The system of equations: `x+y+z=5` `x+2y+3z=9` `x+3y+lambdaz=mu` has a unique solution, if `lambda=5,mu=13` (b) `lambda!=5` `lambda=5,mu!=13` (d) `mu!=13`

The system of equations: x+y+z=5 , x+2y+3z=9 and x+3y+lambdaz=mu has a unique solution, if (a) lambda=5,mu=13 (b) lambda!=5 (c) lambda=5,mu!=13 (d) mu!=13

The system of equations: x+y+z=5x+2y+3z=9x+3y+lambda z=mu has a unique solution,if lambda=5,mu=13(b)lambda!=5lambda=5,mu!=13(d)mu!=13

The system of equations : x+y+z =6 x+2 y+3 z =10 x+2 y+lambda z =mu has no solution for

Consider the system of equations x+y+z=6 x+2y+3z=10 x+2y+lambdaz =mu the system has unique solution if

Consider the system of equations x+y+z=6 x+2y+3z=10 x+2y+lambdaz =mu the system has unique solution if

Consider the system of equations x+y+z=6 x+2y+3z=10 x+2y+lambdaz =mu the system has unique solution if (a) lambda ne 3 (b) lambda =3, mu =10 (c) lambda =3 , mu ne 10 (d) none of these

The system of linear equations x+y-z=6,x+2y-3z=14 and 2x+5y-lambda z=9 has a unique solution (A) lambda=8( B )lambda!=8(C)lambda=7 (D) lambda!=7

The values of lambda and mu for which the system of equations x+y+z=6 x+2y+3z=10 x+2y+lambda z=mu have unique solution are (A) lambda!=3, mu in R ,(B) lambda=3 ,mu=10 ,(C) lambda!=3 ,mu=10, (D) lambda!=3 ,mu!=10

Consider the system of equations x+y+z=6 x+2y+3z=10 x+2y+lambdaz =mu the system has infinite solutions if (a) lambda ne 3 (b) lambda =3,mu =10 (c) lambda =3,mu ne 10 (d) lambda =3,mu ne 10

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