The production function of a firm is given as Q = 50√KL. Here Q
is the output produced, K is the capital input and L is the labor
input.
a) Obtain the production function by using factor demand
functions.
b) Find the long run total cost function for this production
function in terms of input prices and outputs. If the unit cost of
labor is $ 25 and the rent cost of capital is $ 100, write the
total cost function in terms of output and graph.
The production function of a firm is given as Q = 50√KL. Here Q is the...
2. Consider a firm producing pizza with production function q = KL, that faces input prices w= $10 and r = $100 for labor and capital, respectively. a. Derive the isoquant equation. Find the isoquant of an output q = 1. Draw it in a figure with l in the horizontal axis and k in the vertical axis. b. Does this firm's production exhibit increasing, decreasing or constant returns to scale? Briefly explain c. Find the labor demand, and the...
A firm has the following production function Q= √KL Where Q is output per week and K and L are units of capital and labor per week. If rental price of capital v= 100 per week and the wages w = 400 per week obtain the quantity of K and L that min the cost for Q = 10.
A firm has a production function q = KL, where q is the quantity of output, K is the amount of capital and L is the amount of labor. a) Does this production function exhibit increasing, decreasing or constant returns to scale? b) Does the long-run cost function exhibit economies of scale or diseconomies of scale? c) Is the LR Average Cost curve increasing or decreasing with q?
1. A firm operates in the long run. Its long-run production function is given as: Q = LK, where Qis units of output, Lis units of labor, and K is units of capital. (a) Obtain six integer combinations of Land K when Q = 12. (b) Obtain six integer combinations of Land K when Q = 18. (c) Use the twelve integer combinations of Land K obtained in parts (a) and (b) to construct two isoquants on a two-dimensional plane....
Imagine that your firm has a production function given by Q = 2 KL, where K is capital and L is labor. If capital rents for $100 per unit per day, labor can be hired for $200 per unit per day, and the firm is minimizing costs, a. What is the total cost of producing q units of output? b. What is the average cost of producing q units of output? c. What is the marginal of producing q units...
Conditional/Unconditional demand for an input factor A firm produces an output using production function Q = F(L, K):= L1/2K1/3. The price of the output is $3, and the input factors are priced at pL 1 and pK-6 (a) Find the cost function (as a function of output Q). Then find the optimal amount of inputs i.e., L and K) to maximize the profit (b) Suppose w changes. F'ind the conditional labor deand funtionL.Px G) whene function L(PL.PK for Q is...
Conditional/Unconditional demand for an input factor A firm produces an output using production function Q = F(L, K):= L1/2K1/3. The price of the output is $3, and the input factors are priced at pL 1 and pK-6 (a) Find the cost function (as a function of output Q). Then find the optimal amount of inputs i.e., L and K) to maximize the profit (b) Suppose w changes. F'ind the conditional labor deand funtionL.Px G) whene function L(PL.PK for Q is...
10. Consider the production function: f(KL)=K L. Let wandr denote the price of labor and capital, and let p denote the price of the output good. (a) Find the cost minimizing input bundle and the cost function as a function of w., and q. (b) Find the profit maximizing output level and the profit as a function of w, r, and p. 11. Consider the production function: f(KL)=K+L. Let w and r denote the price of labor and capital, and...
3. Suppose a firm has the production function Q = 50 KL 1) If the wage rate is $10 per unit of labor and the rental rate of capital is $5 per unit of capital, how much capital and labor should the firm employ in the long run to minimize the cost of producing 40,000 units? 2) Using the solution in part 1), what will the firm’s long-run total cost be?
A firm production function is given by q(l,k) = l0.5·k0.5, where q is number of units of output produced, l the number of units of labor input used and k the number of units of capital input used. In the short-run the firm’s amount of capital is fixed at k1 = 100. When l = 25, the firm’s marginal product of labor is [MPl].