One of the corner points of the feasible region of inequalities gives

Define a corner point of a feasible region.

Define the feasible region.

Find the corner points of the feasible region of the linear programming problem;,Max Z=x : Subject to the constraints 3x+2y =0,y>=0

If 3x+4y ge 12, 2x+y le6, x ge0, y ge0 , then the corner points of the feasible region are

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:

Consider the following LPP: Maximize Z = 3x + 2y subject to the constraints: x + 2y le 10, 3x + y le 15, x, y ge 0 . (a) Draw the feasible region. (b)Find the corner points of the feasible region. (c) Find the maximum value of Z.

The corner points of the feasible region of the system of linear inequations x+yge2,x+yle5,x-yge0,x,yge0 are :

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) =