Deck 13: Introduction to Optimization Modeling

Reduced costs indicate how much the objective coefficient of a decision variable that is currently 0 or at its upper bound must change before that the value of that variable changes.

The set of all values of the decision variable cells that satisfy all constraints, not including the nonnegativity constraints, is called the feasible region.

(A) Determine how to minimize the total cost of meeting the next 3 quarters' demand. Assume that 1000 usable units are available at the beginning of quarter 1.
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(B) Referring to (A), the company wants to know how much money it would be worth to decrease the percentage of unsuitable items and/or the percentage of items that spoil. Write a short report that provides relevant information. Base your report on two uses of the SolverTable add-in: one where the percentage of unsuitable items decreases and the percentage of items that spoil stays at 10%; and one where the percentage of unsuitable items stays at 20% and the percentage of items that spoil decreases.

The divisibility property of LP models simply means that we allow only integer levels of the activities.

(A) Determine how to minimize the net cost incurred in meeting the demands for the next four months.
(B) Starting with the optimal solution to (A), use SolverTable add-in to see what happens to the decision variables and the total cost when the initial inventory varies from 0 (the implied value in (A)) to 100 in 10-units increments. How much lower would the total cost be if the company started with 10 units in inventory, rather than none? Would the same cost decrease occur for every 10-init increase in initial inventory?

(A) Find an optimal solution to the problem. What is the production plan, and what is the total revenue?
(B) Obtain a sensitivity report for the solution reported in (A). Which constraints are binding?
(C) What is the incremental contribution associated with adding an hour of assembly time? Over what range of increase is the marginal value valid?
(D) What is the value of additional capacity on the polisher? How much increase and decrease in this capacity is possible before a change occurs in the optimal production schedule?
(E) An advertising agency has devised a marketing plan for the Western Chassis Company that will increase the market for Deluxe chassis. The plan will increase demand by 75 Deluxe chassis per month at a cost of $100 per month. Should Western adopt the plan? Briefly explain why.
(F) Suppose that four more hours of chassis assembly time could be made available. How much would profit change?
(G) Suppose next that Western's marketing department proposes lowering the price for a standard chassis from $12 to $11.50 so that more can be sold (since there is slack under the demand constraint). Would the optimal solution change? Explain why, or why not.
(H) If Western could obtain 1,000 pounds more of raw material (steel or aluminum), which should it procure? How much should they be willing to pay per pound for the steel or aluminum? Explain your answer.
(I) In doing some contingency planning, Western thinks that the aging stamping machine will soon need to be taken down for repairs that could last 2 months and will cost $10,000. During that time, they can continue to operate by outsourcing the stamping at $2.50 per chassis (deluxe or standard), although the capacity will be reduced from 2,500 to 1,500. What will be the total cost to repair the stamping machine?

A farmer in Egypt owns 50 acres of land. He is going to plant each acre with cotton or corn. Each acre planted with cotton yields $400 profit; each with corn yields $200 profit. The labor and fertilizer used for each acre are given in the table below. Resources available include 150 workers and 200 tons of fertilizer.
(A) Formulate a linear programming model that will enable the farmer to determine the number of acres that should be planted cotton and/or corn in order to maximize his profit.
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(B) Find an optimal solution to the model in (A) and determine the maximum profit.
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(C) Implement the model in (A) in Excel Solver and obtain an answer report. Which constraints are binding on the optimal solution?
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(D) Obtain a sensitivity report for the model in (A). How much should the farmer be willing to pay for an additional worker?
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(E) Suppose the farmer hires 10 additional workers. Can you use the sensitivity analysis obtained for (D) to determine his expected profit? Would his planting plan change? Explain your answer.
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(F) Suppose the farmer now wants to hire 20 additional workers, instead of just 10. Can you use the sensitivity analysis obtained for (D) to determine his expected profit? Explain your answer.

A shadow price indicates how much a company would pay for more of a scarce resource.​

Proportionality, additivity, and divisibility are three important properties that LP models possess that distinguish them from general mathematical programming models.

Suppose the allowable increase and decrease for an objective coefficient of a decision variable that has a current value of $50 are $25 (increase) and $10 (decrease). If the coefficient were to change from $50 to $60, the optimal value of the objective function would not change.

Suppose the allowable increase and decrease for shadow price for a constraint are $25 (increase) and $10 (decrease). If the right hand side of that constraint were to increase by $10, the optimal value of the objective function would change.

A company produces two products. Each product can be produced on either of two machines. The time (in hours) required to produce each product on each machine is shown below: Each month, 600 hours of time are available on each machine, and that customers are willing to buy up to the quantities of each product at the prices that are shown below: The company's goal is to maximize the revenue obtained from selling units during the next two months.
What are the decision variables in this problem?

(A) Determine how to minimize the cost of meeting the demand for the next three weeks.
(B) Revise the model in (A) so that the demands are of the form , where is the original demand in month t, k is a factor, and is an amount of change in month t. Formulate the model in such away that you can use the SolverTable add-in to analyze changes in the amounts produced and the total cost when k varies from 0 to 10 in 1-unit increments, for any fixed values of the 's. For example, try this when = 2, = 5, and = 3. Describe the behavior you observe in the table. Can you find any "reasonable" 's that induce positive production levels in week 3?

It is often useful to perform sensitivity analysis to see how, or if, the optimal solution to a linear programming problem changes as we change one or more model inputs.

Shadow prices are associated with nonbinding constraints, and show the change in the optimal objective function value when the right side of the constraint equation changes by one unit.

(A) Verify that Mary should purchase 12 units of food 2 each day and thus oversatisfy the vitamin C requirement by 6 units.
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(B) Mary's husband has put his foot down and demanded that Mary fulfill the family's daily nutritional requirement exactly by obtaining precisely 12 units of vitamin A and 6 units of vitamin C. The optimal solution to the new problem will involve ingesting less vitamin C, but it will be more expensive, why?
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(C) Starting with the optimal solution to (B), use the SolverTable add-in to see what happens to the total cost when the vitamin A and vitamin C requirements both vary (independently) from 3 to 18 in 3-unit increments. That is, from a two-way table. Describe the behavior you observe. In particular, are the changes in total cost the same as you look across each row of the table? Are they the same as you look across each column of the table?

There is often more than one objective in linear programming problems.

When formulating a linear programming spreadsheet model, there is one target (objective) cell that contains the value of the objective function.

A chemical manufacturer produces two products, chemical X and chemical Y. Each product is manufactured by a two-step process that involves blending and mixing in machine A and packaging on machine B. Chemical X provides a $60/unit contribution to profit, while Chemical Y provides a $50 contribution to profit. The processing times for the two products on the mixing machine (A) and the packaging machine (B) are as follows: For the upcoming two-week period, machine A has available 80 hours and machine B has available 60 hours of processing time. Forecasts of the markets indicate that the manufacturer can expect to sell a maximum of 16 units of chemical X and 18 units of chemical Y.
What are the decision variables in this problem?

Adam Enterprises manufactures two products. Each product can be produced on either of two machines. The time (in hours) required to make each product on each machine is shown below: Each month, 500 hours of time are available on each machine, and also customers are willing to buy up to the quantities of each product at the prices shown below: The company's goal is to maximize the revenue obtained from selling units during the next two months.
(A) Determine how the company can meet its goal. Assume that Adam will not produce any units in either month that it cannot sell in that month.
(B) Referring to (A), suppose Adam wants to see what will happen if customer demands for each product in each month simultaneously change by a factor 1 + k. Revise the model so that you can use the SolverTable add-in to investigate the effect of this change on total revenue as k varies from -0.3 to 0.3 in increments of 0.1. Does revenue change in a linear manner over this range? Can you explain intuitively why it changes in the way it does?

It is instructive to look at a graphical solution procedure for LP models with three or more decision variables.

Write out an algebraic expression for the objective function in this problem.

There are generally two steps in solving an optimization problem: model development and optimization.

When formulating a linear programming spreadsheet model, there is a set of designated cells that play the role of the decision variables. These are called the objective cells.

All linear programming problems should have a unique solution, if they can be solved.

(A) Write out algebraic expressions for all of the constraints in this problem.
(B) Construct a graph of the feasible region for this problem, given the constraints you identified in (A).
(C) Describe how you would find the location of the optimal solution in the feasible region you graphed in (B).
(D) Use the procedure you described in (C) to identify the optimal production plan. Confirm your solution using Solver. What is the maximized profit?
(E) What constraints are binding on the optimal solution? Use your graphical solution to explain your answer.

All optimization problems include decision variables, an objective function, and constraints.

Binding constraints are constraints that hold as an equality.​

In general, the complete solution of a linear programming problem involves three stages: formulating the model, invoking Solver to find the optimal solution, and performing sensitivity analysis.

Nonbinding constraints will always have slack, which is the difference between the two sides of the inequality in the constraint equation.

The feasible region in a graphical solution of a linear programming problem will appear as some type of polygon, with lines forming all sides.

Linear programming problems can always be formulated algebraically, but not always on a spreadsheet.

The optimal solution to any linear programming model is a corner point of a polygon.

In determining the optimal solution to a linear programming problem graphically, if the objective is to maximize the objective, we pull the objective function line down until it contacts the feasible region.

Suppose an objective function has the equation: .
Then the slope of the objective function line is 2.

There are two primary ways to formulate a linear programming problem: the traditional algebraic way and with spreadsheets.

Suppose a constraint has this equation: Then the slope of the constraint line is -2.

Sinclair Plastics operates two chemical plants which produce polyethylene; the Ohio Valley plant, which produces 5000 tons per month, and the Lakeview plant, which can produce 7000 tons per month. Sinclair sells its polyethylene to three different GM auto plants: Grand Rapids (demand = 3000 tons per month), Blue Ridge (demand = 5000 tons per month), and Sunset (demand = 4000 tons per month). The costs of shipping between the respective plants is shown in the table below:
What are the decision variables in this problem?

When formulating a linear programming spreadsheet model, we specify the constraints in a Solver dialog box, since Excel does not show the constraints directly.

When the proportionality property of LP models is violated, we generally must use non-linear optimization.

Sinclair Plastics operates two chemical plants which produce polyethylene; the Ohio Valley plant, which produces 5000 tons per month, and the Lakeview plant, which can produce 7000 tons per month. Sinclair sells its polyethylene to three different GM auto plants: Grand Rapids (demand = 3000 tons per month), Blue Ridge (demand = 5000 tons per month), and Sunset (demand = 4000 tons per month). The costs of shipping between the respective plants is shown in the table below:
What are the constraints in this problem?

The additivity property of LP models implies that the sum of the contributions from the various activities to a particular constraint equals the total contribution to that constraint.

A company produces two products. Each product can be produced on either of two machines. The time (in hours) required to produce each product on each machine is shown below: Each month, 600 hours of time are available on each machine, and that customers are willing to buy up to the quantities of each product at the prices that are shown below: The company's goal is to maximize the revenue obtained from selling units during the next two months.
What is the objective function in this problem?

What is the objective function in this problem?

It helps to ensure that Solver can find a solution to a linear programming problem if the model is well-scaled, that is, if all of the numbers are of roughly the same magnitude.

​A decision support system is a user-friendly system where an end user can enter inputs to a model and see outputs, but need not be concerned with technical details.

A marketing research professor is conducting a telephone survey and needs to contact at least 160 wives, 140 husbands, 110 single adult males, and 120 single adult females. It costs $2 to make a daytime call and $4 (because of higher labor costs) to make an evening call. The table shown below lists the expected results. For example, 10% of all daytime calls are answered by a single male, and 15% of all evening calls are answered by a single female. Because of a limited staff, at most half of all phone calls can be evening calls. Determine how to minimize the cost of completing the survey.
What are the decision variables in this problem?

What are the decision variables in this problem?

The proportionality property of LP models means that if the level of any activity is multiplied by a constant factor, then the contribution of this activity to the objective function, or to any of the constraints in which the activity is involved, is multiplied by the same factor.

A company produces two products. Each product can be produced on either of two machines. The time (in hours) required to produce each product on each machine is shown below: Each month, 600 hours of time are available on each machine, and that customers are willing to buy up to the quantities of each product at the prices that are shown below: The company's goal is to maximize the revenue obtained from selling units during the next two months.
What are the constraints in this problem?

What are the constraints in this problem?

Sinclair Plastics operates two chemical plants which produce polyethylene; the Ohio Valley plant, which produces 5000 tons per month, and the Lakeview plant, which can produce 7000 tons per month. Sinclair sells its polyethylene to three different GM auto plants: Grand Rapids (demand = 3000 tons per month), Blue Ridge (demand = 5000 tons per month), and Sunset (demand = 4000 tons per month). The costs of shipping between the respective plants is shown in the table below:
What is the optimal shipping plan? What are the total costs in that case?

What is the objective function in this problem?

Find an optimal solution to the problem, assuming that the company will not produce any units in either month that it cannot sell in that month. What is the production plan, and what is the total revenue?