You are the manager of a firm that produces output in two plants. The demand for your firm's product is P = 120 - 6Q, where Q = Q 1 + Q 2. The marginal cost associated with producing in the two plants are MC 1 = 2Q 1 and MC 2 = 4Q 2. What price should be charged in order to maximize revenues?
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You are the manager of a firm that produces output in two plants. The demand for...
You are the manager of a firm that produces output in two plants. The demand for your firm’s product is P = 80 – Q, where Q = Q1+ Q2. The marginal cost associated with producing in the two plants are MC1 = Q1 and MC2 = 8. How much output should be produced in plant 1 in order to maximize profits? 2 4 8 14 Please help/ show work. Thank you
Suppose you are the manager of a watchmaking firm operating in a competitive market. Your cost of production is given by C = 100+ 0 + 2q? where q is the level of output and C is total cost. (The marginal cost of production, MC(q), is 4q; the fixed cost, FC, is $100). If the price of a watch is $80, how many watches should you produce to maximize profits? You should produce watches. (Enter your response as an integer.)
You are the manager of a monopolistically competitive firm. Your demand and total costs are represented by Demand Q = 36 – 4P Total cost = 4 + 4Q + Q2. 2a What is the expression for marginal revenue? 2b What is the expression for marginal cost? 2c To maximize profit what output level should it make? 2d To maximize profit at what price should it sell? 2e What is the maximum value of profit?
Two firms are producing identical goods in a market characterized by the inverse demand curve P = 120 – 4Q, where Q is the sum of Firm 1's and Firm 2's output, q1 + q2. Each firm's marginal cost is constant at $20. Graph the reaction function for each firm and indicate the Nash equilibrium.
8. Consider the following Demand (Price and Marginal Revenue) and Cost (Total and Marginal) relationships expressed as functions of Q: Price = P(Q) = 310 – 2Q TC = TC(Q) = 3500 + 70Q + Q2 MR = MR(Q) = 310 – 4Q MC = MC(Q) = 70 + 2Q a. What is the profit-maximizing level of output? What is the price at that level? b. Should the firm continue operating in the short run? In the long run? c....
A competitive firm's cost of producing q units of output is C = 18 + 4q + q^2 Its corresponding marginal cost is MC = 4 + 2q. a. The firm faces a market price p = $24. Create a spreadsheet with q = 0, 1, 2, ..... 15, where the columns are q, R, C, VC, AVC, MC, and profit. Determine the profit-maximizing output for the firm and the corresponding profit. Should the firm produce this level of output...
4. Suppose you are the manager of a watch making firm operating in a competitive market. Your cost of production is given by C200+2q, where q is the level of output and C is total cost. (The marginal cost of production is 4q; the fixed cost is $200.) (a Ifthe price of watches is$100, how many watches should you produce to maximize profit? (b) What will the profit level be? (c) At what minimum price will the firm produce a...
A firm produces a product in a competitive industry and has a total cost function (TC) of TC(a) 60+4q+2q2 and a marginal cost function (MC) of MC(q) = 4 + 4q. At the given market price (P) of $20, the firm is producing 4.00 units of output. Is the firm maximizing profit?V What quantity of output should the firm produce in the long run? The firm should produce unit(s) of output. (Enter your response as an integer.)
A monopolist with two plants operates with a marginal revenue of 500-4Q and marginal costs of 4Q for plant 1 and 2Q for plants 2. what are the outputs at each plant to maximize profits? what price maximizes profits? what will be the maximum profits?
Question #5: (10 points) Suppose that a monopolist produces an identical product in three plants and face an inverse demand function P = 40 - QF = Q, + Q, +Q,. The output from the three plants is where total quantity in all three plants is Q produced at the costs c = Q + Q C₂ = 30, z = 2Q - Qz where C refers to the total cost required to produce Q, units from each facility, i...