The following linear programming problem has been solved by The Management Scientist.Use the output to answer the questions. LINEAR PROGRAMMING PROBLEM MAX 25X1+30X2+15X3 S.T. 1)4X1+5X2+8X3

Question

The following linear programming problem has been solved by The Management Scientist.Use the output to answer the questions.
LINEAR PROGRAMMING PROBLEM
MAX 25X1+30X2+15X3
S.T.
1)4X1+5X2+8X3<1200
2)9X1+15X2+3X3<1500
OPTIMAL SOLUTION
Objective Function Value = 4700.000

\begin{array} { c c c } \text { Variable } & \text { Value } & \text { Reduced Cost } \\\text { X1 } & 140.000 & 0.000 \\\text { X2 } & 0.000 & 10.000 \\\text { X3 } & 80.000 & 0.000\end{array}

\begin{array} { c c c } \text { Constraint } & \text { Slack/Surplus } & \text { Dual Price } \\1 & 0.000 & 1.000 \\2 & 0.000 & 2.333\end{array}

OBJECTIVE COEFFICIENT RANGES

\begin{array} { c c c c } \text { Variable } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \\\text { X1 } & 19.286 & 25.000 & 45.000 \\\text { X2 } & \text { No Lower Limit } & 30.000 & 40.000 \\\text { X3 } & 8.333 & 15.000 & 50.000\end{array}

RIGHT HAND SIDE RANGES

\begin{array} { c c c c } \text { Constraint } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \\1 & 666.667 & 1200.000 & 4000.000 \\2 & 450.000 & 1500.000 & 2700.000\end{array}

a.Give the complete optimal solution.
b.Which constraints are binding?
c.What is the dual price for the second constraint? What interpretation does this have?
d.Over what range can the objective function coefficient of x₂ vary before a new solution point becomes optimal?
e.By how much can the amount of resource 2 decrease before the dual price will change?f. What would happen if the first constraint's right-hand side increased by 700 and the second's decreased by 350?

Quizplus · Accepted Answer

The Answer of The following linear programming problem has been solved by The Management Scientist.Use the output to answer the questions. LINEAR PROGRAMMING PROBLEM MAX 25X1+30X2+15X3 S.T. 1)4X1+5X2+8X3<1200 2)9X1+15X2+3X3<1500 OPTIMAL SOLUTION Objective Function Value = 4700.000 $$\begin{array} { c c c } \text { Variable } & \text { Value } & \text { Reduced Cost } \ \text { X1 } & 140.000 & 0.000 \ \text { X2 } & 0.000 & 10.000 \ \text { X3 } & 80.000 & 0.000 \end{array}$$ $$\begin{array} { c c c } \text { Constraint } & \text { Slack/Surplus } & \text { Dual Price } \ 1 & 0.000 & 1.000 \ 2 & 0.000 & 2.333 \end{array}$$ OBJECTIVE COEFFICIENT RANGES $$\begin{array} { c c c c } \text { Variable } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \ \text { X1 } & 19.286 & 25.000 & 45.000 \ \text { X2 } & \text { No Lower Limit } & 30.000 & 40.000 \ \text { X3 } & 8.333 & 15.000 & 50.000 \end{array}$$ RIGHT HAND SIDE RANGES $$\begin{array} { c c c c } \text { Constraint } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \ 1 & 666.667 & 1200.000 & 4000.000 \ 2 & 450.000 & 1500.000 & 2700.000 \end{array}$$ a.Give the complete optimal solution. b.Which constraints are binding? c.What is the dual price for the second constraint? What interpretation does this have? d.Over what range can the objective function coefficient of x₂ vary before a new solution point becomes optimal? e.By how much can the amount of resource 2 decrease before the dual price will change?f. What would happen if the first constraint's right-hand side increased by 700 and the second's decreased by 350?

The Following Linear Programming Problem Has Been Solved by the Management