Production The production function for a company is given by f(x, y) = 100x0.6y0.4 where x...

The production function for a company is given by f(x, y) = 100x0.6y0.4 where x is...

The production function for a company is given by f(x, y) = 100x0.6y0.4 where x is the number of units of labor (at $48 per unit) and y is the number of units of capital (at $36 per unit). The total cost for labor and capital cannot exceed $100,000. (a) Find the maximum production level for this manufacturer. (Round your answer to the nearest integer.) (b) Find the marginal productivity of money. (Round your answer to three decimal places.) (c)...

Consider the Cobb-Douglas production function, f ( x , y ) = 50 x 4 5...

Consider the Cobb-Douglas production function, f ( x , y ) = 50 x 4 5 y 1 5 , where f ( x , y )represents the number of units of a product produced using x units of labor and y units of capital. A. Compute the marginal productivities of labor and capital when 32 unit of labor and 1 units of capital are used. B. Use the marginal productivities to approximate the change in the number of units...

I am not sure how to solve it. The production of a manufacturer is given by...

I am not sure how to solve it. The production of a manufacturer is given by the Cobb-Douglas production function f(x,y)=30x^(3/5)y^(2/5) where x represents the number of units of labor (in hours) and y represents the number of units of capital (in dollars) invested. Labor costs $15 per hour and there are 88 hours in a working day, and 250 working days in a year. The manufacturer has allocated $4,500,000 this year for labor and capital. How should the money...

The Cobb-Douglas production function for an automobile manufacturer is f(x, y) = 100x0.6y0.4, where x is...

The Cobb-Douglas production function for an automobile manufacturer is f(x, y) = 100x0.6y0.4, where x is the number of units of labor and y is the number of units of capital. Estimate the average production level if the number of units of labor x varies between 300 and 350 and the number of units of capital y varies between 375 and 400. (Round your answer to two decimal places.)

1. A. The Cobb-Douglas production function, f(x,y)=40x^1/4y^3/4, describes the production of a company for which each...

1. A. The Cobb-Douglas production function, f(x,y)=40x^1/4y^3/4, describes the production of a company for which each unit of labor costs $100 and each unit of capital costs $125. For a new project, the company has allocated $60,000 for labor and capital. Find the amount of money that the company should allocate to labor and capital to maximize production. B. The marketing department of a business has determined that the demand for a product can be modeled by p=(50/(square root of...

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 has a production function Y = (K0.3)*(N0.7). Given this production function, the marginal product...

A firm has a production function Y = (K0.3)*(N0.7). Given this production function, the marginal product of labor is given by MPN =0.7*(K0.3)*(N-0.3). Suppose that the firm uses 1 unit of capital for production, that is, K = 1. Additionally, suppose that the market wage is w = 0.35. Questions: a) Calculate the optimal number of workers the firm will hire. Round your answer to the closest integer. b) Suppose that the government subsidizes employment by 0.05 per worker (s...

1. Suppose the equation p(x,y)=-2x^2+80x-3y^2+90+100 models profit when x represents the number of handmade chairs and...

1. Suppose the equation p(x,y)=-2x^2+80x-3y^2+90+100 models profit when x represents the number of handmade chairs and y is the number of handmade rockers produced per week. (1) How many chairs and how many rockers will give the maximum profit when there is not constraint? (2) Due to an insufficient labor force they can only make a total of 20 chairs and rockers per week (x + y = 20). So how many chairs and how many rockers will give the...

find the minimum cost of producing 50,000 units of a product, where X is the number...

find the minimum cost of producing 50,000 units of a product, where X is the number of units labor ( at 84$ per unit) and y is the number of units of capital ( at 72$ per unit) P(x) = 100(x^0.6)(y^0.4)