The corner points of the feasible region determined by the system of linear contraints are (0,0), (0,40),( 20,40),(60,20),(60,0). The objective function is Z=4x+3y. Compare the quantity in Column A and Column B.

The corner points of the feasible region determine by the system of linear constrainsts are (0,10) ,(5,5) ,(15,15),(0,20),Let Z=px +qy , where p,q gt0. Conditions on p and q so that the maximum of Z occurs at the point (15,15) and (0,20) is

Corner poins of the feasible region determned by the system of linear constrainsts are (0,3), (1,1), and (3,0). Let Z=px+qy. Where p, q lt 0 Condition on p and q, so that the minimum of Z occurs at (3,0) and (1,1) is

If the corner points of the feasible region for an L.P.P. are (0, 2), (3, 0), (6, 0), (6, 8) and (0, 5), then the minimum value of the objective function F=4x+6y occurs at

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 valur of F occurs at

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

The corner points of the feasible region of an LPP are (0,0), (0,8), (2,7),(5,4),and (6,4). the maximum profit P= 3x + 2y occurs at the point_____.

The corner points of the feasible region determined by the following system of linear inequalities: 2x+ylt=10 ,\ x+3ylt=15 ,\ x ,\ ygeq0\ a r e\ (0,0),\ (5,0),(3,\ 4)a n d\ (0,5)dotL e t\ Z=p x+q y ,\ w h e r e\ p ,\ q >0 . Condition on p\ a n d\ q so that the maximum of Z occurs at both (3,4) and (0,5) is p=q b. p=2q c. p=3q d. q=3p

The occurs point of the feasible region for an L.P.P. are (0, 3), (1, 1) and (3, 0). If objective function is Z =px+qy,p,qgt0 , then the condition on p and q so that the minimum of Z occurs at (3, 0) and (1, 1) is

Find the lengths of the medians of the triangle A (0, 0, 6),B (0, 4,0) and C (6,0,0)