Solve the following linear programming problem :
Minimize `Z=3x_(1)+5x_(2)`
Subject to the constraints
`x_(1)+3x_(2) ge 32`
`x_(1)+x_(2)ge2`
`x_(1),x_(2)ge 0`

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Find the minimum value of Z=3x_(1)+5x_(2) subject to x_(1) +3x_(2)ge3,x_(1)+x_(2)ge2 and x_(1),x_(2)ge0

Solve the linear programming problem graphically x-5y+4ge0

Given the LPP Max Z= 3x_(1)+2x_(2) subject to the constraints 2x_(1)+x_(2) le2 3x_(1)+4x_(2)ge12 x_(1) ge 0 , x_(2)ge0 Draw the graphs of the constraints

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.

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