A feasible region of a system of linear inequalities is said to be ..., if it can be enclosed within a circle.

The feasible region of a system of linear inequalities is shown below. If the objective function is maximise Z = 25x + 15y, then the maximum value of Z occurs at:

The feasible region of a system of linear inequalities is shown shaded in the following graph . If the objective function is Z = ax + by where a,b are constants and the maximum of Z occurs at points A and D then :

The feasible region of a sytem of linear inequations is shown below. If Z = 2x + y, then the minimum value of Z is:

The feasible region by a system of linear inequalities is shown shaded in the given graph. If Z = 4x - 6y, then Z_("min") =

the corner points of the feasible region of a system of linear inequalities 3x + 5y le 15, 5x + 2y ge 10, x ge 0, y ge 0 , are:

The feasible region of a system of linear inequations is shown shaded in the following figure If Z =4x +3y," then "Z_(max) - Z_(min)=

If the corner points of a feasible region of system of linear inequalities are (15,20) (40,15) and (2,72) and the objective function is Z = 6x + 3y then Z_(max) - Z_(min) =

The corner points of the feasible region of a system of linear inequalities are (0, 0), (4,0), (3,9), (1, 5) and (0, 3). If the maximum value of objective function, Z = ax + by occurs at points (3, 9) and (1, 5), then the relation between a and b is:

Which of the following is a corner point of the feasible region of system of linear inequations 2x + 3y lt=6 , x + 4y lt= 4 and x, y gt= 0 ?

Solve the system of linear inequations: x + 2y le 10, 2x + y le 8 .