The production P of a certain product depends on the labor L and the quantity of...

The production P of a certain product depends on the labor L and the quantity of capital K according to
P  (L, K)      8L^1/4 K^3/4
If the total labor and capital must be 800, determine the amounts of L and K
necessary to obtain the maximum possible production.

Chapter 8, Section 8.6, Question 014 The quantity, Q, of a certain product manufactured depends on...

Chapter 8, Section 8.6, Question 014 The quantity, Q, of a certain product manufactured depends on the quantity of labor, L , and of capital, K, used according to the function Q=900L^(1/2)K^(2/3) Labor costs 100 per unit and capital costs 150 per unit. What combination of labor and capital should be used to produce units of the goods at minimum cost? What is that minimum cost? Round your answers to two decimal places.

Firm B’s production function is q = min {8L, 10K} where L is the quantity of...

Firm B’s production function is q = min {8L, 10K} where L is the quantity of labor and K is the quantity of capital used to produce output q. Let PL and PK denote price of labor and price of capital, respectively. Derive Firm B’s long-run total cost function. Show your work.

Suppose a Cobb-Douglas Production function is given by the following: P(L,K)=10L0.9K0.1 where L is units of...

Suppose a Cobb-Douglas Production function is given by the following: P(L,K)=10L0.9K0.1 where L is units of labor, K is units of capital, and P(L,K)P(L,K) is total units that can be produced with this labor/capital combination. Suppose each unit of labor costs $400 and each unit of capital costs $1,200. Further suppose a total of $600,000 is available to be invested in labor and capital (combined). A) How many units of labor and capital should be "purchased" to maximize production subject...

Suppose a Cobb-Douglas Production function is given by the following: P(L, K) = (50L^(0.5))(K^(0.5)) where L...

Suppose a Cobb-Douglas Production function is given by the following: P(L, K) = (50L^(0.5))(K^(0.5)) where L is units of labor, K is units of capital, and P(L, K) is total units that can be produced with this labor/capital combination. Suppose each unit of labor costs $300 and each unit of capital costs $1,500. Further suppose a total of $90,000 is available to be invested in labor and capital (combined). A) How many units of labor and capital should be "purchased"...

a firm produces a product with labor and capital as inputs. The production function is described...

a firm produces a product with labor and capital as inputs. The production function is described by Q=LK. the marginal products associated with this production function are MPL=K and MPK=L. let w=1 and r=1 be the prices of labor and capital, respectively a) find the equation for the firms long-run total cost curve curve as a function of quantity Q b) solve the firms short-run cost-minimization problem when capital is fixed at a quantity of 5 units (ie.,K=5). derive the...

In the Cobb-Douglas production function : the marginal product of labor (L) is equal to β1...

In the Cobb-Douglas production function : the marginal product of labor (L) is equal to β1 the average product of labor (L) is equal to β2 if the amount of labor input (L) is increased by 1 percent, the output will increase by β1 percent if the amount of Capital input (K) is increased by 1 percent, the output will increase by β2 percent C and D

Suppose the production of a firm is modeled by P(k, l) = 16k2/3l1/3, where k measures...

Suppose the production of a firm is modeled by P(k, l) = 16k2/3l1/3, where k measures capital (in millions of dollars) and l measures the labor force (in thousands of workers). Suppose that when l = 4 and k = 2, the labor is increasing at the rate of 70 workers per year and capital is decreasing at a rate of $220,000 per year. Determine the rate of change of production. Round your answer to the fourth decimal place.

Consider a purely competitive firm that has two variable inputs L (labor hour) and K (machine)...

Consider a purely competitive firm that has two variable inputs L (labor hour) and K (machine) for production. The price of product is $p. The production function is Q (K, L) = 4L^1/4 K^1/4 . Assume that the hourly wage of workers is fixed at $w and the price per machine is $r. (a) Set up the objective of this firm. (b) State the first-order necessary conditions for profit maximization. (c) Write out the optimal inputs quantities, L and K,...

A firm uses two inputs, capital K and labor L, to produce output Q that can...

A firm uses two inputs, capital K and labor L, to produce output Q that can be sold at a price of $10. The production function is given by Q = F(K, L) = K1/2L1/2 In the short run, capital is fixed at 4 units and the wage rate is $5, 1. What type of production function is F(K, L) = K1/2L1/2 ? 2. Determine the marginal product of labor MPL as a function of labor L. 3. Determine the...

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...