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Deck 7: Linear Programming Models: Graphical and Computer Methods
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Consider the following linear programming problem: 
The maximum possible value for the objective function is
A)360.
B)480.
C)1520.
D)1560.
E)None of the above
The maximum possible value for the objective function isA)360.
B)480.
C)1520.
D)1560.
E)None of the above
Question
Consider the following linear programming problem: 
Which of the following points (X,Y)is not a feasible corner point?
A)(0,60)
B)(105,0)
C)(120,0)
D)(100,10)
E)None of the above
Which of the following points (X,Y)is not a feasible corner point?A)(0,60)
B)(105,0)
C)(120,0)
D)(100,10)
E)None of the above
Question
Question
Question
Consider the following linear programming problem: 
The feasible corner points are (48,84), (0,120), (0,0), (90,0).What is the maximum possible value for the objective function?
A)1032
B)1200
C)360
D)1600
E)None of the above
The feasible corner points are (48,84), (0,120), (0,0), (90,0).What is the maximum possible value for the objective function?A)1032
B)1200
C)360
D)1600
E)None of the above
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Two models of a product - Regular (X)and Deluxe (Y)- are produced by a company.A linear programming model is used to determine the production schedule.The formulation is as follows: 
The optimal solution is X = 100,Y = 0. How many units of the regular model would be produced based on this solution?
A)0
B)100
C)50
D)120
E)None of the above
The optimal solution is X = 100,Y = 0. How many units of the regular model would be produced based on this solution?A)0
B)100
C)50
D)120
E)None of the above
Question
Question
Consider the following linear programming problem: 
Which of the following points (X,Y)is not feasible?
A)(50,40)
B)(20,50)
C)(60,30)
D)(90,10)
E)None of the above
Which of the following points (X,Y)is not feasible?A)(50,40)
B)(20,50)
C)(60,30)
D)(90,10)
E)None of the above
Question
Question
Two models of a product - Regular (X)and Deluxe (Y)- are produced by a company.A linear programming model is used to determine the production schedule.The formulation is as follows: 
The optimal solution is X = 100,Y = 0. Which of these constraints is redundant?
A)the first constraint
B)the second constraint
C)the third constraint
D)All of the above
E)None of the above
The optimal solution is X = 100,Y = 0. Which of these constraints is redundant?A)the first constraint
B)the second constraint
C)the third constraint
D)All of the above
E)None of the above
Question
Question
Consider the following linear programming problem: 
What is the optimum solution to this problem (X,Y)?
A)(0,0)
B)(50,0)
C)(0,100)
D)(400,0)
E)None of the above
What is the optimum solution to this problem (X,Y)?A)(0,0)
B)(50,0)
C)(0,100)
D)(400,0)
E)None of the above
Question
Question
Which of the following is not acceptable as a constraint in a linear programming problem (maximization)? 
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)None of the above
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)None of the above
Question
Consider the following linear programming problem: 
This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
Question
Question
Question
Consider the following linear programming problem: 
This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
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Which of the following is not acceptable as a constraint in a linear programming problem (minimization)? 
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)Constraint 5
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)Constraint 5
Question
Consider the sensitivity report below for the problems which follow. 
The optimal solution to this linear program is
A)x1 = 0,x2 = 0.
B)x1 = 34,x2 = 40.
C)x1 = 6,x2 = 11.
D)x1 = 7.33,x2 = 6.
E)x1 = 3,x2 = 6.
The optimal solution to this linear program is
A)x1 = 0,x2 = 0.
B)x1 = 34,x2 = 40.
C)x1 = 6,x2 = 11.
D)x1 = 7.33,x2 = 6.
E)x1 = 3,x2 = 6.
Question
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Consider the following linear programming problem: 
The maximum possible value for the objective function is
A)360.
B)480.
C)1520.
D)1560.
E)None of the above
The maximum possible value for the objective function isA)360.
B)480.
C)1520.
D)1560.
E)None of the above
Question
Question
Question
Consider the following linear programming problem: 
Which of the following points (X,Y)is feasible?
A)(50,40)
B)(30,50)
C)(60,30)
D)(90,20)
E)None of the above
Which of the following points (X,Y)is feasible?A)(50,40)
B)(30,50)
C)(60,30)
D)(90,20)
E)None of the above
Question
Consider the following linear programming problem: 
This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
Question
Question
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Consider the following linear programming problem: 
Which of the following points (X,Y)is feasible?
A)(10,120)
B)(120,10)
C)(30,100)
D)(60,90)
E)None of the above
Which of the following points (X,Y)is feasible?A)(10,120)
B)(120,10)
C)(30,100)
D)(60,90)
E)None of the above
Question
Consider the following linear programming problem: 
This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
Question
Question
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Consider the following linear programming problem: 
Which of the following points (X,Y)is in the feasible region?
A)(30,60)
B)(105,5)
C)(0,210)
D)(100,10)
E)None of the above
Which of the following points (X,Y)is in the feasible region?A)(30,60)
B)(105,5)
C)(0,210)
D)(100,10)
E)None of the above
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Deck 7: Linear Programming Models: Graphical and Computer Methods
1
Any time that we have an isoprofit line that is parallel to a constraint,we have the possibility of multiple solutions.
True
2
In the term linear programming,the word programming comes from the phrase "computer programming."
False
3
One of the assumptions of LP is "simultaneity."
False
4
The solution to a linear programming problem must always lie on a constraint.
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5
The term surplus is associated with ≥ constraints.
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6
Resource mix problems use LP to decide how much of each product to make,given a series of resource restrictions.
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7
One of the assumptions of LP is "proportionality."
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8
In some instances,an infeasible solution may be the optimum found by the corner point method.
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9
In a linear program,the constraints must be linear,but the objective function may be nonlinear.
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10
Any linear programming problem can be solved using the graphical solution procedure.
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11
An LP formulation typically requires finding the maximum value of an objective while simultaneously maximizing usage of the resource constraints.
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12
The set of solution points that satisfies all of a linear programming problem's constraints simultaneously is defined as the feasible region in graphical linear programming.
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13
The term slack is associated with ≥ constraints.
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14
There are no limitations on the number of constraints or variables that can be graphed to solve an LP problem.
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15
The rationality assumption implies that solutions need not be in whole numbers (integers).
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16
Management resources that need control include machinery usage,labor volume,money spent,time used,warehouse space used,and material usage.
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17
The existence of non-negativity constraints in a two-variable linear program implies that we are always working in the northwest quadrant of a graph.
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18
The shadow price is the same as the dual price in maximization problems.
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19
An objective function is necessary in a maximization problem but is not required in a minimization problem.
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20
Resource restrictions are called constraints.
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21
Consider the following linear programming problem: The maximum possible value for the objective function is
A)360.
B)480.
C)1520.
D)1560.
E)None of the above
The maximum possible value for the objective function isA)360.
B)480.
C)1520.
D)1560.
E)None of the above
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22
Consider the following linear programming problem: Which of the following points (X,Y)is not a feasible corner point?
A)(0,60)
B)(105,0)
C)(120,0)
D)(100,10)
E)None of the above
Which of the following points (X,Y)is not a feasible corner point?A)(0,60)
B)(105,0)
C)(120,0)
D)(100,10)
E)None of the above
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23
Which of the following is not a property of linear programs?
A)one objective function
B)at least two separate feasible regions
C)alternative courses of action
D)one or more constraints
E)objective function and constraints are linear
A)one objective function
B)at least two separate feasible regions
C)alternative courses of action
D)one or more constraints
E)objective function and constraints are linear
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24
Which of the following is not a part of every linear programming problem formulation?
A)an objective function
B)a set of constraints
C)non-negativity constraints
D)a redundant constraint
E)maximization or minimization of a linear function
A)an objective function
B)a set of constraints
C)non-negativity constraints
D)a redundant constraint
E)maximization or minimization of a linear function
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25
Consider the following linear programming problem: The feasible corner points are (48,84), (0,120), (0,0), (90,0).What is the maximum possible value for the objective function?
A)1032
B)1200
C)360
D)1600
E)None of the above
The feasible corner points are (48,84), (0,120), (0,0), (90,0).What is the maximum possible value for the objective function?A)1032
B)1200
C)360
D)1600
E)None of the above
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26
The addition of a redundant constraint lowers the isoprofit line.
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27
Typical resources of an organization include
A)machinery usage.
B)labor volume.
C)warehouse space utilization.
D)raw material usage.
E)All of the above
A)machinery usage.
B)labor volume.
C)warehouse space utilization.
D)raw material usage.
E)All of the above
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28
Infeasibility in a linear programming problem occurs when
A)there is an infinite solution.
B)a constraint is redundant.
C)more than one solution is optimal.
D)the feasible region is unbounded.
E)there is no solution that satisfies all the constraints given.
A)there is an infinite solution.
B)a constraint is redundant.
C)more than one solution is optimal.
D)the feasible region is unbounded.
E)there is no solution that satisfies all the constraints given.
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29
Which of the following is not a property of all linear programming problems?
A)the presence of restrictions
B)optimization of some objective
C)a computer program
D)alternate courses of action to choose from
E)usage of only linear equations and inequalities
A)the presence of restrictions
B)optimization of some objective
C)a computer program
D)alternate courses of action to choose from
E)usage of only linear equations and inequalities
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30
A widely used mathematical programming technique designed to help managers and decision making relative to resource allocation is called
A)linear programming.
B)computer programming.
C)constraint programming.
D)goal programming.
E)None of the above
A)linear programming.
B)computer programming.
C)constraint programming.
D)goal programming.
E)None of the above
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31
The mathematical theory behind linear programming states that an optimal solution to any problem will lie at a(n)________ of the feasible region.
A)interior point or center
B)maximum point or minimum point
C)corner point or extreme point
D)interior point or extreme point
E)None of the above
A)interior point or center
B)maximum point or minimum point
C)corner point or extreme point
D)interior point or extreme point
E)None of the above
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32
The corner point solution method
A)will always provide one,and only one,optimum.
B)will yield different results from the isoprofit line solution method.
C)requires that the profit from all corners of the feasible region be compared.
D)requires that all corners created by all constraints be compared.
E)will not provide a solution at an intersection or corner where a non-negativity constraint is involved.
A)will always provide one,and only one,optimum.
B)will yield different results from the isoprofit line solution method.
C)requires that the profit from all corners of the feasible region be compared.
D)requires that all corners created by all constraints be compared.
E)will not provide a solution at an intersection or corner where a non-negativity constraint is involved.
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33
Sensitivity analysis enables us to look at the effects of changing the coefficients in the objective function,one at a time.
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34
When two or more constraints conflict with one another,we have a condition called unboundedness.
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35
When appropriate,the optimal solution to a maximization linear programming problem can be found by graphing the feasible region and
A)finding the profit at every corner point of the feasible region to see which one gives the highest value.
B)moving the isoprofit lines towards the origin in a parallel fashion until the last point in the feasible region is encountered.
C)locating the point that is highest on the graph.
D)None of the above
E)All of the above
A)finding the profit at every corner point of the feasible region to see which one gives the highest value.
B)moving the isoprofit lines towards the origin in a parallel fashion until the last point in the feasible region is encountered.
C)locating the point that is highest on the graph.
D)None of the above
E)All of the above
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36
If the isoprofit line is not parallel to a constraint,then the solution must be unique.
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37
A feasible solution to a linear programming problem
A)must be a corner point of the feasible region.
B)must satisfy all of the problem's constraints simultaneously.
C)need not satisfy all of the constraints,only the non-negativity constraints.
D)must give the maximum possible profit.
E)must give the minimum possible cost.
A)must be a corner point of the feasible region.
B)must satisfy all of the problem's constraints simultaneously.
C)need not satisfy all of the constraints,only the non-negativity constraints.
D)must give the maximum possible profit.
E)must give the minimum possible cost.
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38
The simultaneous equation method is
A)an alternative to the corner point method.
B)useful only in minimization methods.
C)an algebraic means for solving the intersection of two or more constraint equations.
D)useful only when more than two product variables exist in a product mix problem.
E)None of the above
A)an alternative to the corner point method.
B)useful only in minimization methods.
C)an algebraic means for solving the intersection of two or more constraint equations.
D)useful only when more than two product variables exist in a product mix problem.
E)None of the above
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39
When a constraint line bounding a feasible region has the same slope as an isoprofit line,
A)there may be more than one optimum solution.
B)the problem involves redundancy.
C)an error has been made in the problem formulation.
D)a condition of infeasibility exists.
E)None of the above
A)there may be more than one optimum solution.
B)the problem involves redundancy.
C)an error has been made in the problem formulation.
D)a condition of infeasibility exists.
E)None of the above
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40
In a maximization problem,when one or more of the solution variables and the profit can be made infinitely large without violating any constraints,the linear program has
A)an infeasible solution.
B)an unbounded solution.
C)a redundant constraint.
D)alternate optimal solutions.
E)None of the above
A)an infeasible solution.
B)an unbounded solution.
C)a redundant constraint.
D)alternate optimal solutions.
E)None of the above
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41
The difference between the left-hand side and right-hand side of a greater-than-or-equal-to constraint is referred to as
A)surplus.
B)constraint.
C)slack.
D)shadow price.
E)None of the above
A)surplus.
B)constraint.
C)slack.
D)shadow price.
E)None of the above
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42
If the addition of a constraint to a linear programming problem does not change the solution,the constraint is said to be
A)unbounded.
B)non-negative.
C)infeasible.
D)redundant.
E)bounded.
A)unbounded.
B)non-negative.
C)infeasible.
D)redundant.
E)bounded.
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43
A constraint with positive slack or surplus is called a
A)nonbinding constraint.
B)resource constraint.
C)binding constraint.
D)nonlinear constraint.
E)linear constraint.
A)nonbinding constraint.
B)resource constraint.
C)binding constraint.
D)nonlinear constraint.
E)linear constraint.
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44
If one changes the contribution rates in the objective function of an LP,
A)the feasible region will change.
B)the slope of the isoprofit or isocost line will change.
C)the optimal solution to the LP is sure to no longer be optimal.
D)All of the above
E)None of the above
A)the feasible region will change.
B)the slope of the isoprofit or isocost line will change.
C)the optimal solution to the LP is sure to no longer be optimal.
D)All of the above
E)None of the above
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45
Two models of a product - Regular (X)and Deluxe (Y)- are produced by a company.A linear programming model is used to determine the production schedule.The formulation is as follows: The optimal solution is X = 100,Y = 0. How many units of the regular model would be produced based on this solution?
A)0
B)100
C)50
D)120
E)None of the above
The optimal solution is X = 100,Y = 0. How many units of the regular model would be produced based on this solution?A)0
B)100
C)50
D)120
E)None of the above
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46
A straight line representing all non-negative combinations of X1 and X2 for a particular profit level is called a(n)
A)constraint line.
B)objective line.
C)sensitivity line.
D)profit line.
E)isoprofit line.
A)constraint line.
B)objective line.
C)sensitivity line.
D)profit line.
E)isoprofit line.
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47
Consider the following linear programming problem: Which of the following points (X,Y)is not feasible?
A)(50,40)
B)(20,50)
C)(60,30)
D)(90,10)
E)None of the above
Which of the following points (X,Y)is not feasible?A)(50,40)
B)(20,50)
C)(60,30)
D)(90,10)
E)None of the above
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48
Which of the following is not an assumption of LP?
A)simultaneity
B)certainty
C)proportionality
D)divisibility
E)additivity
A)simultaneity
B)certainty
C)proportionality
D)divisibility
E)additivity
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49
Two models of a product - Regular (X)and Deluxe (Y)- are produced by a company.A linear programming model is used to determine the production schedule.The formulation is as follows: The optimal solution is X = 100,Y = 0. Which of these constraints is redundant?
A)the first constraint
B)the second constraint
C)the third constraint
D)All of the above
E)None of the above
The optimal solution is X = 100,Y = 0. Which of these constraints is redundant?A)the first constraint
B)the second constraint
C)the third constraint
D)All of the above
E)None of the above
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50
The coefficients of the variables in the constraint equations that represent the amount of resources needed to produce one unit of the variable are called
A)technological coefficients.
B)objective coefficients.
C)shadow prices.
D)dual prices.
E)None of the above
A)technological coefficients.
B)objective coefficients.
C)shadow prices.
D)dual prices.
E)None of the above
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51
Consider the following linear programming problem: What is the optimum solution to this problem (X,Y)?
A)(0,0)
B)(50,0)
C)(0,100)
D)(400,0)
E)None of the above
What is the optimum solution to this problem (X,Y)?A)(0,0)
B)(50,0)
C)(0,100)
D)(400,0)
E)None of the above
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52
Sensitivity analyses are used to examine the effects of changes in
A)contribution rates for each variable.
B)technological coefficients.
C)available resources.
D)All of the above
E)None of the above
A)contribution rates for each variable.
B)technological coefficients.
C)available resources.
D)All of the above
E)None of the above
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53
Which of the following is not acceptable as a constraint in a linear programming problem (maximization)?
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)None of the above
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)None of the above
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54
Consider the following linear programming problem: This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
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55
Sensitivity analysis may also be called
A)postoptimality analysis.
B)parametric programming.
C)optimality analysis.
D)All of the above
E)None of the above
A)postoptimality analysis.
B)parametric programming.
C)optimality analysis.
D)All of the above
E)None of the above
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56
The difference between the left-hand side and right-hand side of a less-than-or-equal-to constraint is referred to as
A)surplus.
B)constraint.
C)slack.
D)shadow price.
E)None of the above
A)surplus.
B)constraint.
C)slack.
D)shadow price.
E)None of the above
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57
Consider the following linear programming problem: This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
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58
A constraint with zero slack or surplus is called a
A)nonbinding constraint.
B)resource constraint.
C)binding constraint.
D)nonlinear constraint.
E)linear constraint.
A)nonbinding constraint.
B)resource constraint.
C)binding constraint.
D)nonlinear constraint.
E)linear constraint.
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59
Which of the following is a basic assumption of linear programming?
A)The condition of uncertainty exists.
B)Independence exists for the activities.
C)Proportionality exists in the objective function and constraints.
D)Divisibility does not exist,allowing only integer solutions.
E)Solutions or variables may take values from -∞ to +∞.
A)The condition of uncertainty exists.
B)Independence exists for the activities.
C)Proportionality exists in the objective function and constraints.
D)Divisibility does not exist,allowing only integer solutions.
E)Solutions or variables may take values from -∞ to +∞.
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60
The condition when there is no solution that satisfies all the constraints simultaneously is called
A)boundedness.
B)redundancy.
C)optimality.
D)dependency.
E)None of the above
A)boundedness.
B)redundancy.
C)optimality.
D)dependency.
E)None of the above
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61
What is the increase in the objective value if 2 units of extrusion are added?
A)3
B)6
C)48
D)96
E)Not enough information provided
A)3
B)6
C)48
D)96
E)Not enough information provided
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62
Which of the following is not acceptable as a constraint in a linear programming problem (minimization)?
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)Constraint 5
A)Constraint 1
B)Constraint 2
C)Constraint 3
D)Constraint 4
E)Constraint 5
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63
Consider the sensitivity report below for the problems which follow.
The optimal solution to this linear program is
A)x1 = 0,x2 = 0.
B)x1 = 34,x2 = 40.
C)x1 = 6,x2 = 11.
D)x1 = 7.33,x2 = 6.
E)x1 = 3,x2 = 6.
The optimal solution to this linear program is
A)x1 = 0,x2 = 0.
B)x1 = 34,x2 = 40.
C)x1 = 6,x2 = 11.
D)x1 = 7.33,x2 = 6.
E)x1 = 3,x2 = 6.
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64
What type of problems use LP to decide how much of each product to make,given a series of resource restrictions?
A)resource mix
B)resource restriction
C)product restriction
D)resource allocation
E)product mix
A)resource mix
B)resource restriction
C)product restriction
D)resource allocation
E)product mix
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65
What is the increase in the objective value if 2 units of additive is added?
A)0
B)4
C)12
D)16
E)Not enough information provided
A)0
B)4
C)12
D)16
E)Not enough information provided
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66
Consider the following linear programming problem: The maximum possible value for the objective function is
A)360.
B)480.
C)1520.
D)1560.
E)None of the above
The maximum possible value for the objective function isA)360.
B)480.
C)1520.
D)1560.
E)None of the above
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67
Consider the following constraints from a linear programming problem: 2X + Y ≤ 200
X + 2Y ≤ 200
X,Y ≥ 0
If these are the only constraints,which of the following points (X,Y)cannot be the optimal solution?
A)(0,0)
B)(0,200)
C)(0,100)
D)(100,0)
E)(66.67,66.67)
X + 2Y ≤ 200
X,Y ≥ 0
If these are the only constraints,which of the following points (X,Y)cannot be the optimal solution?
A)(0,0)
B)(0,200)
C)(0,100)
D)(100,0)
E)(66.67,66.67)
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68
Which of the following is not an assumption of LP?
A)certainty
B)proportionality
C)divisibility
D)multiplicativity
E)additivity
A)certainty
B)proportionality
C)divisibility
D)multiplicativity
E)additivity
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69
Consider the following linear programming problem: Which of the following points (X,Y)is feasible?
A)(50,40)
B)(30,50)
C)(60,30)
D)(90,20)
E)None of the above
Which of the following points (X,Y)is feasible?A)(50,40)
B)(30,50)
C)(60,30)
D)(90,20)
E)None of the above
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70
Consider the following linear programming problem: This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
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71
In order for a linear programming problem to have multiple solutions,the solution must exist
A)at the intersection of the non-negativity constraints.
B)on a non-redundant constraint parallel to the objective function.
C)at the intersection of the objective function and a constraint.
D)at the intersection of three or more constraints.
E)None of the above
A)at the intersection of the non-negativity constraints.
B)on a non-redundant constraint parallel to the objective function.
C)at the intersection of the objective function and a constraint.
D)at the intersection of three or more constraints.
E)None of the above
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72
In order for a linear programming problem to have a unique solution,the solution must exist
A)at the intersection of the non-negativity constraints.
B)at the intersection of a non-negativity constraint and a resource constraint.
C)at the intersection of the objective function and a constraint.
D)at the intersection of two or more constraints.
E)None of the above
A)at the intersection of the non-negativity constraints.
B)at the intersection of a non-negativity constraint and a resource constraint.
C)at the intersection of the objective function and a constraint.
D)at the intersection of two or more constraints.
E)None of the above
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73
Consider the following linear programming problem: Which of the following points (X,Y)is feasible?
A)(10,120)
B)(120,10)
C)(30,100)
D)(60,90)
E)None of the above
Which of the following points (X,Y)is feasible?A)(10,120)
B)(120,10)
C)(30,100)
D)(60,90)
E)None of the above
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74
Consider the following linear programming problem: This is a special case of a linear programming problem in which
A)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
This is a special case of a linear programming problem in whichA)there is no feasible solution.
B)there is a redundant constraint.
C)there are multiple optimal solutions.
D)this cannot be solved graphically.
E)None of the above
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75
Which of the following functions is not linear?
A)5X + 3Z
B)3X + 4Y + Z - 3
C)2X + 5YZ
D)Z
E)2X - 5Y + 2Z
A)5X + 3Z
B)3X + 4Y + Z - 3
C)2X + 5YZ
D)Z
E)2X - 5Y + 2Z
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76
What is the increase in the objective value if 2 units of packaging are added?
A)11
B)18
C)22
D)36
E)Not enough information provided
A)11
B)18
C)22
D)36
E)Not enough information provided
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77
Which of the following constraints are binding?
A)Extrusion only
B)Packing only
C)Additive only
D)Extrusion and Packaging
E)All constraints are binding
A)Extrusion only
B)Packing only
C)Additive only
D)Extrusion and Packaging
E)All constraints are binding
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78
Which of the following is not one of the steps in formulating a linear program?
A)Graph the constraints to determine the feasible region.
B)Define the decision variables.
C)Use the decision variables to write mathematical expressions for the objective function and the constraints.
D)Identify the objective and the constraints.
E)Completely understand the managerial problem being faced.
A)Graph the constraints to determine the feasible region.
B)Define the decision variables.
C)Use the decision variables to write mathematical expressions for the objective function and the constraints.
D)Identify the objective and the constraints.
E)Completely understand the managerial problem being faced.
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k this deck
79
Consider the following linear programming problem: Which of the following points (X,Y)is in the feasible region?
A)(30,60)
B)(105,5)
C)(0,210)
D)(100,10)
E)None of the above
Which of the following points (X,Y)is in the feasible region?A)(30,60)
B)(105,5)
C)(0,210)
D)(100,10)
E)None of the above
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80
Consider the following constraints from a linear programming problem: 2X + Y ≤ 200
X + 2Y ≤ 200
X,Y ≥ 0
If these are the only constraints,which of the following points (X,Y)cannot be the optimal solution?
A)(0,0)
B)(0,100)
C)(65,65)
D)(100,0)
E)(66.67,66.67)
X + 2Y ≤ 200
X,Y ≥ 0
If these are the only constraints,which of the following points (X,Y)cannot be the optimal solution?
A)(0,0)
B)(0,100)
C)(65,65)
D)(100,0)
E)(66.67,66.67)
Unlock Deck
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Unlock Deck
Unlock for access to all 110 flashcards in this deck.
