Determine the values of `lambda` for which the following system of equations x+y+3z=0,4x+3y+`lambda`z=0, 2x+y+2z=0 has
(i) a unique solution
(ii) a non-trivial solution.

For what value of mu the equations. x+y+3z=0,4x+3y+muz=0,2x+y+2z=0 have a (i) trivial solution (ii) non-trivial solution.

The system of equations x +2y+3z=1, x-y+4z=0, 2x+y+7z=1 has

Find the value of lambda for which the homogeneous system of equations: 2x+3y-2z=0 2x-y+3z=0 7x+lambday-z=0 has non-trivial solutions. Find the solution.

The system of linear equations x+y+z =2, 2x+y-z=3, 3x+2y+kz= has a unique solution if

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

Investigate for what values of lambda and mu the system of linear equations. x + 2y + z = 7, x + y + lambda z = mu , x + 3y - 5z = 5 . Has (i) no solution (ii) a unique solution (iii) an infinte number of solutions. (b) P prpresents the variable complex number z. Find the locus of P , if Re ((z+1)/(z+i)) = 1 .

Solve the following system of homogeneous equations. 3x+2y+7z=0,4x-3y-2z=0, 5x+9y+23z=0