Deck 19: Acceptance Sampling

A) 2X ≥ 7X × Y
B) 2X × 7Y ≥ 500
C) 2X + 7Y ≥100
D) 2X² + 7Y ≥ 50
E) All of the above are valid linear programming constraints.

A) minimizing distance traveled by school buses carrying children
B) minimizing 911 response time for police patrols
C) minimizing labor costs for bank tellers while maintaining service levels
D) determining the distribution system for multiple warehouses to multiple destinations
E) all of the above

A) (0, 0), (50, 0), (0, 21), and (20, 15)
B) (0, 0), (70, 0), (25, 0), and (15, 20)
C) (20, 15)
D) (0, 0), (0, 100), and (210, 0)
E) none of the above

A) x = -1, y = 1
B) x = 0, y = 4
C) x = 2, y = 1
D) x = 5, y = 1
E) x = 2, y = 0

A) 8X1 + 4X2 ≥ 160
B) 4X1 + 8X2 ≤ 160
C) 8X1 - 4X2 ≤ 160
D) 8X1 + 4X2 ≤ 160
E) 4X1 - 8X2 ≤ 160

A) x = 2, y = 0
B) x = 0, y = 3
C) x = 0, y = 0
D) x = 1, y = 5
E) none of the above

A) identifying the corner of the feasible region that has the sharpest angle
B) moving the iso-profit line to the highest level that still touches some part of the feasible region
C) moving the iso-profit line to the lowest level that still touches some part of the feasible region
D) finding the coordinates at each corner of the feasible solution space
E) none of the above

A) X + Y > 15 and X - Y < 10
B) X + Y > 5 and X > 10
C) X > 10 and Y > 20
D) X + Y > 100 and X + Y < 50
E) All of the above have a feasible region.

A) a = 0, b = 0
B) a = 3, b = 3
C) a = 0, b = 6
D) a = 6, b = 0
E) cannot solve without values for a and b

A) can be used to help solve a profit maximizing linear programming problem
B) is parallel to all other iso-profit lines in the same problem
C) is a line with the same profit at all points
D) all of the above
E) none of the above

A) X + Y > 100 and X + Y < 50
B) X + Y > 15 and X - Y < 10
C) X + Y < 10 and X > 5
D) X < 10 and Y < 20
E) All of the above have a bounded maximum.

A) find the value of the objective function at the origin
B) move the iso-profit line away from the origin until it barely touches some part of the feasible region
C) move the iso-cost line to the lowest level that still touches some part of the feasible region
D) test the objective function value of every corner point in the feasible region
E) none of the above

A) There are four corner points including (50, 0) and (0, 12.5).
B) The two corner points are (0, 0) and (50, 12.5).
C) The graphical origin (0, 0) is not in the feasible region.
D) The feasible region includes all points that satisfy one constraint, the other, or both.
E) The feasible region cannot be determined without knowing whether the problem is to be minimized or maximized.

A) constraint
B) slack variable
C) objective function
D) violation of linearity
E) decision variable

A) The points (100, 0) and (0, 25) both lie outside the feasible region.
B) The two corner points are (33-1/3, 8-1/3) and (50, 0).
C) The graphical origin (0, 0) is not in the feasible region.
D) The feasible region is a straight line segment, not an area.
E) All of the above are true.

A) x = 2, y = 1
B) x = 1, y = 5
C) x = -1, y = 1
D) x = 4, y = 4
E) x = 2, y = 8

A) There are four corner points including (50, 0) and (0, 12.5).
B) The two corner points are (0, 0) and (50, 12.5).
C) The graphical origin (0, 0) is in the feasible region.
D) The feasible region is triangular in shape, bounded by (50, 0), (33-1/3, 8-1/3), and (100, 0).
E) The feasible region cannot be determined without knowing whether the problem is to be minimized or maximized.

A) an objective function, expressed in terms of linear equations
B) constraint equations, expressed as linear equations
C) an objective function, to be maximized or minimized
D) alternative courses of action
E) for each decision variable, there must be one constraint or resource limit

A) x = 2, y = 0
B) x = 0, y = 3
C) x = 0, y = 0
D) x = 1, y = 5
E) none of the above

A) area of optimal solutions
B) area of feasible solutions
C) profit maximization space
D) region of optimality
E) region of non-negativity

A) Maximize = 500C+300T
B) Minimize = 500C + 300T
C) Maximize = 500C - 300T
D) Minimize = 300T- 500C
E) None of the above

A) 8X1 + 4X2 ≤ 160
B) 8X1 + 4X2 ≥ 160
C) 4X1 + 8X2 ≤ 160
D) 8X1 - 4X2 ≤ 160
E) 4X1 - 8X2 ≤ 160

A) 0
B) 1
C) 2
D) 5
E) Infinite

A) the resource is scarce
B) the resource constraint was redundant
C) the resource has not been used up
D) something is wrong with the problem formulation
E) none of the above

A) 3X ≥ Y
B) X ≤ 3Y
C) X + Y≥3
D) X - 3Y ≥ 0
E) 3X ≤ Y

A) X+Y=15
B) X-Y=10
C) Y-X=10
D) 2X+Y=10
E) None of the above

A) They all pass through the origin
B) They are all parallel.
C) They all pass through the point of maximum profit.
D) Each line passes through at least 2 corners.
E) All of the above

A) One more unit of the resource in C1 would add $2 to the objective function value.
B) One more unit of the resource in C2 would add one more unit each of X and Y.
C) The resource in C3 has not been used up
D) The resources in C1 and in C2, but not in C3, are scarce.
E) All of the above are true.

A) minimization problems cannot be solved with the corner-point method
B) maximization problems often have unbounded regions
C) minimization problems often have unbounded regions
D) minimization problems cannot have shadow prices
E) None of the above are true.

A) (1, 1)
B) (1, 8)
C) (8, 1)
D) (4, 4)
E) The question cannot be answered without knowing the objective function.

A) maximize $40Y = $25Z
B) maximize $40Y + $25Z
C) maximize $30Y + $20Z
D) maximize 0.25Y + 0.20Z
E) none of the above

A) S / (T + U) ≥ 4
B) S - .25T -.25U ≥ 0
C) 4S ≤ T + U
D) S ≥ 4T / 4U
E) none of the above

A) 50
B) 30
C) 20
D) 15
E) 10

A) The shadow price of the added resource will rise.
B) The solution stays the same; the extra resource can't be used without more of the other scarce resource.
C) The extra resource will cause the value of the objective to fall.
D) The optimal mix will be rearranged to use the added resource, and the value of the objective function will rise.
E) none of the above

A) 15
B) 30
C) 0
D) 20X and 10Y is not a feasible solution.
E) Unable to determine

A) Q + R + S + T ≤ 4
B) Q ≥ R + S + T
C) Q - R - S - T ≤ 0
D) Q / (R + S + T) ≤ 0
E) none of the above

A) $0
B) $10
C) $15
D) $14
E) None of the above or Unable to determine

A) the marginal gain in the objective realized by subtracting one unit of a resource
B) the market price that must be paid to obtain additional resources
C) the increase in profit that would accompany one added unit of a scarce resource
D) the reduction in cost that would accompany a one unit decrease in the resource
E) none of the above

A) see the value of increased scarce resources
B) determine even better solutions
C) see the impact of parameter changes
D) A and C
E) A, B, and C

A) 50
B) 30
C) 20
D) 15
E) 10

A) do not change available hours for assembly time
B) decrease available hours for assembly time
C) increase available hours for assembly time
D) not enough information
E) Either A or C will result in larger profits than B.