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5. Prove that when the production function is homogeneous of degree one, it may be as...
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....
PROBLEM #1 Consider a market with two firms that sell products that are identical. Su market demand is as follows: P-56-Q , where Q measures the total output produced by both firms (that is, Q=q +q.) and qi and q, are the quantities produced by firm 1 and firm 2, respectively. The per-unit cost of production is $6 for each firm, and so the firm's cost functions are 6q, and 6q, respectively. Each firm seeks to maximize profits. The firms...
2*. Consider a market with two firms where the inverse demand function is given by p = 28 - 2q and where q = q1 + q2. Each firm has the total cost function c(qi) = 4qi, where i = {1,2}. a) Compare price level, quantities and profits in this market calculating the Cournot equilibrium and the Stackelberg equilibrium. Draw a graph with best response functions and illustrate the Cournot and Stackelberg solutions in that graph. b) Compare your solutions...
2*. Consider a market with two firms where the inverse demand function is given by p = 28 - 2q and where q = q1 + q2. Each firm has the total cost function c(qi) = 4qi, where i = {1,2}. a) Compare price level, quantities and profits in this market calculating the Cournot equilibrium and the Stackelberg equilibrium. Draw a graph with best response functions and illustrate the Cournot and Stackelberg solutions in that graph. b) Compare your solutions...
2*. Consider a market with two firms where the inverse demand function is given by p = 28 - 2q and where q = q1 + q2. Each firm has the total cost function c(qi) = 4qi, where i = {1,2}. a) Compare price level, quantities and profits in this market calculating the Cournot equilibrium and the Stackelberg equilibrium. Draw a graph with best response functions and illustrate the Cournot and Stackelberg solutions in that graph. b) Compare your solutions...
(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...
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-response function for each firm. b) Assume that the firms play a simultaneous move game. Characterize the Nash Equilibrium. cSuppose the two firms play game is a sequential game with the following timing of events: 1. Firm 1 chooses output 2. Firm 2 observes firm 1's output and then...
A homogeneous products duopoly faces a market demand function given by P a - Q, where QQ Q2 and a>300. Both firms have constant marginal costs MC-100. There are no fixed costs. a) What is firm 1's optimal quantity given that firm 2 produces an output of 50 units per year? And what is firm's 1 quantity if firm 2 produces 20 units? [4 marks] b) Derive the equation of each firm's reaction function and provide a graphical explanation to...
can someone help me with question 9? QUESTION 9 A homogeneous products duopoly faces a market demand function given by P-a-Q, where Q Q1 + Q2 and a-300. Both firms have constant marginal costs MC-100. There are no fixed costs a) What is firm 1's optimal quantity given that firm 2 produces an output of 50 units per year? And what is frm's 1 quantity if firm 2 produces 20 units? 4 marks) b) Derive the equation of each firm's...
Consider a cournot model of a duopoly market where Firm X and Firm Y operate. Each firm has marginal cost equal to $20, and the market demand is Q = 100 - (1/2) P. There are no fixed costs. a) Show the best-response function of each firm. b) Calculate the profit-maximizing output level for each firm. c) What is the equilibrium price? d) Calculate the profit for each firm.