The system of equations x+2y-4z=3,2x-3y+2z=5 and x -12y +16z =1 has

Solve the system of equations x+2y+3z=1,2x+3y+2z=2 and 3x+3y+4z=1 with the help of matrix inversion.

Find A^(-1), where A=[1 2-3 2 3 2 3-3-4] . Hence solve the system of equations: x+2y-3z=-4,2x+3y+2z=2 , 3x-3y-4z=11

If A = [(5, -1, 4), (2, 3, 5), (5, -2, 6)] , find A^(-1) and use it to solve the following system of equation 5x - y + 4z = 5, 2x + 3y +5z = 2, 5x - 2y + 6z =-1

Examine the consistency of the system of equations x + y + z = 1 2x + 3y + 2z = 2 a x + a y + 2a z = 4

The number of solutions of the system of equations: 2x+y-z=7 x-3y+2z=1, x+4y-3z=5 is

If the system of equations 3x+y+z=1, 6x+3y+2z=1 and mux+lambday+3z=1 is inconsistent, then

If the system of equations x + 2y + 3z = 4, x+ py+ 2z = 3, x+ 4y +u z = 3 has an infinite number of solutions and solution triplet is

Find the solution of homogeneous system of equations: x -2y +z =0; x + y = z and 3x + 6y = 5z

The system of equations -2x+y+z=a x-2y+z=b x+y-2z=c has

The system of linear equations x - 2y + z = 4 2x + 3y - 4z = 1 x - 9y + (2a + 3)z = 5a + 1 has infinitely many solution for: