The value of `lambda` such that `x+3y+lambdaz=0,2x+4y-z=0,x+5y-2z=0` has a nontrivial solution is

If the system of the equations : x - ky-z=0, kx - y - z = 0, x+y-z=0 has a non - zero solution, then the possible values of k are :

If the system of equation : x + y + z = 0 , 2 x + 3y + 4z = 0 , kx + y - z = 0 has a non - zero solution , then the value of k is

Given, 2 x-y+2 z=2 x-2y+z=-4 x+y+lambda z=4 then the value of lambda such that the given system of equations has no solution is

Consider the system of equations in x, y, z as x sin3theta-y+z =0 x cos 2 theta+4 y+3 z =0 2 x+7 y+7 z =0 If this system has a non-trivial solution, then for any integer n, values of theta are given

The value of lamda for which the system of equations : x+y+z=6,x+2y=3z=10,x+4y+lamdaz=12 has a unique solution is :

Given 2x - y +2z=2,x -2y+z=-4, x +y +lamdaz=4, then the value of lamda such that the given system of equations has No solution is :

Find the value of lambda , such that the line (x-2)/(6)=(y-1)/(lambda) = (z+5)/(-4) is perpendicular to the plane 3x - y - 2z = 7 .

The system of linear equations x+y+z=2,2x+y-z=3, 3x+2y+kz=4 has a unique solution if

The value of a for which the system of equations a^3 x+(a+1)^3y+(a+2)^3 z=0 a x+(a+1) y+(a+2) z=0 x+y+z=0 has a non-zero solution is

The value of lamda for which the following system of equations does not have a solution x+y+z=6 4x+lamday-lamdaz=0 3x+2y-4z=-8