Make a graphical representation of the set of constraints in the following LPP
Maximimize Z= x+y
Subject to the constraints
`5x+10y le50`
`x+y ge1`
and `x ge 0, y ge 0`
show that the LPP has unique optimal solution

Make a graphical representation of the set of constraints in the following LPP Maximize Z=3x+2y subject of the constraints xgt 4 , y gt 6 3x+2ylt18 and x,y gt0

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

Minimize Z=(3x+y) Subject ot the constraints : 2x+3y lt6 x+ygt1, and x gt 0, y gt 0

Given the LPP Max Z= 2x+3y Subject to the constraints 3x-y le -3 x-2y ge2 and xge 0,y ge 0 Graphically show that the LPP has no feasible solution

Solve the follwing LPP by the graphical method Min Z= 32x+y Subject to the constraints 2x+y ge 14 x-y ge 4 and x ge 0, y ge 0

Maximise Z=-x+2y , subject to the constraint, xge3, x+yge5, yge0

Make a graphical representation of the set of constraints in the following LPP Max Z=2x_(1)+x_(2) Subject to the contraints x_(1)+3x_(2) le 15 3x_(1)-4x_(2)le 12 x_(1) ge 0, x_(2) ge 0 Find the corner points of the convex set of feasible solution.

The maximum value of Z=3x+4y subject to the constraints x+y le 40, x+2y le 60, x ge 0 and y ge 0 is -

Solve graphically (if possible ) the following LPP: Maximize Z= 2x+3y Subject to the constaints : x+ygt1 2x+ylt0 and x,ygt0