The maximum value of `z=7x+5y` subject to `2x+yle100,4x+3yle240,xge0,ygt0` is

Solve the linear programming problem graphically: Max: z=3x+2y Subject to: x+2yle10,3x+yle15,xge0,yge0

Consider the linear programming problem: Maximum z=50x+40y subject to constraints: x+2yle10 , 3x+4yge24 , x,yge0 Find the maximum value of z.

Consider the linear programming problem: Maximum z=50x+40y subject to constraints: x+2yle10 , 3x+4yge24 , x,yge0 Find the corner points of the feasible region.

Maximise Z=5 x+3 y Subject to 3 x+5 y le 15,5 x+2 y le 10, x ge 0, y ge 0

Consider the linear programming problem: Maximum z=50x+40y subject to constraints: x+2yle10 , 3x+4yge24 , x,yge0 Draw the feasible region.

Minimize and maximize z = x + 2y subject to x + 2y ge 100, 2x - y le 0 , 2x + y le 200, x , y ge 0 .

Solve the LPP: Maximize Z=-3x+4y Subject to x+2yle8 , 3x+2yle12 , xge0,yge0 .

Solve the following LPP Graphically, Maximise, Z=60x+15y Subject to constriants, x+yle50,3x+yle90,xge0,yge0

Consider the linear programming problem: Maximize z=4x+y Subject to constrains: x+yle50 , 3x+yle90 , x,yge0 Find the corner at which 'z' attains its maximum value.

Consider the LPP Maximise, Z=5x+3y Subject to, 3x+5yle15 , 5x+2yle10 , x,yge0 Find the corner points of the feasible region.