A monopoly's total cost function is TC = 200 + 8Q +4Q2. The inverse demand function...
1. A monopoly’s total cost function is TC = 200 + 8Q + 4Q2. The inverse demand function is P = 400 – 10Q. What will be the monopoly’s profit if it charges a single price to all customers? Group of answer choices a.$2,150 b.$3,420 c.$3,640 d.$2,544 $1,980 2. A Cournot oligopoly has four firms in the industry. The market price elasticity of demand is –2.5 and the marginal cost of production is $200. What is the profit-maximizing price, rounded...
A monopolist has a total cost function TC = 8Q2 + 100. The inverse demand function for the monopolist is P = 18- Q. What is the optimal price for the monopolist and what is consumer surplus
Suppose the total cost function for a firm is given by: TC= 100 + 2q +4q2. Find the marginal cost function and then use that to determine the marginal cost of the 10th unit.
A monopolist’s inverse demand is P=500-2Q, the total cost function is TC=50Q2 + 1000Q and Marginal cost is MC=100Q+100, where Q is thousands of units. a). what price would the monopolist charge to maximize profits and how many units will the monopolist sell? (hint, recall that the slope of the MARGINAL Revenue is twice as steep as the inverse demand curve. b). at the profit-maximizing price, how much profit would the monopolist earn? c). find consumer surplus and Producer surplus...
1. A monopoly is facing an inverse demand curve that is p=200-5q. There is no fixed cost and the marginal cost of production is given and it is equal to 50. Find the total revenue function. Find marginal revenue (MR). Draw a graph showing inverse demand, MR, and marginal cost (MC). Find the quantity (q) that maximizes the profit. Find price (p) that maximizes the profit. Find total cost (TC), total revenue (TR), and profit made by this firm. Find...
Consider a monopolist facing the following inverse demand function: P = 200 - Q The total cost function is given by C = 100 + 50Q + 0.5Q^2 What is the monopolist's uniform profit-maximizing price? a. 130 b. 140 c. 150 d. 160
Q: Suppose a firm's total cost function is TC = 16 + 5Q + 4Q2 . What is the output level that minimizes average total cost?
Afirm's inverse demand function is P = 200 - 100. Its marginal cost and average total cost are constant at $40. What price will the firm charge if it uses block pricing? $3,840 $1,920 $920 $2,420 $2,860
A monopolist has demand function Q(P)-ap-ε (with lel > 1) and total cost function TC(Q)-cQ (a) Show that the demand elasticity is -e (b) Find the firm's optimal price as a function of c and ε. (c) What happens to price as є ічі.e. є approaches 1 from the right side of the number line)? (d) What is the monopoly's profit-maximizing output?
Demand function: P=20-Q Total Cost function: C=Q22 +8Q+2 1. What output maximizes total profit? What are the corresponding values of price, profit, and total revenue (sales)? 2. What output maximizes sales, and what are the corresponding values of price, profit, and total revenue?