does this involve langragian method using CES production function? please solve as the answer posted isn't understandable.
Please note that I have solved almost all except one, which is way more than HOMEWORKLIB POLICY. Thanks.
does this involve langragian method using CES production function? please solve as the answer posted isn't...
5. A firm produces widgets with production function: q-2vKL. In the short run, the firm's amount of capital is fixed at K = 100. The rental rate is v = 1 and the wage for L is w= 4. (a) Find the firm's short-run total cost curve (SRTC), short-run average cost curve (SRAC), and the short-run marginal cost (SMC) function. (b) Graph the firm's SAC and SMC using the following levels of production: q 25 and q= 100. (c) Find...
Please Help. Thank you very much. 3. A firm producing hockey sticks has a production function given by f(11, 12) = 21112 In the short run, the firm's amount of input two is fixed at Tz. 3.1 Calculate the firm's short-run total cost curve as a function of y, w1, W2, 72. 3.2 Suppose that I2 = 100, the price for input one is w1 = 4, and the price of input two is w2 = 1. Draw a graph...
5) A firm producing hockey sticks has a production function given by F(L,K) = 2 LK . In the short-run, the firm's amount of capital equipment is fixed at K = 100. The rental rate of capital is r=$1, and the wage rate of labor is w=$4. a. Derive the firm's short-run total cost curve. What is the short-run average total cost? What is the short-run average variable cost? b. Find the short-run marginal cost function. What are the total...
8.13. A firm produces a product with labor and capital. Its production function is described by Q = L + K. The marginal products associated with this production function are MPL = 1 and MPK = 1. Let w= 1 and r = 1 be the prices of labor and capital, respectively. a) Find the equation for the firm's long-run total cost curve as a function of quantity Q when the prices labor and capital are w = 1 and...
A firm producing hockey sticks has a production function given by . In the short run, the firm's amount of capital equipment is fixed at K = 100. The rental rate for K is $1 and the wage rate for L is $4. a. What is the firm's fixed rate cost? b. What is the firm's total cost function, TC(Q)? 2LK
1. The production function of a firm is f(1,k) = Vlk where l is labor and k is capital/machinery. a. In the short run, if the quantity of capital is fixed at 64, derive the short run total cost SC(q), average cost SAC(q), and marginal cost SMC(q) of this firm. Assume each input costs $1 per unit. At what output does the minimum of SAC(q) occur? b. If labor and capital cost r and w respectively, and the quantity of...
Answer part (A) please 1. Short Run Cost Curves: Consider two firms, producing different products, with the following production functions: (1) q-5KL q=5(KL)5 (2) a. For a short-run situation in which K=100, and given wage 3 and cost of capital 1, derive expressions short run total cost for each production function. (Start by using the production function to develop an expression for L in terms of q, and then substitute that, and the given parameters, into the generic expression for...
Suppose a firm's production function is Q = (KL)0.5. In the short run, this firm's capital stock is fixed at 100. Calculate the firm's short run total cost curve if w = 5 and v = 5. It can be shown (using calculus) that this firm's short run marginal costs are .1Q. In order to maximize its profits, how much would the firm choose to produce if the market price of its output was $5, $10, or $20. For each...
for context: Problem 1 Consider the production function + (e) Plot the long-run and short-run marginal cost curves. (f) At the point at which they intersect, is the long-run supply curve or the short-run supply curve more elastic? Problem 1 Consider the production function + (a) Assume for parts (a)-(d) that we are in the long run. Suppose the factor prices are wi = wy = 1. Show that the cost function is equal to (b) Suppose the market price...
Short Run Cost Curves: Consider two firms, producing different products, with the following production functions: q=5KL (1) q=5(KL).5 (2) a. For a short-run situation in which K=100, and given wage = 3 and cost of capital = 1, derive expressions short run total cost for each production function. (Start by using the production function to develop an expression for L in terms of q, and then substitute that, and the given parameters, into the generic expression for Total Cost =...