Suppose a monopolist has a production function given by Q = (L^1/2)/(K^1/2). Therefore, MPL =( k^1/2)...

Suppose a monopolist has a production function given by Q = L1/2K1/2. Therefore,MPL = , and...

Suppose a monopolist has a production function given by Q = L1/2K1/2. Therefore,MPL = , and MPK = 2/12/12LK2/12/12KLThe monopolist can purchase labor, L at a price w = 16, and capital, K at a price of r = 9. The demand curve facing the monopolist is P = 360 – 2Q.a) (8 points) What is the monopolist’s total cost function? b) (4 points) How much output should the monopolist produce in order to maximize profit?c) (6 points) How much...

Suppose a firm’s production function is given by Q = L1/2*K1/2. The Marginal Product of Labor...

Suppose a firm’s production function is given by Q = L1/2*K1/2. The Marginal Product of Labor and the Marginal Product of Capital are given by: MPL = (K^1/2)/2L^1/2 & MPK = (L^1/2)/2K^1/2) a) (12 points) If the price of labor is w = 48, and the price of capital is r = 12, how much labor and capital should the firm hire in order to minimize the cost of production if the firm wants to produce output Q = 10?...

A firm has the production function: Q = L 1 2 K 1 2 Find the...

A firm has the production function: Q = L 1 2 K 1 2 Find the marginal product of labor (MPL), marginal product of capital (MPK), and marginal rate of technical substitution (MRTS). Note: Finding the MRTS is analogous to finding the MRS from a utility function: MRTS=-MPL/MPK. Be sure to simplify your answer as we did with MRS. A firm has the production function: Q = L 1 2 K 3 4 Find the marginal product of labor (MPL),...

Consider a firm which has the following production function Q=f(L,K)=4?LK (MPL=2?(K/L) and MPK=2?(L/K). (a) If the...

Consider a firm which has the following production function Q=f(L,K)=4?LK (MPL=2?(K/L) and MPK=2?(L/K). (a) If the wage w= $4 and the rent of capital r=$1, what is the least expensive way to produce 16 units of output? (That is, what is the cost-minimizing input bundle (combination) given that Q=16?) (b) What is the minimum cost of producing 16 units? (c) Show that for any level of output Q, the minimum cost of producing Q is $Q.

Firm A’s production function and cost line are given by:Q=Q(L,K)=2 L^(1/2) K^(1/2) (The production function)...

Firm A’s production function and cost line are given by:Q=Q(L,K)=2 L^(1/2) K^(1/2) (The production function)?L+?=30000 (The cost line of firm A):?L is the amount of labor hired.?K is the amount of capital hired.??p_L or the price of labor is 1 dollar per unit.??p_K or the price of capital is 1 dollars per unit.C or cost (think of it as the firm’s budget) is 30000 dollars.How much labor and capital should this firm optimally hire?

A firm produces an output with the production function Q=K*L2, where Q is the number of...

A firm produces an output with the production function Q=K*L2, where Q is the number of units of output per hour when the firm uses K machines and hires L workers each hour. The marginal product for this production function are MPk =L2 and MPl = 2KL. The factor price of K is $1 and the factor price of L is $2 per hour. a. Draw an isoquant curve for Q= 64, identify at least three points on this curve....

A firm produces output according to the production function. Q=sqrt(L*K) The associated marginal products are MPL...

A firm produces output according to the production function. Q=sqrt(L*K) The associated marginal products are MPL = .5*sqrt(K/L) and MPK = .5*sqrt(L/K) (a) Does this production function have increasing, decreasing, or constant marginal returns to labor? (b) Does this production function have increasing, decreasing or constant returns to scale? (c) Find the firm's short-run total cost function when K=16. The price of labor is w and the price of capital is r. (d) Find the firm's long-run total cost function...

A firm’s production function is Q(L,K) = K^1/2 + L. The firm faces a price of...

A firm’s production function is Q(L,K) = K^1/2 + L. The firm faces a price of labor, w, and a price of capital services, r. a. Derive the long-run input demand functions for L and K, assuming an interior solution. If the firm must produce 100 units of output, what must be true of the relative price of labor in terms of capital (i.e. w/r) in order for the firm to use a positive amount of labor? Graphically depict this...

1. Suppose a firm’s production function is given by Q = K(1/3)L(2/3), whereMPK = 1K(−2/3)L(2/3) and...

1. Suppose a firm’s production function is given by Q = K(1/3)L(2/3), whereMPK = 1K(−2/3)L(2/3) and MPL = 2K(1/3)L(−1/3) 33 (a) What happens to MPK as K increases? Hint: consider how MPK changes as Kchanges by one unit at low values of K high levels of K. (2 points) (b) What happens to MPK as L increases? (2 points) (c) Explain why MPK changes as L changes. (3 points)

Consider the production function Q = f(L,K) = 10KL / K+L. The marginal products of labor...

Consider the production function Q = f(L,K) = 10KL / K+L. The marginal products of labor and capital for this function are given by MPL = 10K^2 / (K +L)^2, MPK = 10L^2 / (K +L)^2. (a) In the short run, assume that capital is fixed at K = 4. What is the production function for the firm (quantity as a function of labor only)? What are the average and marginal products of labor? Draw APL and MPL on one...