Multiple Choice
A farmer has 150 acres of land suitable for cultivating crops A and B. The cost of cultivating crop A is $40/acre and that of crop B is $60/acre. The farmer has a maximum of $7,800 available for land cultivation. Each acre of crop A requires 20 labor-hours, and each acre of crop B requires 25 labor-hours. The farmer has a maximum of 3,200 labor-hours available. He has also decided that he will cultivate at least 60 acres of crop A. If he expects to make a profit of $170/acre on crop A and $220/acre on crop B, how many acres of each crop should he plant in order to maximize his profit?
A) The farmer should plant 60 acres of crop A and 80 acres of crop B to realize a maximum profit of $27,800.
B) The farmer should plant 110 acres of crop A and 40 acres of crop B to realize a maximum profit of $27,500.
C) The farmer should plant 60 acres of crop A and 0 acres of crop B to realize a maximum profit of $25,500.
Correct Answer:
Verified
Correct Answer:
Verified
Q1: National Business Machines Corporation manufactures two models
Q2: Solve the linear programming problem by the
Q3: Use the simplex method for solving nonstandard
Q5: Use the simplex method for solving nonstandard
Q6: Deluxe River Cruises operates a fleet of
Q7: An oil company operates two refineries in
Q8: Solve the linear programming problem by the
Q9: Use the simplex method for solving nonstandard
Q10: Rewrite the linear programming problem as a
Q11: Use the simplex method for solving nonstandard