Question 1

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

Accepted Answer

False

Question 2

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

Accepted Answer

In a feasible problem, all constraints must be satisfied. An equal-to constraint can only be satisfied if it is binding, meaning the variable being constrained is equal to the given value. If the constraint is nonbinding, the variable can take on any value that satisfies the other constraints and the objective function, and thus the equal-to constraint would not be satisfied.

Question 3

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

Accepted Answer

Surplus variables represent the amount by which the actual value of a constraint exceeds the minimum requirement in a maximization problem, and they are subtracted from the left-hand side of the constraint, thus having negative coefficients in the objective function if they are to be minimized.

Question 4

All of the following statements about a redundant constraint are correct EXCEPT&#10;A)A redundant constraint does not affect the optimal solution.&#10;B)A redundant constraint does not affect the feasible region.&#10;C)Recognizing a redundant constraint is easy with the graphical solution method.&#10;D)At the optimal solution, a redundant constraint will have zero slack.

Accepted Answer

The answer of All of the following statements about a...

Question 5

The improvement in the value of the objective function per unit increase in a right-hand side is the&#10;A)sensitivity value.&#10;B)dual price.&#10;C)constraint coefficient.&#10;D)slack value.

Accepted Answer

The improvement in the value of the objective function per unit increase in a right-hand side is known as the dual price. This measures the value of each additional unit of a resource in terms of the objective function. Sensitivity value refers to the amount by which the objective function changes with respect to a change in a constraint coefficient or RHS value. Constraint coefficient refers to the coefficient of a decision variable in a constraint equation, and slack value refers to the difference between the RHS value and the value of the left-hand side of a constraint, indicating the extra capacity or resource available.

Question 6

As long as the slope of the objective function stays between the slopes of the binding constraints&#10;A)the value of the objective function won't change.&#10;B)there will be alternative optimal solutions.&#10;C)the values of the dual variables won't change.&#10;D)there will be no slack in the solution.

Accepted Answer

The answer of As long as the slope of the...

Question 7

To find the optimal solution to a linear programming problem using the graphical method&#10;A)find the feasible point that is the farthest away from the origin.&#10;B)find the feasible point that is at the highest location.&#10;C)find the feasible point that is closest to the origin.&#10;D)None of the alternatives is correct.

Accepted Answer

The answer of To find the optimal solution to a...

Question 8

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

Accepted Answer

If we plug in (20, 50) for x and S1U1B0, we get:
5S1U1B11(20)S1U1B1(50) - 2S1U1B12(20)S1U1B1(50) < 0
Simplifying this, we get:
100S1U1B1 - 40S1U1B1 < 0
60S1U1B1 < 0
This is true if and only if S1U1B1 is negative. Since S1U1B1 is a slack variable (added to the system to convert inequalities to equalities), it must be nonnegative. Therefore, the point (20, 50) does not satisfy the constraint, and the answer is B. However, the given constraint is in fact linear and passes through all points on the line, so the answer key is incorrect.

Question 9

A redundant constraint is a binding constraint.

Accepted Answer

The answer of A redundant constraint is a binding constraint....

Question 10

Decision variables&#10;A)tell how much or how many of something to produce, invest, purchase, hire, etc.&#10;B)represent the values of the constraints.&#10;C)measure the objective function.&#10;D)must exist for each constraint.

Accepted Answer

Decision variables are the variables that represent the value of the quantities to be decided or determined in the problem, such as how much to produce, invest, purchase, hire, etc.

Question 11

All linear programming problems have all of the following properties EXCEPT&#10;A)a linear objective function that is to be maximized or minimized.&#10;B)a set of linear constraints.&#10;C)alternative optimal solutions.&#10;D)variables that are all restricted to nonnegative values.

Accepted Answer

The answer of All linear programming problems have all of...

Question 12

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

Accepted Answer

The answer of Alternative optimal solutions occur when there is...

Question 13

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

Accepted Answer

The answer of Only binding constraints form the shape (boundaries)...

Question 14

A constraint that does not affect the feasible region is a&#10;A)non-negativity constraint.&#10;B)redundant constraint.&#10;C)standard constraint.&#10;D)slack constraint.

Accepted Answer

The answer of A constraint that does not affect the...

Question 15

Slack&#10;A)is the difference between the left and right sides of a constraint.&#10;B)is the amount by which the left side of a < constraint is smaller than the right side.&#10;C)is the amount by which the left side of a > constraint is larger than the right side.&#10;D)exists for each variable in a linear programming problem.

Accepted Answer

The answer of Slack&#10;A)is the difference between the left and...

Question 16

Whenever all the constraints in a linear program are expressed as equalities, the linear program is said to be written in&#10;A)standard form.&#10;B)bounded form.&#10;C)feasible form.&#10;D)alternative form.

Accepted Answer

The answer of Whenever all the constraints in a linear...

Question 17

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

Accepted Answer

The answer of In a linear programming problem, the objective...

Question 18

Which of the following statements is NOT true?&#10;A)A feasible solution satisfies all constraints.&#10;B)An optimal solution satisfies all constraints.&#10;C)An infeasible solution violates all constraints.&#10;D)A feasible solution point does not have to lie on the boundary of the feasible region.

Accepted Answer

The answer of Which of the following statements is NOT...

Question 19

The maximization or minimization of a quantity is the&#10;A)goal of management science.&#10;B)decision for decision analysis.&#10;C)constraint of operations research.&#10;D)objective of linear programming.

Accepted Answer

The answer of The maximization or minimization of a quantity...

Question 20

Which of the following special cases does not require reformulation of the problem in order to obtain a solution?&#10;A)alternate optimality&#10;B)infeasibility&#10;C)unboundedness&#10;D)each case requires a reformulation.

Accepted Answer

The answer of Which of the following special cases does...

Question 21

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

Accepted Answer

The answer of The standard form of a linear programming...

Question 22

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.

Accepted Answer

The answer of Because the dual price represents the improvement...

Question 23

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

Accepted Answer

The answer of A range of optimality is applicable only...

Question 24

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

Accepted Answer

The answer of The point (3, 2) is feasible for...

Question 25

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

Accepted Answer

The answer of The constraint 2x₁ - x₂ = 0...

Question 26

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

Accepted Answer

The answer of Decision variables limit the degree to which...

Question 27

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

Accepted Answer

The answer of No matter what value it has, each...

Question 28

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

Accepted Answer

The answer of An optimal solution to a linear programming...

Deck 2: Introduction to Linear Programming