Deck 7: Introduction to Linear Programming

Increasing the right-hand side of a nonbinding constraint will not cause a change in the optimal solution.

It is possible to have exactly two optimal solutions to a linear programming problem.

The constraint 5x₁  2x₂  0 passes through the point (20,50).

An infeasible problem is one in which the objective function can be increased to infinity.

A redundant constraint is a binding constraint.

Decision variables limit the degree to which the objective in a linear programming problem is satisfied.

In a linear programming problem,the objective function and the constraints must be linear functions of the decision variables.

The constraint 2x₁  x₂ = 0 passes through the point (200,100).

An optimal solution to a linear programming problem can be found at an extreme point of the feasible region for the problem.

A linear programming problem can be both unbounded and infeasible.

Explain the difference between profit and contribution in an objective function.Why is it important for the decision maker to know which of these the objective function coefficients represent?

An unbounded feasible region might not result in an unbounded solution for a minimization or maximization problem.

The point (3,2)is feasible for the constraint 2x₁ + 6x₂  30.

In a feasible problem,an equal-to constraint cannot be nonbinding.

Because surplus variables represent the amount by which the solution exceeds a minimum target,they are given positive coefficients in the objective function.

No matter what value it has,each objective function line is parallel to every other objective function line in a problem.

Only binding constraints form the shape (boundaries)of the feasible region.

Alternative optimal solutions occur when there is no feasible solution to the problem.

Because the dual price represents the improvement in the value of the optimal solution per unit increase in right-hand-side,a dual price cannot be negative.

The standard form of a linear programming problem will have the same solution as the original problem.

A range of optimality is applicable only if the other coefficient remains at its original value.

For the following linear programming problem,determine the optimal solution by the graphical solution method.Are any of the constraints redundant? If yes,then identify the constraint that is redundant.

Muir Manufacturing produces two popular grades of commercial carpeting among its many other products.In the coming production period,Muir needs to decide how many rolls of each grade should be produced in order to maximize profit.Each roll of Grade X carpet uses 50 units of synthetic fiber,requires 25 hours of production time,and needs 20 units of foam backing.Each roll of Grade Y carpet uses 40 units of synthetic fiber,requires 28 hours of production time,and needs 15 units of foam backing.
The profit per roll of Grade X carpet is $200 and the profit per roll of Grade Y carpet is $160.In the coming production period,Muir has 3000 units of synthetic fiber available for use.Workers have been scheduled to provide at least 1800 hours of production time (overtime is a possibility).The company has 1500 units of foam backing available for use.
Develop and solve a linear programming model for this problem.

Explain what to look for in problems that are infeasible or unbounded.

Does the following linear programming problem exhibit infeasibility,unboundedness,or alternate optimal solutions? Explain.

Use this graph to answer the questions.
a.Which area (I, II, III, IV, or V) forms the feasible region?
b.Which point (A, B, C, D, or E) is optimal?
c.Which constraints are binding?
d.Which slack variables are zero?

A businessman is considering opening a small specialized trucking firm.To make the firm profitable,it is estimated that it must have a daily trucking capacity of at least 84,000 cu.ft.Two types of trucks are appropriate for the specialized operation.Their characteristics and costs are summarized in the table below.Note that truck 2 requires 3 drivers for long haul trips.There are 41 potential drivers available and there are facilities for at most 40 trucks.The businessman's objective is to minimize the total cost outlay for trucks. Solve the problem graphically and note there are alternate optimal solutions.Which optimal solution:
a.uses only one type of truck?
b.utilizes the minimum total number of trucks?
c.uses the same number of small and large trucks?

Solve the following system of simultaneous equations.
6x + 2y = 50
2x + 4y = 20

Maxwell Manufacturing makes two models of felt tip marking pens.Requirements for each lot of pens are given below. The profit for either model is $1000 per lot.
a.What is the linear programming model for this problem?
b.Find the optimal solution.
c.Will there be excess capacity in any resource?

Find the complete optimal solution to this linear programming problem.

Use a graph to illustrate why a change in an objective function coefficient does not necessarily lead to a change in the optimal values of the decision variables,but a change in the right-hand sides of a binding constraint does lead to new values.

Find the complete optimal solution to this linear programming problem.

Find the complete optimal solution to this linear programming problem.

Solve the following system of simultaneous equations.
6x + 4y = 40
2x + 3y = 20

Find the complete optimal solution to this linear programming problem.

Explain the concepts of proportionality,additivity,and divisibility.

Solve the following linear program by the graphical method.

The Sanders Garden Shop mixes two types of grass seed into a blend.Each type of grass has been rated (per pound)according to its shade tolerance,ability to stand up to traffic,and drought resistance,as shown in the table.Type A seed costs $1 and Type B seed costs $2.If the blend needs to score at least 300 points for shade tolerance,400 points for traffic resistance,and 750 points for drought resistance,how many pounds of each seed should be in the blend? Which targets will be exceeded? How much will the blend cost?

Create a linear programming problem with two decision variables and three constraints that will include both a slack and a surplus variable in standard form.Write your problem in standard form.

Explain how to graph the line x₁  2x₂  0.

Does the following linear programming problem exhibit infeasibility,unboundedness,or alternate optimal solutions? Explain.