Deck 21: Linear Programming

The graphical method is a practical method for solving product mix problems of any size,provided the decision maker has sufficient quantities of graph paper.

Linear programming is useful for allocating scarce resources among competing demands.

One assumption of linear programming is that a decision maker cannot use negative quantities of the decision variables.

A binding constraint has slack but does not have surplus.

The simplex method is an interactive algebraic procedure for solving linear programming problems.

A binding constraint is the amount by which the left-hand side falls short of the right-hand side.

In linear programming,each parameter is assumed to be known with certainty.

A constraint is a limitation that restricts the permissible choices.

Only corner points should be considered for the optimal solution to a linear programming problem.

The objective function Maximize Z = 3x² = 4y is appropriate.

A parameter is a region that represents all permissible combinations of the decision variables in a linear programming model.

The ________ represents all permissible combinations of the decision variables in a linear programming model.

________ is an assumption that the decision variables must be either positive or zero.

A(n)________ forms the optimal corner and limits the ability to improve the objective function.

________ represent choices the decision maker can control.

The ________ is an expression in linear programming models that states mathematically what is being maximized or minimized.

A modeler is limited to two or fewer decision variables when using the ________.

For an = constraint,only points ________ are feasible solutions.

________ is useful for allocating scarce resources among competing demands.

________ is the amount by which the left-hand side exceeds the right-hand side in a linear programming model.

A(n)________ is a value that the decision maker cannot control and that does not change when the solution is implemented.

The ________ problem is a one-period type of aggregate planning problem,the solution of which yields optimal output quantities of a group of products or services,subject to resource capacity and market demand conditions.

Each coefficient or given constant is known by the decision maker with ________.

If merely rounding up or rounding down a result for a decision variable is not sufficient when they must be expressed in whole units,then a decision maker might instead use ________ to analyze the situation.

________ is the amount by which the left-hand side falls short of the right-hand side in a linear programming model.

In linear programming,a ________ is a point that lies at the intersection of two (or possibly more)constraint lines on the boundary of the feasible region.

The ________ is the upper and lower limit over which the optimal values of the decision variables remain unchanged.

________ are the limitations that restrict the permissible choices for the decision variables.

The assumption of ________ allows a decision maker to combine the profit from one product with the profit from another to realize the total profit from a feasible solution.

A(n)________ is the marginal improvement in the objective function value caused by relaxing a constraint by one unit.

A snack food producer runs four different plants that supply product to four different regional distribution centers.The division operations manager is focused on one product,so he creates a table showing each plant's monthly capacity and each distribution center's monthly demand (both amounts in cases)for the product.The division manager supplements this table with the cost data to ship one case from each plant to each distribution center.Formulate an objective function and constraints that will solve this problem using linear programming.

Use the graphical technique to find the optimal solution for this objective function and associated constraints.
Maximize: Z=8A + 5B
Subject To:
Constraint 1 4A + 5B < 80
Constraint 2 7A + 4B < 120
A,B > 0
a.Graph the problem fully in the following space.Label the axes carefully,plot the constraints,shade the feasibility region,identify all candidate corner points,and indicate which one yields the optimal answer.

The interval over which the right-hand-side parameter can vary while its shadow price remains valid is the ________.

Provide three examples of operations management decision problems for which linear programming can be useful,and why.

What is the meaning of a slack or surplus variable?

________ occurs in a linear programming problem when the number of nonzero variables in the optimal solution is fewer than the number of constraints.

A producer has three products,A,B,and C,which are composed from many of the same raw materials and subassemblies by the same skilled workforce.Each unit of product A uses 15 units of raw material X,a single purge system subassembly,a case,a power cord,three labor hours in the assembly department,and one labor hour in the finishing department.Each unit of product B uses 10 units of raw material X,five units of raw material Y,two purge system subassemblies,a case,a power cord,five labor hours in the assembly department,and 90 minutes in the finishing department.Each unit of product C uses five units of raw material X,25 units of raw material Y,two purge system subassemblies,a case,a power cord,seven labor hours in the assembly department,and three labor hours in the finishing department.Labor between the assembly and finishing departments is not transferable,but workers within each department work on any of the three products.There are three full-time (40 hours/week)workers in the assembly department and one full-time and one half-time (20 hours/week)worker in the finishing department.At the start of this week,the company has 300 units of raw material X,400 units of raw material Y,60 purge system subassemblies,40 cases,and 50 power cords in inventory.No additional deliveries of raw materials are expected this week.There is a $90 profit on product A,a $120 profit on product B,and a $150 profit on product C.The operations manager doesn't have any firm orders,but would like to make at least five of each product so he can have the products on the shelf in case a customer wanders in off the street.
Formulate the objective function and all constraints,and clearly identify each constraint by the name of the resource or condition it represents.

Briefly describe the meaning of a shadow price.Provide an example of how a manager could use information about shadow prices to improve operations?

The CZ Jewelry Company produces two products: (1)engagement rings and (2)jeweled watches.The production process for each is similar in that both require a certain number of hours of diamond work and a certain number of labor hours in the gold department.Each ring takes four hours of diamond work and two hours in the gold shop.Each watch requires three hours in diamonds and one hour in the gold department.There are 240 hours of diamond labor available and 100 hours of gold department time available for the next month.Each engagement ring sold yields a profit of $9; each watch produced may be sold for a $10 profit.
a.Give a complete formulation of this problem,including a careful definition of your decision variables.Let the first decision variable,(X1),deal with rings,the second decision variable,(X2),with watches,the first constraint with diamonds,and the second constraint with gold.
b.Graph the problem fully in the following space.Label the axes carefully,plot the constraints,shade the feasibility region,plot at least one isoprofit line that reveals the optimal solution,circle the corner points and highlight the optimal corner point so found,and solve for it algebraically.(Show all your work to get credit.)

A small oil company has a refining budget of $200,000 and would like to determine the optimal production plan for profitability.The following table lists the costs associated with its three products.

Marketing has a budget of $50,000,and the company has 750,000 gallons of crude oil available.Each gallon of gasoline contributes 14 cents of profits,heating oil provides 10 cents,and plastic resin 30 cents per unit.The refining process results in a ratio of two units of heating oil for each unit of gasoline produced.This problem has been modeled as a linear programming problem and solved on the computer.The output follows:
Solution

Sensitivity Analysis and Ranges
Objective Function Coefficients

Right-Hand-Side Values

a.Give a linear programming formulation for this problem.Make the variable definitions and constraints line up with the computer output.
b.What product mix maximizes the profit for the company using its limited resources?
c.How much gasoline is produced if profits are maximized?
d.Give a full explanation of the meaning of the three numbers listed following.
First Number: Slack or surplus of 42500 for constraint 2.
Second Number: Shadow price of 0 for constraint 1.
Third Number: An upper limit of "no limit" for the right-hand-side value constraint 1.

A portfolio manager is trying to balance investments between bonds,stocks and cash.The return on stocks is 12 percent,9 percent on bonds,and 3 percent on cash.The total portfolio is $1 billion,and he or she must keep 10 percent in cash in accordance with company policy.The fund's prospectus promises that stocks cannot exceed 75 percent of the portfolio,and the ratio of stocks to bonds must equal two.Formulate this investment decision as a linear programming problem,defining fully your decision variables and then giving the objective function and constraints.

NYNEX must schedule round-the-clock coverage for its telephone operators.To keep the number of different shifts down to a manageable level,it has only four different shifts.Operators work eight-hour shifts and can begin work at either midnight,8 a.m.,noon,or 4 p.m.Operators are needed according to the following demand pattern,given in four-hour time blocks.

Formulate this scheduling decision as a linear programming problem,defining fully your decision variables and then giving the objective function and constraints.

Case: 1A + 1B + 1C ? 40
Cord: 1A + 1B + 1C ? 50
Assembly Department Labor: 3A + 5B + 7C ? 120
Finish Department Labor: 1A + 1.5B + 3C ? 60
Minimum Production for A: 1A + 0B + 0C ? 5
Minimum Production for B: 0A + 1B + 0C ? 5
Minimum Production for C: 0A + 0B + 1C ? 5
A very confused manager is reading a two-page report given to him by his student intern."She told me that she had my problem solved,gave me this,and then said she was off to her production management course," he whined."I gave her my best estimates of my on-hand inventories and requirements to produce,but what if my numbers are slightly off? I recognize the names of our four models W,X,Y,and Z,but that's about it.Can you figure out what I'm supposed to do and why?" You take the report from his hands and note that it is the answer report and the sensitivity report from Excel's solver routine.
Explain each of the highlighted cells in layman's terms and tell the manager what they mean in relation to his problem.
Microsoft Excel 10.0 Answer Report
Worksheet: Supplement D
Report Created: 1/26/2004 11:26:50 AM


Microsoft Excel 10.0 Sensitivity Report
Worksheet: Supplement D
Report Created: 1/26/2004 11:26:50 AM

What are some potential abuses or misuses of linear programming (beyond violation of basic assumptions)?

The Really Big Shoe Company is a manufacturer of basketball shoes and football shoes.Ed Sullivan,the manager of marketing,must decide the best way to spend advertising resources.Each football team sponsored requires 120 pairs of shoes.Each basketball team requires 32 pairs of shoes.Football coaches receive $300,000 for shoe sponsorship and basketball coaches receive $1,000,000.Ed's promotional budget is $30,000,000.The Really Big Shoe Company has a very limited supply (4 liters or 4,000cc)of flubber,a rare and costly raw material used only in promotional athletic shoes.Each pair of basketball shoes requires 3cc of flubber,and each pair of football shoes requires 1cc of flubber.Ed desires to sponsor as many basketball and football teams as resources allow.However,he has already committed to sponsoring 19 football teams and wants to keep his promises.
a.Give a linear programming formulation for Ed.Make the variable definitions and constraints line up with the computer output appended to this exam.
b.Solve the problem graphically,showing constraints,feasible region,and isoprofit lines.Circle the optimal solution,making sure that the isoprofit lines drawn make clear why you chose this point.(Show all your calculations for plotting the constraints and isoprofit line on the left to get credit.)

c.Solve algebraically for the corner point on the feasible region.
d.Part of Ed's computer output is shown following.Give a full explanation of the meaning of the three numbers listed at the end.Based on your graphical and algebraic analysis,explain why these numbers make sense.(Hint: He formulated the budget constraint in terms of $000.)
See the computer printout that follows.
Solver-Linear Programming
Solution

Sensitivity Analysis and Ranges
Objective Function Coefficients

First Number: The shadow price of 0.0104 for the "Const3" constraint.
Second Number: The slack or surplus of 6383 for the "Const1" constraint.
Third Number: The lower limit of 12.2807 for the "Const1" constraint.

What are the assumptions of linear programming? Provide examples of each.