Consider a duopoly market with 2 firms. Aggregate demand in this market is given by Q = 500 – P, where P is the price on the market. Q is total market output, i.e., Q = QA + QB, where QA is the output by Firm A and QB is the output by Firm B. For both firms, marginal cost is given by MCi = 20, i=A,B. Assume the firms compete a la Cournot. 1. Find the inverse demand in this market. Note that marginal revenue for both firms is given by MRA=500-2QA-QB, MRB=500-QA-2QB. Describe what a best-response curve is and how to find it. Derive the best-response function for each firm. What are the equilibrium quantities? What is the total quantity supplied on this market? What is the equilibrium price in this market?
Consider a duopoly market with 2 firms. Aggregate
Q = 500 – P,
where P is the price on the market. Q is total market output, i.e., Q = QA + QB, where QA is the output by Firm A and QB is the output by Firm B. For both firms, marginal cost is given by MCi = 20, i=A,B.
Assume the firms compete a la Cournot.
1. Find the inverse demand in this market.
Note that marginal revenue for both firms is given by
MRA=500-2QA-QB,
MRB=500-QA-2QB.
Describe what a best-response curve is and how to find it.
Derive the best-response function for each firm.
What are the
What is the total quantity supplied on this market?
What is the
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