Suppose the production of paved roadways can be represented as q = L0.5 + K0.5. Which...

3. Consider the production function, Q = [L0.5 + K0.5] 2 . The marginal products are...

3. Consider the production function, Q = [L0.5 + K0.5] 2 . The marginal products are given as follows: MPL = [L0.5 + K0.5] L-0.5 and MPK = [L0.5 + K0.5] K-0.5 and w = 2, r = 1. A). what is the value of lambda B). Does this production function exhibit increasing, decreasing or constant returns to scale? C).Determine the cost minimizing value of L D).Determine the cost minimizing value of K E).Determine the total cost function F).Determine the...

A firm has production function q=10*(L0.5)*(K0.5). In the short term, capital K is fixed at 9....

A firm has production function q=10*(L0.5)*(K0.5). In the short term, capital K is fixed at 9. (a) What is the multiplicative constant term in the firm's short-run inverse demand for labor? (b) What is the multiplicative constant term in the firm's short-run direct demand for labor? (c) What is the multiplicative constant term in the firm's long-run inverse demand for labor?

14. A firm’s production function is Q = 12*L0.5*K0.5. Input prices are $36 per labor unit...

14. A firm’s production function is Q = 12*L0.5*K0.5. Input prices are $36 per labor unit and $16 per capital unit. The product’s price is P = $10. (Given: MP(L) = 6*L-0.5*K0.5; and MP(K) = 6*L0.5*K-0.5) In the short run, the firm has a fixed amount of capital, K = 9. Calculate the firm’s profit-maximizing employment of labor. (Note: short term profit maximization condition: MPR(L) = MC(L) ) In the long run, suppose the firm could adjust both labor and...

1. A firm production function is given by q(l,k) = l0.5·k0.5, where q is number of...

1. 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. This firm profit function is π = p·q(l,k) – w·l – v·k, where p is the price of output, w the wage rate of labor and v the rental rate of capital. In the short-run, k = 100. This firm hires...

Suppose that production of a firm's output is described by the following production function Q =...

Suppose that production of a firm's output is described by the following production function Q = K0.25 L0.5 In the short run, the firm's capital is fixed at 10,000. Suppose further that the market price of the output is $37, and that the market wage is $25. What is the Marginal Revenue Product of Labor (MRPL) for the 147th worker? Enter your answer rounded to the nearest two decimals.

Suppose that production of a firm's output is described by the following production function Q =...

Suppose that production of a firm's output is described by the following production function Q = K0.25 L0.5 In the short run, the firm's capital is fixed at 10,000. Suppose further that the market price of the output is $70, and that the market wage is $25. What is the Marginal Revenue Product of Labor (MRPL) for the 129th worker? Enter your answer rounded to the nearest two decimals.

The production function for a firm is given by q = L0.75 K0.3 where q denotes...

The production function for a firm is given by q = L0.75 K0.3 where q denotes output; L and K labor and capital inputs . (a) Determine marginal product of labor. Show whether or not the above production function exhibits diminishing marginal productivity of labor. (b) Calculate the output (or production) elasticity with respect to labor. c) Determine the nature of the Return to Scale as exhibited by the above production function. Show and explain all calculations

Suppose that a firm has the following production function:                    Q = 12KL + .7KL2 –...

Suppose that a firm has the following production function:                    Q = 12KL + .7KL2 – 1/30 KL3                    Assume the firm is operating in the long run show the expression for 100 units of output Now the firm is operating in the short run and capital (K) is fixed at K = 5, to determine the following: a. The maximum output the firm can produce when K = 5. b. The level of use of input L where APL...

A firm’s production function is ? = ?Lα ?β where A, α, and β are positive...

A firm’s production function is ? = ?Lα ?β where A, α, and β are positive constants. The firm currently uses 500 units of labor and 40 units of capital. If the firm adds 1 more unit of labor, what happens to productivity of capital? Explain. b. Given a production function Q = f(L, K), if marginal product of labor and marginal product of capital are both positive, then this function displays diminishing MRTS. Explain if this statement is true...

Suppose country A has the following Cobb-Douglas production function q = AKαE 1−α . Suppose country...

Suppose country A has the following Cobb-Douglas production function q = AKαE 1−α . Suppose country A receives large foreign direct investments in capital (FDI) (a) How does an increase in FDI affect labor productivity in country A? How would wages respond in the short-run? (b) In the long run, what are the implications of FDI on potential future immigration out of country A?