Optimal solution of the LPP, Maximize `Z=3x+4y` subject to the constraints `x+y<=7`, `x>=0,y>=0` is

Maximise Z=3x+4y Subject to the constraints x+yle4,xge0,yge0

Maximise Z=x+2y, subject to the constraints: x>=3,x+y>=5,x+2y>=6,y>=0

For the LPP , maximize z = x + 4y subject to the constraints x+2yle2,x+2yge8,x,yge0

Maximise Z=3x+4y, Subjected to the constraints x+y le1, x ge 0, y ge 0

Solving graphically,show that the following L.PP has an infinite number of optimal solutions.Minimize Z=x+y subject to the constraints 5x+9y =2,x =0,y>=0 Find also the minimum value of the objective function Z.

Show by graphical method that the following LPP has unbounded solution but it has an unique optimal solution,x=3,y=18 for the subject,Minimize Z=4x+2y subject to the constraints 3x+y>=27,-x-y =30, and x>=0,y>=0

Maximize Z=4x+9y, subject to the constraints x ge0,yge0,x+5yle200, 2x+3yle134,

Make a graphical r lake a graphical representation of the set of constraints the following L.PP Maximize Z=x+y subject to the constraints 5x+10y =1,y =0,y>0. Show that the L.PP has unique optimal solution.

The point which provides the solution to the LPP : Maximize 2x+3y subject to constraints x ge 0 , y ge 0, 2x+2y le 9, 2x + y le 7, x+2y le 8 is

Maximize P=8x+3y subject to the constraints: x+y le 3, 4x+y le 6, x ge 0, y ge0 is