The corner points of the feasible region are A (50,50), B(10,50),C(60,0) and D (60,4) . The objective function is `P=(5)/(2)x+(3)/(2)y+410`. The minimum value of P is at point

The corner points of the feasible region are (800 , 400) , (1050,150) , (600,0) . The objective function is P=12x+6y . The maximum value of P is

The corner points of the feasible region of an LPP are (0,0),(0,8),(2,7),(5,4) and (6,0). The maximum value of the objective function Z = 3x + 2y is:

Corner points of the feasible region for an LPP are (0,2),(3,0),(6,0),(6,8) , and (0,5) . Let F = 4x+6y be the objective function. Determine the minimum value of F occurs at

The corner points of the feasible region are (4, 2), (5,0), (4,1) and (6,0) then the point of minimum z = 3.5x + 2y= 16 is at

The corner points of the feasible region are (0,3), (3,0), (8,0), (12/5,38/5) and (0,10) , then the point of maximum z = 6x + 4y= 48 is at

The corner point of the feasible solutions are(0,0) (3,0)(2,1)(0,7/3) the maximum value of Z= 4x+5y is

The corneer points of a feasible region, determined by a system of linear inequations, are (0,0),(1,0),(4,3),(2,1) and (0,1). If the objective function is Z = 2x - 3y, then the minimum value of Z is :

The corner points of a feasible region determined by a system of linear inequalities are (20,40),(50,100),(0,200) and (0,50). If the objective funtion Z=x+2y , then maximum of Z occurs at.

If a corner points of the feasible solutions are (0,10)(2,2)(4,0) (3,2) then the point of minimum Z=3x +2y is