Two firms compete in a market to sell a homogeneous product with inverse demand function P = 600 – 6Q. Each firm produces at a constant marginal cost of $300 and has no fixed costs. Use this information to compare the output levels and profits in settings characterized by Cournot, Stackelberg, Bertrand, and collusive behavior. Please show steps.
Two firms compete in a market to sell a homogeneous product with inverse demand function P...
Two firms compete in a market to sell a homogeneous product with inverse demand function. P = 500 – 2Q. Each firm produces at a constant marginal cost of $100 and has no fixed costs. Use this information to compare the output levels and profits in settings characterized by Cournot, Stackelberg, Bertrand, and collusive behavior. Show the detail of your work and summarize your results in a table. Outputs Profits il= Cournot 12= Stackelberg Ql= Q2= Q1= Q2= Ql= Q2=...
Please show step by step. Two firms compete in a market to sell a homogeneous product with inverse demand function P= 600 - 3Q. Each firm produces at a constant marginal cost of $300 and has no fixed costs. Use this Information to compare the output levels and profits in settings characterized by Cournot, Stackelberg, Bertrand, and collusive behavior. Instruction: Do not round Intermediate calculations. Round final answers to two decimal places for Cournot values. Cournot output for each firm:...
Please answer step by step: Two firms compete in a market to sell a homogeneous product with inverse demand function P= 400-2Q. Each firm produces at a constant marginal cost of $50 and has no fixed costs. Use this information to compare the output levels and profits in settings characterized by Cournot, Stackelberg, Bertrand, and collusive behavior.
1. Consider a market with inverse demand P(Q) = 100 Q and two firms with cost function C(q) = 20q. (A) Find the Stackelberg equilibrium outputs, price and total profits (with firm 1 as the leader). (B) Compare total profits, consumer surplus and social welfare under Stackelberg and Cournot (just say which is bigger). (C) Are the comparisons intuitively expected? 2. Consider the infinite repetition of the n-firm Bertrand game. Find the set of discount factors for which full collusion...
A homogeneous product duopoly faces a market demand function given by p = 300 - 3Q,where Q = q1 + q2. Both firms have constant marginal cost MC = 100. (part 2) 1a. What is the Bertrand equilibrium price and quantity in this market? 1b. Suppose Firm 1 is the Stackelberg leader, what is the equilibrium price in this market if Firm 2 plays the follower in this duopoly market? What is the equilibrium quantity? How much does each firm...
An industry consists of two Cournot firms selling a homogeneous product with a market demand curve given by P=100-Q1-Q2. Each firm has a marginal cost of $10 per unit. (a) Find the Cournot equilibrium quantities and prices. (b) What is the Bertrand equilibrium price in this market? (c) Find the quantities and price that would prevail if the firms acted as if they were a monopolist (I.e. find the collusive outcome) and then find the equilibrium price and quantity that...
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...
Two firms compete as a duopoly. The demand they face is P = 100 - 3Q. The cost function for each firm is C(Q) = 4Q. Determine output, and profits for each firm in a Cournot oligopoly If firms collude, determine output and profit for each firm. If firm 1 cheats on the collusion in item 2, determine output and profit for each firm. Graph the reaction functions and identify the points from parts 1, 2 and 3. Determine output,...