The inverse demand curve for a monopolist's product is P=-Q/2 +60 and the TC curve for the monopolist is TC = 10Q + 200. How do you find the profit maximizing quantity and he profit maximizing price?
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The inverse demand curve for a monopolist's product is P=-Q/2 +60 and the TC curve for...
A monopolist faces inverse market demand of P = 140- TC(Q) = 20° + 10Q + 200. and has Total Cost given by (20 points) Find this monopolist's profit maximizing output level. Find this monopolist's profit maximizing price How much profit is this monopolist earning?
Questions 7 - 9 use the following information: A monopolist faces inverse market demand of P = 230 – , and has Total Cost given by TC(Q) = 5Q2 + 10Q + 1000. 7. (20 points) Find this monopolist's profit maximizing output level. 8. Find this monopolist's profit maximizing price. 9. How much profit is this monopolist earning?
2. A monopolist sells a product with a total cost function TC = 1200 +0.502. The market demand curve is given by the equation P= 300- a. Find the profit-maximizing output and price for this monopolist. Is the monopolist profitable? b. Calculate the price elasticity of demand at the monopolist's profit-maximizing price. Also calculate the marginal cost at the monopolist's profit-maximizing output. Verify that the IEPR holds.
How do I solve this problem? 4. Benson's Park is a monopolist in the local camping market in the town of West Anderson. They face an inverse demand curve given by P-400-8Q, where Q is the number of tickets they sell. The park's cost function is C(Q)-100+160 Write down Benson's profit function (2 point) Find the first-order condition for profit maximization. (2 points) Find the profit-maximizing price and quantity, and the maximum profit. (3 points) a. b. c. d. Calculate...
A monopolist faces inverse demand P = on TC(Q) = cQ. (a) Find the optimal price, P, and quantity, QM (b) Solve for the monopolist's optimal profits, TM (c) Graph the equilibrium and show consumer surplus, producer surplus and deadweight loss. Be 150 -3Q and total cost functi careful with the marginal cost curve. (d) Compute CS and PS. These will be functions of the cost parameter c. (e) Compute DWL. Similarly, it will be functions of the cost parameter...
1) All 20 consumers are alike and each has a demand curve for a monopolist's product of p=12-2q. The cost of production C(Q)=Q. Let the monopolist charge a price of $r per unit purchased and a subscription fee of $F that must be paid by each producer. Find the r and F that maximize profits. a) What is r? b) What is F? c) What is the maximum profit the monopolist can earn in this market? (pi) 2)All 200 consumers...
You are a monopolist in a market with an inverse demand curve of: P=10-Q. Your marginal revenue is: MR(Q)=10-2Q. Your cost function is: C(Q)=2Q, and your marginal cost of production is: MC(Q)=2. a) Solve for your profit- maximizing level of output, Q*, and the market price, P*. b) How much profit do you earn?
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...
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
A monopolist has a cost curve c(q) = q^2-12q+8 and faces an inverse demand curve p(q) = 80-20q. Find the monopolist price and quantity, (p,q).