Q1(a) Using the technique of Gausian elimination, make each of the augented atrios below into row ocholon form. You do not need to sohe ang systems here. 0 1 1 1E 2 e 32 (a) 011 0 -10i3 2 (b2 -1 I-10 (e) 6 0 -2 2 2 06 -3 0 -2 -1i-3 1110is Q1(b) Sale the system of linear egations below. Do this by first writing out the system in aagrted matrix fem, then applying Gaussian Elimitation to make this matrix row echelon form and finally taing back subatitution to obtain the solution. 2r - ly + 6:- 14 2r + 3y - :- 2 10.

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Q1(a) Using the technique of Gaussian elimination, make each of the augmented matrices bekow into row echelon form. Yon do not noed to solve any systems here. 0 1 1 1: 2 2 -1 1 -1: 0 2: 2 0 -2 1 1 10:5 1 1 0 3 2 4 11: 2 0 -1 0: 3 1: 2 0: 1 6 -3 0 -2 -1 : (a) 0 (b) (c) Q1(b) Solve the system of linear equations below. Do this by first writing out the system in augmented matrix form, then applying Gaussian Eliminsation to make this matrix row echekon form and finally sing back-substitution to obtain the salution. 2r - ly + 6: = 14, 2r + 3y 2, 3r = 10.