The linear programming problem whose output follows determines how many red nail polishes, blue nail polishes, green nail polishes, and pink nail polishes a beauty salon should stock. The objective function measures profit; it is assumed that every piece stocked will be sold. Constraint 1 measures display space in units, constraint 2 measures time to set up the display in minutes. Constraints 3 and 4 are marketing restrictions.
MAX&emsp; &emsp; 100x1 + 120x2 + 150x3 + 125x4
Subject to &emsp; &emsp;1. x1 + 2x2 + 2x3 + 2x4 ? 108
&emsp; &emsp;&emsp; &emsp;2. 3x1 + 5x2 + x4 ? 120
&emsp; &emsp;&emsp; &emsp;3. x1 + x3 ? 25
&emsp; &emsp;&emsp; &emsp;4. x2 + x3 + x4 50
&emsp; &emsp;&emsp; &emsp;x1, x2, x3, x4 ? 0
Optimal Solution:
Objective Function Value = 7475.000
$$\begin{array} { c c c }
\text { Variable } & \text { Value } & \text { Reduced Costs } \
\hline \text { X1 } & 8 & 0 \
\text { X2 } & 0 & 5 \
\text { X3 } & 17 & 0 \
\text { X4 } & 33 & 0 \
\hline
\end{array}$$
$$\begin{array} { c c c }
\text { Constraint } & \text { Slack/Surplus } & \text { Dual Prices } \
\hline 1 & 0 & 75 \
2 & 63 & 0 \
3 & 0 & 25 \
4 & 0 & - 25 \
\hline
\end{array}$$ Objective Coefficient Ranges
$$\begin{array} { c c c c }
\text { Variable } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline \text { X1 } & 87.5 & 100 & \text { none } \
\text { X2 } & \text { none } & 120 & 125 \
\text { X3 } & 125 & 150 & 162 \
\text { X4 } & 120 & 125 & 150
\end{array}$$ Right Hand Side Ranges
$$\begin{array} { c c c c }
\text { Constraint } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline 1 & 100 & 108 & 123.75 \
2 & 57 & 120 & \text { none } \
3 & 8 & 25 & 58 \
4 & 41.5 & 50 & 54 \
\hline
\end{array}$$
-By how much can the amount of space decrease before there is a change in the profit?

Question

The linear programming problem whose output follows determines how many red nail polishes, blue nail polishes, green nail polishes, and pink nail polishes a beauty salon should stock. The objective function measures profit; it is assumed that every piece stocked will be sold. Constraint 1 measures display space in units, constraint 2 measures time to set up the display in minutes. Constraints 3 and 4 are marketing restrictions.
MAX&emsp; &emsp; 100x1 + 120x2 + 150x3 + 125x4
Subject to &emsp; &emsp;1. x1 + 2x2 + 2x3 + 2x4 ? 108
&emsp; &emsp;&emsp; &emsp;2. 3x1 + 5x2 + x4 ? 120
&emsp; &emsp;&emsp; &emsp;3. x1 + x3 ? 25
&emsp; &emsp;&emsp; &emsp;4. x2 + x3 + x4 > 50
&emsp; &emsp;&emsp; &emsp;x1, x2, x3, x4 ? 0
Optimal Solution:
Objective Function Value = 7475.000
 $$\begin{array} { c c c } 
\text { Variable } & \text { Value } & \text { Reduced Costs } \
\hline \text { X1 } & 8 & 0 \
\text { X2 } & 0 & 5 \
\text { X3 } & 17 & 0 \
\text { X4 } & 33 & 0 \
\hline
\end{array}$$ 
 $$\begin{array} { c c c } 
\text { Constraint } & \text { Slack/Surplus } & \text { Dual Prices } \
\hline 1 & 0 & 75 \
2 & 63 & 0 \
3 & 0 & 25 \
4 & 0 & - 25 \
\hline
\end{array}$$ Objective Coefficient Ranges
 $$\begin{array} { c c c c } 
\text { Variable } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline \text { X1 } & 87.5 & 100 & \text { none } \
\text { X2 } & \text { none } & 120 & 125 \
\text { X3 } & 125 & 150 & 162 \
\text { X4 } & 120 & 125 & 150
\end{array}$$ Right Hand Side Ranges
 $$\begin{array} { c c c c } 
\text { Constraint } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline 1 & 100 & 108 & 123.75 \
2 & 57 & 120 & \text { none } \
3 & 8 & 25 & 58 \
4 & 41.5 & 50 & 54 \
\hline
\end{array}$$
-By how much can the amount of space decrease before there is a change in the profit?

Quizplus · Accepted Answer

The Answer of The linear programming problem whose output follows determines how many red nail polishes, blue nail polishes, green nail polishes, and pink nail polishes a beauty salon should stock. The objective function measures profit; it is assumed that every piece stocked will be sold. Constraint 1 measures display space in units, constraint 2 measures time to set up the display in minutes. Constraints 3 and 4 are marketing restrictions.
MAX&emsp; &emsp; 100x1 + 120x2 + 150x3 + 125x4
Subject to &emsp; &emsp;1. x1 + 2x2 + 2x3 + 2x4 ? 108
&emsp; &emsp;&emsp; &emsp;2. 3x1 + 5x2 + x4 ? 120
&emsp; &emsp;&emsp; &emsp;3. x1 + x3 ? 25
&emsp; &emsp;&emsp; &emsp;4. x2 + x3 + x4 > 50
&emsp; &emsp;&emsp; &emsp;x1, x2, x3, x4 ? 0
Optimal Solution:
Objective Function Value = 7475.000
 $$\begin{array} { c c c } 
\text { Variable } & \text { Value } & \text { Reduced Costs } \
\hline \text { X1 } & 8 & 0 \
\text { X2 } & 0 & 5 \
\text { X3 } & 17 & 0 \
\text { X4 } & 33 & 0 \
\hline
\end{array}$$ 
 $$\begin{array} { c c c } 
\text { Constraint } & \text { Slack/Surplus } & \text { Dual Prices } \
\hline 1 & 0 & 75 \
2 & 63 & 0 \
3 & 0 & 25 \
4 & 0 & - 25 \
\hline
\end{array}$$ Objective Coefficient Ranges
 $$\begin{array} { c c c c } 
\text { Variable } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline \text { X1 } & 87.5 & 100 & \text { none } \
\text { X2 } & \text { none } & 120 & 125 \
\text { X3 } & 125 & 150 & 162 \
\text { X4 } & 120 & 125 & 150
\end{array}$$ Right Hand Side Ranges
 $$\begin{array} { c c c c } 
\text { Constraint } & \text { Lower Limit } & \text { Current Value } & \text { Upper Limit } \
\hline 1 & 100 & 108 & 123.75 \
2 & 57 & 120 & \text { none } \
3 & 8 & 25 & 58 \
4 & 41.5 & 50 & 54 \
\hline
\end{array}$$
-By how much can the amount of space decrease before there is a change in the profit?

The Linear Programming Problem Whose Output Follows Determines How Many