Calculate Marginal Product of Labor and Capital in a Production Function

What is the production function given for labor and capital?

The company has the following production function: f(x, y) = 24x^0.3 y^0.7, where x is the number of units of labor and y is the number of units of capital. How can we find the marginal product of labor and capital in this production function?

The Marginal Product of Labor and Capital

The marginal product of labor and capital in the given production function f(x, y) = 24x^0.3 y^0.7, is found by taking the partial derivatives with respect to x and y respectively. The resultant equations, 7.2x^-0.7 y^0.7 for labor and 16.8x^0.3 y^-0.3 for capital, represent how much additional output will be produced by an additional unit of labor or capital.

In Economics, the concept of marginal product is crucial in determining the optimal use of inputs in production processes. In the production function f(x, y) = 24x^0.3 y^0.7, x represents labor and y represents capital. By calculating the marginal product of labor and capital, we can understand the additional output that can be achieved by adding one more unit of either input.

Mathematically, we find the marginal product by taking the partial derivative of the production function with respect to labor and capital. For labor, the equation becomes 7.2x^-0.7 y^0.7, and for capital, it is 16.8x^0.3 y^-0.3. These values indicate the impact of each additional unit of labor or capital on the total output.

Understanding the marginal product helps businesses make informed decisions on how to allocate resources effectively. By knowing the marginal product of labor and capital, companies can optimize their production processes to maximize profitability.