Solve the given LP problem on the right by using The Graphical Solution Method. a) Find the optimal solution, determine the solution type. b) Find the optimality range for the changes in the objective coefficient (LP): Max Z = 2X1 + 4X2 st. 3X1 + 2X2 s 12 Xi + 2X2 s 8 2X, + X2 2 2 X1, X2 2 0

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Solve the given LP problem on the right by
using The Graphical Solution Method.
a) Find the optimal solution, determine
the solution type.
b) Find the optimality range for the
changes in the objective coefficient
c2.
c) Find the feasibility range for the
changes in the Right Hand Side
(RHS) of one of the binding
constraints.

Solve the given LP problem on the right by
using The Graphical Solution Method.
a) Find the optimal solution, determine
the solution type.
b) Find the optimality range for the
changes in the objective coefficient
(LP): Max Z = 2X¡ + 4X2
%3D
st.
3X1 + 2X2 < 12
X1 + 2X2 3 8
X2 2 2
2X1 +
X1, X2 2 0
C2.
c) Find the feasibility range for the
changes in the Right Hand Side
(RHS) of one
of the binding
constraints.
Transcribed Image Text:Solve the given LP problem on the right by using The Graphical Solution Method. a) Find the optimal solution, determine the solution type. b) Find the optimality range for the changes in the objective coefficient (LP): Max Z = 2X¡ + 4X2 %3D st. 3X1 + 2X2 < 12 X1 + 2X2 3 8 X2 2 2 2X1 + X1, X2 2 0 C2. c) Find the feasibility range for the changes in the Right Hand Side (RHS) of one of the binding constraints.
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