Question

A firm producing hockey sticks has a production function given by q=2 ki, In the short run, the firm's amount of capital equipment is fixed at k = 100. The rental rate for kis y=$1, and the wage rate for l is w = $4. a. Calculate the firm's short-run total cost curve. Calculate the short-run average cost curve. b. What is the firm's short-run marginal cost function? What are the SC, SAC, and SMC for the firm if it produces 25 hockey sticks? Fifty hockey sticks? One hundred hockey sticks? Two hundred hockey sticks? c. Graph the SAC and the SMC curves for the firin. Indicate the points found in part (b). d. Where does the SMC curve intersect the SAC curve? Explain why the SMC curve will always intersect the SAC curve at its lowest point. Suppose now that capital used for producing hockey sticks is fixed at Te in the short run. e. Calculate the firm's total costs as a function of q, w, v, and . f. Given q, w, and v, how should the capital stock be chosen to minimize total cost? g. Use your results from part (f) to calculate the long-run total cost of hockey stick production. h. For w = $4, v = $1, graph the long-run total cost curve for hockey stick production. Show that this is an envelope for the short-run curves computed in part (e) by examining values of K of 100, 200, and 400.

does this involve langragian method using CES production function? please solve as the answer posted isn't understandable.

Answer 1

Please note that I have solved almost all except one, which is way more than HOMEWORKLIB POLICY. Thanks.

$1584343850070_Cost1.png$

Dukun k=f(3) oktobe 1643)*(aw**** r W 4 w ve dlm Total cost (C) = wat vk - wq3 (2)" > LAC = WJq3 (2v); wh 9713 4 w 2/3 2 + V3 w § 4

Cost . 50 250 300 100 150 200 Output (Number of hockey sicks)