Consider a Cournot competition with two firms, A and B. The
marginal costs of each
firm is MCA = MCB = 40. The inverse demand function is P = 130 - Q.
Find the Nash equilibrium
quantities for each firm and the market price.
Consider a Cournot competition with two firms, A and B. The marginal costs of each firm...
Consider two Cournot firms, Firm A and Firm B. Firm A has a marginal cost of 10 and Firm B has a marginal cost of 5. They face the market inverse demand function: P=120-Q How many units will Firm A produce?
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.
please answer all 10 questions thanks Suppose there are only two firms in the marker, firm A and firm B. They produce identical products. Firm A and firm B have the same constant marginal cost, MCA = MCB = ACA = ACB = 25. The market demand function is given by Q = 400 – 4P. a. If the firms practice under the Bertrand model, what will be the Nash equilibrium market price and output level? b. If these two...
I. Consider a three firm (n = 3) Cournot oligopoly. The market inverse demand function is P()-24 Q. Firm 1 has constant average and marginal costs of $12 per unit, while firms 2 and 3 have constant average and marginal costs of $15 per unit. p (Q) (a) Verify that the following are Nash equilibrium quantities for this market: q,-. and g2 = g3 We were unable to transcribe this image
Problem 3. Cournot Competition with Different Costs Suppose there are two firms engaged in quantity competition. The demand is P = 2 - Q where Q=q1 +22. Assume cı = { and c2 = , i.e., Firm 2 is more efficient. Compute the Cournot equilibrium (i.e., quantities, price, and profits). price, and profits).
Problem 3. Cournot Competition with Different Costs Suppose there are two firms engaged in quantity competition. The demand is P = 2 - Q where Q =q1+q2. Assume ci = 1 and c2 = , i.e., Firm 2 is more efficient. Compute the Cournot equilibrium (i.e., quantities, price, and profits).
Cournot Problem. Consider a Cournot oligopoly with two identical firms. These firms cach have constant marginal costs of $10. The market for these firms, product has demand Q 100-P 27. Refer to Cournot Problem. Each firm will producc. a. 22.5 units b. 30 units. С. 45 units. d. 90 units. ANS: B PTS: 1 28. Refer to Cournot Problem. Total industry output will be units. b. 45 units. С. 60 units. d. 90 units. ANS: C PTS: 1 29. Refer...
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...
1. Suppose there are only two firms in the marker, firm A and firm B. They produce identical products. Firm A and firm B have the same constant marginal cost, MCA MCB ACA ACB 25 The market demand function is given by 0-400 4P. e. Calculate the profits for each firm in the Cournot model. f. g. Is the monopoly outcome stable? If firm A operates under the monopoly outcome, h. Graph the monopoly outcome, cournot outcome and perfect competition...
4. Consider 2 firms selling fertilizer competing as Cournot duopolists. The inverse demand function facing the fertilizer market is P = 1 - where Q = 94 +98. For simplicity, assume that the long-run marginal cost for each firm is equal to X, i.e. C(q)=Xq for each firm. a) Find the Cournot Nash equilibrium where the firms choose output simultaneously b) Find the Stackelberg Nash Equilibrium where firm A as the Stackelberg leader. How much does the leader gain by...