Problem three Two firms in a homogencous-product duopoly market (firm 1 and firm 2) have the following cost and demand functions: TC 4 TC24q2 and Q-40-P: Q-+2 a Derive the reaction function/best-resp...
Two duopoly firms each have a cost function: TC(Q) 60Q Market Inverse Demand is: Pp (Q)824 0.6Q After the duopolists meet secretly and agree to evenly split the profit-maximizing output, Firm 1 decides to break the monopoly-splitting agreement and change its output to maximize its own profit. What will be the net loss of profit for the two firms to the nearest dollar? Two duopoly firms each have a cost function: TC(Q) 60Q Market Inverse Demand is: Pp (Q)824 0.6Q...
2. Two firms produce homogeneous products. Market demand is given by Q = 40-P, and each firm faces a marginal cost of production of 4 per unit The timing of the game is as follows. In Period 1, firm 1 chooses the quantity q it will sell. In Period 2, firm 2 (who observed firm 1s choice in period 1) chooses whether or not to enter the market. If firm 2 chooses to enter it must pay an entry fee...
Two duopoly firms each have a cost function: TC (Q) 600 Market Inverse Demand is: Po (Q)-824 0.6Q After the duopolists meet secretly and agree to evenly split the profit-maximizing output, Firm 1 decides to break the monopoly-splitting agreement and change its output to maximize its own profit. What will be the reduction in price for both firms to the nearest dollar? (Subtract the new price from the monopoly price] Two duopoly firms each have a cost function: TC (Q)...
Suppose that the inverse market demand for a commodity is given by P = 240 Q The cost curves of the three firms which could serve this market are TC,(a) 30q +300 and TC2() (d) Suppose that firms engage in Stackelberg rather than Cournot competition. Firm 1 moves first by choosin its output level. After Firm 1 has chosen its output level, Firm 2 observes ql and chooses its output leve Find the subgame-perfect Nash equilibrium of the Stackelberg game....
A duopoly market in which demand is given by 180-2q. The total cost for firm 1 is TC = 60q1, the total cost for firm 2 is TC1 = 66q2. The good is homogeneous. A) Solve for when Firm 1 chooses the quantity before firm 2. What is the subgame Nash equilibrium? b) Solve when the firms compete simultaneously. What is the Nash 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...
1. Consider the following asymmetric version of the Cournot duopoly model. Two firms compete by simultaneously choosing the quantities (q, and q2) they produce. Their products are homogeneous, and market demand is given by p- 260-2Q, where Q-q +q2. Firm 1 has a cost advantage; Firm 1 produces at zero cost, while Firm 2 produces at a constant average cost of 40. (The difference in costs is what makes this an asymmetric game.) a. Derive both firms' profit functions, as...
Two profit-maximizing firms compete in a market. Firm 1 chooses quantity qı > 0 and Firm 2 chooses quantity 42 > 0. The market price is: p(91,92) = 8 - 2q1 - 42. The cost to Firm 1 of producing qi is C1 = 41. The cost to Firm 2 of producing 92 is C2 = 42 + 42. a.) * Calculate the best-response function for each firm. b.) Suppose the two firms choose their quantities simultaneously. What is the...
Two firms are participating in a Stackelberg duopoly. The demand function in the market is given by Q = 2000 − 2P. Firm 1’s total cost is given by C1(q1) = (q1) 2 and Firm 2’s total cost is given by C2(q2) = 100q2. Firm 1 is the leader and Firm 2 is the follower. (1) Write down the inverse demand function and the maximization problem for Firm 1 given that Firm 2 is expected to produce R2(q1). (2) Compute...
5. Cournot Competition Consider a Coumot duopoly model. Suppose that market demand is P-a-qi Also suppose that the cost functions of the two firms are TG (q) = q, and T( (a) Write the profit function, and the first order condition. (b) Find out the profit maximizing output for each firm. (c) Find the pofit earned by each firm, total profit eamed by the two fims to (d) Now assume that the two firms collude and act as a monopoly....