The system of the linear equations `x + y – z = 6, x + 2y – 3z = 14 and 2x + 5y – lambdaz = 9 (lambda in R)` has a unique solution if

If the system of linear equations x + y + z = 6, x + 2y + 3z = 14 and 2x + 5y + lambdaz = mu , (lambda, mu in R) has a unique solution then find the values of lambda and mu .

The system of linear equations x +y+z =6, x+2y+3z= 14 and 2x+5y+ lambdaz=mu(lambda,mu in "RR") is consistent with unique solution if

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

If the system of linear equations x + y + z = 5 x + 2y + 2z = 6 x + 3y + lambda z = mu, (lambda, mu in R) has infinitely many solutions, then the value of lambda + mu is :

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

If the system of linear equations x+ y +z = 5 x+2y +2z = 6 x + 3y + lambdaz = mu, (lambda, mu in R) has infinitely many solutions, then the value of lambda + mu is

If the system of linear equations x+ y +z = 5 x+2y +2z = 6 x + 3y + lambdaz = mu, (lambda, mu in R) has infinitely many solutions, then the value of lambda + mu is

If the system of linear equation x+y+z=6,x+2y+3c=14 , and 2x+5y+lambdaz=mu(lambda,mu in R) has a unique solution, then lambda≠ 8 b. lambda=8,mu=36 c. lambda=8,mu!=36"" d. none of these

If the system of linear equation x+y+z=6,x+2y+3c=14, and 2x+5y+lambda z=mu(lambda,mu epsilon R) has a unique solution,then lambda=8 b.lambda=8,mu=36c.lambda=8,mu!=36