Assumptions Market Demand: P = 14- Qrotal Two P = 16- 1 [HD] Groups: P =...
(16 points) Cournot Duopoly. Market demand is p(Q) = 50 – 4Q, where Q = 4+ 42. Firm 1's cost function is C (91) = 0, and firm 2 has a cost function C2(92) = 1092- The two firms engage in Cournot competition; they simultaneously choose a quantity and the price adjusts so that the market clears. (a) Formally write firm 1's profit maximization problem (b) Find firm l's best response function. (c) Take as given that firm 2's best...
In Cournot duopoly , the inverse demand function is P=150-Q Firm 1 and Firm costs are C1=1000+12q1 and C2=2000+6q2 What is the profit maximization , best reaction function to find Nash equilibrium Price
Demand in a market dominated by two firms (a Cournot duopoly) is determined according to: P = 300 – 4(Q1 + Q2), where P is the market price, Q1 is the quantity demanded by Firm 1, and Q2 is the quantity demanded by Firm 2. The marginal cost and average cost for each firm is constant; AC=MC = $74. The cournot-duopoly equilibrium profit for each firm is
Question 5 Demand in a market dominated by two firms (a Cournot duopoly) is determined according to: P = 200 – 2(Q1 + Q2), where P is the market price, Q1 is the quantity demanded by Firm 1, and Q2 is the quantity demanded by Firm 2. The marginal cost and average cost for each firm is constant; AC=MC = $60. The cournot-duopoly equilibrium profit for each firm is _____. Hint: Write your answer to two decimal places. QUESTION 6...
Demand in a market dominated by two firms (a Cournot duopoly) is determined according to: P = 200 – 2(Q1 + Q2), where P is the market price, Q1 is the quantity demanded by Firm 1, and Q2 is the quantity demanded by Firm 2. The marginal cost and average cost for each firm is constant; AC=MC = $75. The cournot-duopoly equilibrium quantity produced by each firm is _____. Hint: Write your answer to two decimal places.
Suppose two firms cannot collude and compete in the Cournot Model. Market demand is Q = 18 – P with the cost (c(Q) =*Q). a. Set up firm l's profit maximization. b. Solve for firm l's best response function. c. Solve for firm l's quantity, firm 2's quantity, the equilibrium market quantity, and price. Show your work. d. Is this a Nash equilibrium?
3. Cournot Competition (26 points) Consider a Cournot model. The market demand is p=130-41-42. Firm l's marginal cost is 10. and firm 2's marginal cost is also 10. There are no fixed costs. A. (10 points) Derive the best response function for each firm. B. (6 points) Find the Nash Equilibrium.
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1. A market has an inverse demand curve and four firms, each of which has a constant marginal cost of. If the firms form a profit-maximizing cartel and agree to operate subject to the constraint that each firm will produce the same output level, how much does each firm produce? 2. Duopoly quantity-setting firms face the market demand curve. Each firm has a marginal cost of $60 per unit. a. What is the Nash-Cournot equilibrium?...
2. (Cournot Model) Consider a Cournot duopoly. The market demand is p=160 - q2. Firm 1's marginal cost is 10, and firm 2's marginal cost is also 10. There are no fixed costs. A. Derive each firm's best response function B. What is the Nash equilibrium of this model? Find the equilibrium market price. C. Find the equilibrium profit for each firm D. Find the equilibrium consumer surplus in this market. 3. (Bertrand Model) Consider a Bertrand duopoly. The market...
Two firms compete in a market with demand given by D(p) = 100 − p, where p is denoted in cents (p=100 is 1 dollar). Firms can only charge prices in whole cents – i.e. p can only take integer values, and not values like 1.5. Marginal costs for each firm are given by MC=10. Firms compete by simultaneously choosing prices. When prices are equal, each firm gets one half of total demand. b. Find all the Nash equilibria of...