Solve the LP problem. If no optimal solution exists, indicate whether the feasible region is empty or the objective function is unbounded. (Enter EMPTY if the region is empty. Enter UNBOUNDED if the function is unbounded.) Maximize and minimize p = 2x - y subject to Minimum: p = (x, y) = Maximum: p= x + y23 x-y≤3 x-y2-3 x≤ 8, y ≤ 8. -8 x 0,3 11 ✔ (x, y) = 8,5 )

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Finite Math - Solve Lin Prog Problems Graphically

Please note that I couldnt find the correct " Minimum P = " value. I tried entering -8 & 8, but both were incorrect. 

Solve the LP problem. If no optimal solution exists, indicate whether the feasible region is empty or the objective function is unbounded. (Enter EMPTY if the region is empty. Enter UNBOUNDED if the function is unbounded.)
Maximize and minimize p = 2x - y subject to
Minimum:
p =
(x, y)
x + y23
x-y≤3
x-y≥-3
x ≤ 8, y ≤ 8.
Maximum:
p =
-8 X
= (0,3
11
(x, y) = 8,5
Transcribed Image Text:Solve the LP problem. If no optimal solution exists, indicate whether the feasible region is empty or the objective function is unbounded. (Enter EMPTY if the region is empty. Enter UNBOUNDED if the function is unbounded.) Maximize and minimize p = 2x - y subject to Minimum: p = (x, y) x + y23 x-y≤3 x-y≥-3 x ≤ 8, y ≤ 8. Maximum: p = -8 X = (0,3 11 (x, y) = 8,5
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