Use product `[[1,-1,2],[0,2,-3],[3,-2,4]][[-2,0,1],[9,2,-3],[6,1,-2]]` to solve the system of equations`x-y+2z = 1, 2y - 3z = 1, 3x-2y+4z = 2`

Solve the system of equations: 2/x+3/y+10/z = 4, 4/x-6/y+5/z = 1, 6/x+9/y-20/z = 2

Solve the system of equations by matrix method : 2x+3y+4z=4 , x-2y-z=-2 , 3x-y+z=0

If A = [[2,-3,5],[3,2,-4],[1,1,-2]] find A^-1 . Using A^-1 solve the system of equations 2x-3y+5z = 11, 3x+2y-4z = -5, x+y-2z = -3

Examine the consistency of the system of equations : 3x-y-2z=2, 2y-2z=-1, 3x-5y =3

Solve the following system of equations using matrix method: x-y+2z=1 2y-3z=1 3x-2y+4z=2

Using matrix method, solve the following system of equations x + 2y - 3z = 1, 2x - 3z = 2, x + 2y = 3 .

Using matrix method, solve the following system of equations x + 2y - 3z = 1, 2x - 3z = 2, x + 2y = 3 .

If A=[(1,-2,1),(0,1-1,1),(2,0,-3)] , find A^(-1) and solve the system of equations x-2y+z=0,-y+z=-2,2x-3z=10

If A = [[2,-3,5],[3,2,-4],[1,1,-2]] , find A^-1 Using A^-1 , solve the system of linear equations : 2x - 3y + 5z = 11 , 3x + 2y - 4z = - 5 , x + y - 2z = - 3 .

Using matrices, solve the following system of equations : x + 2y - 3z = -4 2x + 3y + 2z = 2 3x - 3y - 4z = 11