An ordered pair `(alpha, beta)` for which the system of linear equations
`(1 + alpha) x beta y +z = 2`
`alphax + (1+beta)y+z = 3`
`alphax + beta y + 2z = 2`
has a unique solution, is

An ordered pair (alpha, beta) for which the system of linear equations (1+alpha)x+betay+z=2 , alphax+(1+beta)y+z=3 and alphax+betay+2z=2 has unique solution is: (a) (2,4) (b) (-3,1) (c) (-4,2) (d) (1,-3)

An ordered pair (alpha, beta) for which the system of linear equations (1+alpha)x+betay+z=2 , alphax+(1+beta)y+z=3 and alphax+betay+2z=2 has unique solution is: (a) (2,4) (b) (-3,1) (c) (-4,2) (d) (1,-3)

An ordered pair (alpha, beta) for which the system of linear equations (1+alpha)x+betay+z=2 , alphax+(1+beta)y+z=3 and alphax+betay+2z=2 has unique solution is: (a) (2,4) (b) (-3,1) (c) (-4,2) (d) (1,-3)

An ordered pair (alpha, beta) for which the system of linear equations (1+alpha)x+betay+z=2 , alphax+(1+beta)y+z=3 and alphax+betay+2z=2 has unique solution is: (a) (2,4) (b) (-3,1) (c) (-4,2) (d) (1,-3)

An ordered pair (alpha,beta) for which the system of linear equations (1+alpha)x+beta y+z=2alpha x+(1+beta)y+z=3 and alpha x+beta y+2z=2 has unique solution is: (a) (2,4)(b)(-3,1)(c)(-4,2)(d)(1,-3)

For what ordered pair (alpha, beta) the system of equations (1+alpha)x+betay+z=0, alphax+(1+beta)y+z=0 ax+betay+2z=0 has unique solution (A) (-3,1) (B) (2,4) (C) (-4,2) (D) (1,-3)

Consider the system of equations : x + y + z = 0 alpha x + beta y + gamma z = 0 alpha^(2) x + beta^(2) y + gamma^(2) z = 0 then the system of equations has

For what value(s) of alpha will the system of linear equations alphax + 3y = alpha - 3 and 12x + alpha y = alpha has a unique solution?

For what value(s) of alpha will the system of linear equations alphax + 3y = alpha - 3 and 12x + alpha y = alpha has a unique solution?

If alpha, beta are the roots of the equation x^(2)+alphax + beta = 0 such that alpha ne beta and ||x-beta|-alpha|| le alpha , then