For the system of linear equations `2x+3y+5z=9, 7x+3y-2z=8 and 2x+3y+lambda z=mu`
Under what condition does the above system of equations have unique solutions ?

For the system of linear equations 2x+3y+5z=9, 7x+3y-2z=8 and 2x+3y+lambda z=mu Under what condition does the above system of equations have infinitely many solutions ?

Consider the following for the next two itmes that follow : For the system of linear equations 2x+3y+5z=9.7x+3y-2z=8 and 2x+3y+lamda z=mu . Under what condition does the above system of equations have infinitely many solutions ?

Solve the given system of linear equations, x+2y+z=9, x+3y- 2z=-12, -2x+3y+2z=7

The system of linear equations x-y-2z=6.-x+y+z=mu,lambda x+y+z=3 has

The system of linear equations lambda x + y + z = 3 x - y - 2z = 6 -x + y + z = mu has

In vestigate the values of lambda and mu the system of linear equations 2x+3y+5z=9,7x+3y-5z=8, 2x+3y+ lambda z= mu , have (i) no solution (ii) a unique solution (iii) an infinite number of solutions.

If the system of linear equations x+y+z=6, x+2y+3z=14 and 2x +5y+ lambdaz=mu(lambda,mu ne R) has a unique solution if lambda is

If the system of linear equations x+y+z=6, x+2y+3z=14 and 2x +5y+ lambdaz=mu(lambda,mu ne R) has a unique solution if lambda is

Consider the system of equations x+y+z=5 x+2y+lamda^2z=9 x+3y+lamdaz=mu