Prescriptive Analytics
Limited resources are modeled in optimization problems as
constraints
The constraints of an LP model define the
feasible region.
When the objective function can increase without ever contacting a constraint, the LP model is said to be
unbounded.
When performing sensitivity analysis, which of the following assumptions must apply?
All other coefficients remain constant.
Which type of spreadsheet cell represents the left hand sides (LHS) formulas in an LP model?
Constraint cell
Which of the following actions would expand the feasible region of an LP model?
Loosening the constraints.
Which of the following is the type of model used throughout this textbook?
Mathematical Model.
Which type of spreadsheet cell represents the objective function in an LP model?
Objective cell
For a minimization problem, if a decision variable's final value is 0, and its reduced cost is negative, which of the following is true?
The variable has a non-negativity constraint.
What is the goal in optimization?
To find the decision variable values that result in the best objective function and satisfy all constraints.
A heuristic solution is
a rule-of-thumb for making decisions
Anchoring effects occur in decision-making problems when
a seemingly trivial factor serves as a starting point for estimations.
Models that are set up in an intuitively appealing, logical layout tend to be the most
auditable.
The slope of the level curve for the objective function value can be changed by
changing a coefficient in the objective function.
The sensitivity analysis provides information about all of the following except the impact of
constraints.
The goal of the modeling approach to problem solving is to
help individuals make good decisions.
Better decision making using a modeling process is achieved due to the
insight gained through the process.
A mathematical model is considered to be valid when
it accurately represents the relevant characteristics of the object or decision.
Microsoft Excel contains a built-in optimizer called
solvers.
A binding greater than or equal to (≥) constraint in a minimization problem means that
the minimum requirement for the constraint has just been met.
