Suppose the short run cost function for a competitive firm is C(Y)= 4Y2+ 200 where Y is the total output. Find the profit maximizing supply for the firm if the output price is $16 and the maximum profit. What is its short run decision: To produce or not to produce?
Suppose the short run cost function for a competitive firm is C(Y)= 4Y2+ 200 where Y...
1. Suppose that a firm operating in perfectly competitive industry has short-run cost function given by C(q) = 5+2q+9. The market price is $10. (a) What is the profit-maximizing output level for this firm? (b) What is the firm's total revenue and profits at the profit-maximizing output? (c) What is the minimum price at which the firm will produce a positive level of output in the short run?
In a perfectly competitive market, a firm has the following short-run total cost function: C(q)=16+4q+q2 The market demand is Q(p)=220-p a. Show that marginal cost curve passes through the minimum point of average cost curve. Draw a figure to show it. b. Find the firm’s individual short-run supply function. Draw it on the above figure. For the following questions, suppose that there are currently 10 identical firms in this market. c. What is the market supply curve? What are the...
A firm in a perfectly competitive market has a short-run total cost curve of ST C(Q) = 20 + 10Q + Q2. The market price is $10. a) What is the profit-maximizing quantity? b) What are the maximum profits? c) Find the short-run supply curve if all fixed costs are sunk. d) Find the short-run supply curve if all fixed costs are non-sunk. e) Suppose there are 100 identical firms in this market. What is the market supply curve if...
A firm operates in a perfectly competitive industry. Suppose it has a short run total cost function given by TC = 1200 + 2Q + 0.03Q2. If the market price is $38, what is the firm’s profit maximizing quantity?
Suppose a perfectly competitive firm has the short-run cost function C = 125 + q2. Use the derivative formula or marginal cost to determine the firm’s output level and profit at prices of $30 and $20. At what price does the firm reach the shut-down point?
Consider the following cost curve for a firm in a competitive industry where the market price equals $200 C = 1/3q3+4q+750 What is the firm's marginal cost (MC)? MC = At what level of output does the firm maximize profits (minimize losses)? Profit is maximized at __units of output. (Round your answer to two decimal places.) What is the firm's profit maximizing price? The profit-maximizing price is $___ In the short-run, this firm should produce ____ .
competitive firm is the . 4. the vert Mive is atroduction. The short-run supply curve of ortion of its short-tun marginal cost curve that is competitive firm in the above its average variable cost curve, The o ward sloping an u petitive firm is the portion of its short-run marginal cost curve that supply curve of a Leuward-sloping and lies above its long-run average cost curve. Example: A firm has the long-run cost function cy) = 2y + 200 for...
2. Profit maximization. Suppose that each perfectly competitive firmi in an industry has the short-run cost function TC 20 +4q+, and the market price is S20. What is the profit-maximizing output level for each firm? What is the total revenue? What are the profits?
Suppose that Jessica faces the following total cost function: C(y) = 2y2 + y + 200 Note that 200 denotes the fixed cost component. Use this information in answering this part of the submission question. (a) Find the Marginal cost function, Average Cost function, Average Variable cost function and the Average fixed cost function. Once you obtain these, sketch them on the grid below. (b) Derive the short run supply function for Jessica. Suppose p = 61. How much y...
1. Suppose a perfectly competitive firm has a cost function described by TC = 200Q + Q 2 + 225 Each firm’s marginal revenue is $240. a. Find the profit maximizing level of output. b. Is this a short-run or long-run situation? How do you know? c. Assuming that this firm’s total cost curve is the same as all other producers, find the long-run price for this good.