The production process used 2 inputs: Labor (L) and Capital (K). The production function is Q = min{2L,K} , the price of L is $3 and the price of K is $6. What's the minimum cost that the firm has to pay to produce 8 units?___
The production process used 2 inputs: Labor (L) and Capital (K). The production function is Q...
Assume a firm' production function is Q = 3K +L • In this case, inputs (K and L) are perfect substitutes. Can you give a real example where this production function works? Assume price of capital is r = 5, and price of labor is w = 1 How many units of capital and labor is need to produce Q=60 in cheapest way? O Show your logic using cost minimization condition, and Analyze it graphically
janetta produces bratwurst using two inputs, labor and capital. her production process has the production function q=2l^0.5k^0.5, assume she wants to produce q=1500, price for labor is 15,price of capital is 30. write out the equation for the isocost curve that janetta faces
Consider a firm using two inputs; capital (K) and labor (L) in production. The firm's production technology is characterized by the following production function: Q = F(K, L) = 40K L In the short run (SR), the quantity of the capital (K) that the firm uses is fixed at K = 10 whereas the quantity of the labor input can be varied. Price of labor is $4,000 per worker and the price of capital is $2,000 per capital. (PL=$4,000 and...
Suppose a firm can use either Capital (K) or Labor (L) in a production process. The firms Production function is given by Q = 5L + 15K. The price of Capital is $20 per unit and the price of Labor is $8 per unit. a) (4 points) What is the firm’s Total Cost function? TC(Q) = ____________________________ b) (8 points) Suppose the firm is producing 30 units of output (Q = 30). Using a graph, draw the firm’s isoquant for...
A small firm uses inputs L & K to produce output Q, and the production function is Q = K + 4L. The firm needs to produce exactly Q* output. The price of K is $2 and the price of L is $1. What is the firm’s total cost function TC(Q*)?
Suppose a firm can use either Capital (K) or Labor (L) in a production process. The firm’s production function is given by Q = 5L + 15K. The price of Capital is $20 per unit and the price of Labor is $8 per unit. What is the Total cost function?
Suppose a firm has the production function: Q=2KL, where K is capital, L is labor and Q is quantity. If capital is fixed at 4 in the short run. What is the short run production function? A. Q=2L B. Q=8L C. Q=2K D. Q=8K
1. Consider the following production function: Q = f(K, L) = (K^1/2) (L^1/2) a) Place capital on the vertical axis and labor on the horizontal axis. Determine the marginal rate of technical substitution. b) Suppose that the price of capital is $10, 000, and the price of labor is $10, 000. What is the ratio of capital to labor that allows the firm to produce any given quantity of output as cheaply as possible. c) Suppose that the price of...
Consider a production function of three inputs, labor, capital, and materials, given by Q= LKM. The marginal products associated with this production function are as follows: MPL = KM, MPk = LM, and MPM = LK. Let w = 5, r = 1, and m = 2, where m is the price per unit of materials. (a) Suppose that the firm is required to produce Q units of output. Show how the cost-minimizing quantity of labor depends on the quantity Q....
Suppose a production function is given by F(K, L) = KL2 ; the price of capital is $10 and the price of labor is $15. What combination of labor and capital minimizes the cost of producing any output? To produce a given level of output q, how many units of L and K are needed? Express the optimal inputs choices L(q) and K(q) as functions of the level of output q