The values of `lambda` and b for which the equations x+y+z=3, x+3y+2z=6, and x+`lambday`+3z=b have

Investigate the values of lambda and mu so that the equations 2x+3y+5z=9,7x+3y-2z=8,2x+3y+lambda.z=mu have (i) no solution,(ii)a anque solution and (iii)an infuute number of solutions

The value of lambda and mu for which the system of linear equation x+y+z=2 x+2y+3z=5 x+3y+lambda z= mu has infinitely many solutions are , respectively :

The values of x, y, z for the equations x-y+z=1, 2x-y=1, 3x+3y-4z=2 are

The values of x, y, z for the equations 5x-y+4z=5, 2x+3y+5z=2, 5x-2y+6z=1 are

The values of a and b, for which the system of equations 2x+3y+6z=8 x+2y+az=5 3x+5y+9z=b has no solution ,are :

The values of x, y, z for the equations x+y+z=6, 3x-y+2z=7, 5x+5y-4z=3 are

The number of real values of lambda for which the system of equations lambda x+y+z=0,x-lambda y-z=0,x+y-lambda z=0 will have nontrivial solution is

The values of lambda and mu such that the system of equations x + y + z = 6, 3x + 5y + 5z = 26, x + 2y + lambda z = mu has no solution, are :

The set of all values of lambda for which the system of linear equations x - 2y - 2z = lambdax x + 2y + z = lambday -x -y = lambdaz has a non-trivial solution