Deck 4: Business Analytics With Nonlinear Programming

A) Linear relationships in the objective functions.
B) Linear relationships of resource constraints.
C) Nonlinear relationships in the objective functions.
D) Nonlinear relationships of resource constraints.
E) All of the above

A) The objective function must be nonlinear.
B) The constraints must be nonlinear equations.
C) Either a or b
D) Neither a nor b

A) Proportional and additive.
B) Proportional or additive.
C) Neither proportional nor additive.
D) Either non-proportional or non-additive.

A) Economies of scale.
B) Buy one, get a second item of an equal or lower price for free.
C) Both a and b
D) Neither a nor b

A) Economies of scale
B) Buy one, get a second item of an equal or lower price for free.
C) Both a and b
D) Neither a nor b

A) Regression model.
B) Nonlinear programming model.
C) Linear programming model.
D) None of the above

A) An objective function to be optimized
B) A set of constraints to be satisfied
C) A set of nonlinear objectives to be sought
D) All of the above are components of nonlinear programming formulations.

A) More challenging to solve than linear programming models.
B) Less representative of real-world problems.
C) Less accurate in the results of the final solution.
D) All of the above distinguish nonlinear programming from linear programming counterparts.

A) More accurate results of the solution.
B) A simpler formulation and solution process.
C) A better representation of real-world relationships.
D) All of the above

A) More accurate results of the solution.
B) A simpler formulation process.
C) A simpler solution process.
D) All of the above

A) Straight lines when the model has two decision variables.
B) Planes when the model has three decision variables.
C) Both a and b are true.
D) None of the above

A) Straight lines when the model has two decision variables.
B) Planes when the model has three decision variables.
C) Both a and b are true.
D) None of the above

A) Curved lines when the model has two decision variables.
B) Planes when the model has three decision variables.
C) Both a and b are true.
D) None of the above

A) Nonlinear constraints may create discontinuous areas that satisfy all constraints.
B) Nonlinear constraints are difficult to translate into mathematical functions.
C) Nonlinear constraints are associated with a quantity discount.
D) All of the above

A) Defining decision variables
B) Formulating an objective function
C) Identifying a set of constraints
D) Identifying a set of non-negativity constraints
E) All of the above

A) Creating an Microsoft Excel template
B) Applying Solver
C) Interpreting the solution results
D) All of the above

A) The initial solution for the decision variables.
B) The optimal solution for the decision variables.
C) A range of optimal solutions for the decision variables.
D) Any of the above

A) The "reduced cost" in linear programming models is called the "Lagrange multiplier" in nonlinear programming models.
B) The "shadow price" in linear programming models is called the "reduced gradient" in nonlinear programming models.
C) The "reduced cost" in linear programming models is called the "reduced gradient" in nonlinear programming models.
D) All of the above

A) Change when these values move away from the optimal solution.
B) Remain constant within the range between the upper and lower limits.
C) Become invalid at the point of the optimal solution.
D) None of the above statements are true about the dual values for nonlinear programming models.

A) Volume
B) Variety
C) Velocity
D) All of the above

A) Formulating the problem as a linear model and considering the trade-off between a less rigorous formulation and an efficient solution
B) Formulating the problem as a nonlinear model and solving it using linear modeling approaches
C) Not using an optimization technique and saving on model building and solution costs
D) All of the above

A) Ignore them and read the solution as provided by Excel.
B) Accept the errors as part of the solution (i.e., there is no solution to the given problem).
C) Add a non-negativity constraint for decision variables instead of checking the non-negativity box in Solver.
D) All of the above