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)=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...

2. Assume that a manufacturer faces a Cobb-Douglas production function, q=40K^0.5L^0.5 where q is output per...

2. Assume that a manufacturer faces a Cobb-Douglas production function, q=40K^0.5L^0.5 where q is output per period, L is labor, K is capital. The market price of labor (w) is $50 per unit and the price of capital (r) is $200 per unit. a. Specify and illustrate graphically the short-run MPl and APl for L = 5 to 30 units (assume that the level of capital is 25; use increments of 5 units of labor). Is this firm operating in...

1. Consider the Cobb-Douglas production function Q = 6 L^½ K^½ and cost function C =...

1. Consider the Cobb-Douglas production function Q = 6 L^½ K^½ and cost function C = 3L + 12K. (For some reason variable "w" is not provided) a. Optimize labor usage in the short run if the firm has 9 units of capital and the product price is $3. b. Show how you can calculate the short run average total cost for this level of labor usage? c. Determine “MP per dollar” for each input and explain what the comparative...

Given the Cobb-Douglas production function q = 2K 1 4 L 3 4 , the marginal...

Given the Cobb-Douglas production function q = 2K 1 4 L 3 4 , the marginal product of labor is: 3 2K 1 4 L 1 4 and the marginal product of capital is: 1 2K 3 4 L 3 4 . A) What is the marginal rate of technical substitution (RTS)? B) If the rental rate of capital (v) is $10 and the wage rate (w) is $30 what is the necessary condition for cost-minimization? (Your answer should be...

1.   In previous problem, the given Cobb-Douglas production function was Q = 6 L½ K½ and...

1.   In previous problem, the given Cobb-Douglas production function was Q = 6 L½ K½ and the cost function was given as:      C = 3L + 12K. For $384 of total cost, the optimum labor usage was determined to be 64, and capital of 16. a.    If the cost function now changes to C = 3L + 18K, it implies that the total cost will become $480. Compute the new level of total cost for Q = 192. Can...

3. The White Noise Corporation has estimated the following Cobb-Douglas production function using monthly observations for...

3. The White Noise Corporation has estimated the following Cobb-Douglas production function using monthly observations for the past two years: ln Q = 2.485 + 0.50 ln K + 0.50 ln L + 0.20 ln N where Q is the number of units of output, K is the number of units of capital, L is the number of unit of labor, and N is the number of units of raw materials. With respect to the above results, answer the following...

for a firm with Cobb-Douglas production function q = f (k, L) = k ^ (1/2)...

for a firm with Cobb-Douglas production function q = f (k, L) = k ^ (1/2) L ^ (1/2) calculate the total, average and marginal cost.

(a) Show that the following Cobb-Douglas production function, f(K,L) = KαL1−α, has constant returns to scale....

(a) Show that the following Cobb-Douglas production function, f(K,L) = KαL1−α, has constant returns to scale. (b) Derive the marginal products of labor and capital. Show that you the MPL is decreasing on L and that the MPK is decreasing in K.

a) Show that the following Cobb-Douglas production function, f(K,L) = KαL1−α, has constant returns to scale....

a) Show that the following Cobb-Douglas production function, f(K,L) = KαL1−α, has constant returns to scale. (b) Derive the marginal products of labor and capital. Show that you the MPL is decreasing on L and that the MPK is decreasing in K.

1. Using the Cobb-Douglas production function: Yt = AtKt1/3Lt2/3 If K = 27, L = 8...

1. Using the Cobb-Douglas production function: Yt = AtKt1/3Lt2/3 If K = 27, L = 8 A = 2, and α = 1/3, what is the value of Y? (For K and L, round to the nearest whole number) ______ 2. If Y = 300, L = 10, and α = 1/3, what is the marginal product of labor? ______ 3. Using the values for Y and α above, if K = 900, what is the marginal product of capital?...