Deck 7: Using binary integer programming to deal withy es-Or-No decisions

A linear programming formulation is not valid for a product mix problem when there are setup costs for initiating production

Variables whose only possible values are 0 and 1 are called integer variables

Binary variables are variables whose only possible values are 0 or 1

A parameter analysis report can be used to perform sensitivity analysis for integer programming problems

Binary variables are best suited to be the decision variables when dealing with yes-or-no decisions

An auxiliary binary variable is an additional binary variable that is introduced into a model to represent additional yes-or-no decisions

A problems where all the variables are binary variables is called a pure BIP problem

The algorithms available for solving BIP problems are much more efficient than those for linear programming which is one of the advantages of formulating problems this way

If choosing one alternative from a group excludes choosing all of the others then these alternatives are called mutually exclusive

It is possible to have a constraint in a BIP that excludes the possibility of choosing none of the alternatives available

The constraint x₁ + x₂ + x₃? ≤ 3 in a BIP represents mutually exclusive alternatives

The constraint x₁ ≤ x₂ in a BIP problem means that alternative 2 cannot be selected unless alternative 1 is also selected

BIP can be used to determine the timing of activities

A BIP problem considers one yes-or-no decision at a time with the objective of choosing the best alternative

The Excel sensitivity report can be used to perform sensitivity analysis for integer programming problems

Binary integer programming problems are those where all the decision variables restricted to integer values are further restricted to be binary variables

BIP can be used in capital budgeting decisions to determine whether to invest a certain amount