Question

Find the augmented matrix of the linear system X +y+z= -8 X – 3y + 3z = -4 X – Y + 2z = -6. Use Gauss-Jordon elimination to transform the augmented matrix to its reduced row- echelon form. Then find the solution or the solution set of the linear system.

Answer 1

The augmented matrix is

The is, given linear x+y+z=-8 x-2 -3y + 3 == -4 x-y+27= -6 Hence the augmented matrix is, 1 1 1 -8 کا - 3 ew -4 1 - 1 -1 2

The row reduced echelon form of augmented matrix by Gauss-Jordon elimination method

Now, we are going to lese Gauss- Jondon elimination to transform the d matrix to its now- echelon form. augmented madrix 8 1 - - -3 ده -4 2 -I 6 -8 - R2 R2-R, 2 4 -4 لم 0 -6. - 2 1 1 - 8. 1 -4 2 1 2 R3 R3-R, 0 -2

8 0 -4 2 4 - 2 1 2 8 0 1 -112 - R2 - 1 R2 0 - 2 1 2 1 o 3121-77 RI RI-R2 0 - -1/ 2-1 - 2 1 2 2. 1 0 3/2 - 7 O -2 +1 +2 R₂ (-2) R2 O -2 1 2 1 3/2 1-7 A -2 1 2. R3 R3-R2 the So, row-reduced echelon form of the matrix, given augmented

And the solution set is