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

Given the LPP max Z=3x+4y subject ot the constraints 2x+3y le9 x-5yge-20 and x,ygt0 The LPP has

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

For the LPP, maximize z = x + 4y subject to the constraints x + 2y le 2, x +2y ge 8, x, y ge 0 .

Maximize Z = 6x + 8y subject to the constraints x + y le 6, 3x + y ge 6, x - y ge 0, x, y ge 0 graphically.

Given the LPP Max z=x+y Subject to the contraints x+2yle4 x+2y gt6 and x,y ge0 The given LPP has

Maximize z =2x + 3y subject to constraints x + 4y le 8, 3x + 2y le 14 , x ge 0, y ge 0 .

Maximize Z = 5x + 3y subject to the constraints: 3x + 5y le 15, 5x + 2y le 10, x ge 0, y ge 0

Maximize Z = 5x + 3y subject to the constraints : 2x + y le 8, x + 2y le 1 2, x ge 0, y ge 0 using graph.

Minimise z = 13x - 15y subject to the constraints : x+y le 7, 2x-3y+6 ge 0, x ge 0, y ge 0