Bud and Wise are the only two producers of aniseed beer, a New Age product designed to displace root beer. Bud and Wise are trying to figure out how much of this new beer to produce. They know: (i) If they both produce 10,000 litres a day, they will make the maximum attainable joint economic profit of $200,000 a day, or $100,000 a day each. (ii) If either firm produces 20,000 litres a day while the other produces 10,000 litres a day, the one that produces 20,000 litres will make an economic profit of $150,000 and the other will incur an economic loss of $50,000. (iii) If both produce 20,000 litres a day, each firm will make zero economic profit. Construct a payoff matrix for the game that Bud and Wise must play. Find the Nash equilibrium of the game that Bud and Wise play.
Bud and Wise are the only two producers of aniseed beer, a New Age product designed to displace root beer. Bud and Wise are trying to figure out how much of this new beer to produce. They know: (i) If they both produce 10,000 litres a day, they will make the maximum attainable joint economic profit of $200,000 a day, or $100,000 a day each. (ii) If either firm produces 20,000 litres a day while the other produces 10,000 litres a day, the one that produces 20,000 litres will make an economic profit of $150,000 and the other will incur an economic loss of $50,000. (iii) If both produce 20,000 litres a day, each firm will make zero economic profit. Construct a payoff matrix for the game that Bud and Wise must play. Find the Nash equilibrium of the game that Bud and Wise play.
Chapter1: Making Economics Decisions
Section: Chapter Questions
Problem 1QTC
Related questions
Question
Bud and Wise are the only two producers of aniseed beer, a New Age product designed to displace root beer. Bud and Wise are trying to figure out how much of this new beer to produce. They know:
(i) If they both produce 10,000 litres a day, they will make the maximum attainable joint economic profit of $200,000 a day, or $100,000 a day each.
(ii) If either firm produces 20,000 litres a day while the other produces 10,000 litres a day, the one that produces 20,000 litres will make an economic profit of $150,000 and the other will incur an economic loss of $50,000.
(iii) If both produce 20,000 litres a day, each firm will make zero economic profit.
- Construct a payoff matrix for the game that Bud and Wise must play.
- Find the Nash equilibrium of the game that Bud and Wise play.
Expert Solution
This question has been solved!
Explore an expertly crafted, step-by-step solution for a thorough understanding of key concepts.
This is a popular solution!
Trending now
This is a popular solution!
Step by step
Solved in 2 steps with 1 images
Knowledge Booster
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, economics and related others by exploring similar questions and additional content below.Recommended textbooks for you
Principles of Economics (12th Edition)
Economics
ISBN:
9780134078779
Author:
Karl E. Case, Ray C. Fair, Sharon E. Oster
Publisher:
PEARSON
Engineering Economy (17th Edition)
Economics
ISBN:
9780134870069
Author:
William G. Sullivan, Elin M. Wicks, C. Patrick Koelling
Publisher:
PEARSON
Principles of Economics (12th Edition)
Economics
ISBN:
9780134078779
Author:
Karl E. Case, Ray C. Fair, Sharon E. Oster
Publisher:
PEARSON
Engineering Economy (17th Edition)
Economics
ISBN:
9780134870069
Author:
William G. Sullivan, Elin M. Wicks, C. Patrick Koelling
Publisher:
PEARSON
Principles of Economics (MindTap Course List)
Economics
ISBN:
9781305585126
Author:
N. Gregory Mankiw
Publisher:
Cengage Learning
Managerial Economics: A Problem Solving Approach
Economics
ISBN:
9781337106665
Author:
Luke M. Froeb, Brian T. McCann, Michael R. Ward, Mike Shor
Publisher:
Cengage Learning
Managerial Economics & Business Strategy (Mcgraw-…
Economics
ISBN:
9781259290619
Author:
Michael Baye, Jeff Prince
Publisher:
McGraw-Hill Education