of elementary matrices
Use the Gauss-Jordan elimination process on the following system of linear equations to find the value of z. a) z = 5 b) z = 0 c) z = 4 d) z = 2 e) z = 3 f) None of the above. Use the Gauss-Jordan elimination process on the following system of linear equations to find the value of x. a) x = -10 b) x = -21 c) x = -11 d) x = 8 e) x =...
3 -5 0 1 0 2 0 0 Consider the matrix A= -1 -1 0 3 1 0 -3 2 Which of the following statements about the determinant of A is true? det(2A) = 2 det A det(-A) = det A O Multiplying any row of Aby -1 does not change det A Interchanging two rows of A does not change det A