This is the so-called property of diminishing MRTS, which states that progressively reducing the amount of one input while maintaining a constant output level will require progressively large increases of the other input. ![]() On the other hand, when a large amount of labor is already in use, the MRTS is low, indicating that only a small amount of capital can be exchanged for an additional unit of labor if output is to be held constant. It is important to note that for large ratios of k to l, the MRTS is a large positive number, indicating that a large amount of capital can be given up if one more unit of labor becomes available. ![]() This expression indicates that the gain in output from increasing l slightly is exactly balanced by the loss of output from suitably decreasing k (so as to keep output constant at the level q 0). It can also be shown that the MRTS equals the negative of the ratio of marginal productivities, that is. The marginal rate of technical substitution ( MRTS ) shows the rate at which labor can be substituted for capital while holding output constant at the level q 0, that is. įactor elasticity ( ∊ ) is the percentage change in output in response to an infinitesimal percentage change in a factor given that all other factors are held fixed, that is, and. This means that successive additions of one factor while keeping the other one constant yields smaller and smaller increases of output, that is, and. It is also usually assumed that the production process exhibits diminishing marginal productivity. It is assumed that both marginal products are positive, that is, and (a negative marginal product means that using more of the input in question results in less output being produced). Algebraically, is the marginal physical product of capital, and is the marginal physical product of labor. The marginal physical product of an input is the additional output that can be produced by employing one more unit of that input while holding all other inputs constant. Whereas the engineering production function captures the maximum level of output that can be achieved if the given inputs are efficiently employed, the economic production function reflects the “best-practice ” use of the available input and output combinations. Thus, economists use production functions in conjunction with marginal productivity theory (see below) to provide explanations of factor prices and the levels of factor utilization. However, the key question from an economic point of view is how the levels of output and inputs are chosen by profit-maximizing firms. Actual observed data are the results of economic decisions in which the production function is but one constraint. As such, it allows for no testing of economic hypotheses. It is important to stress that, as noted above, equation (1) is essentially an engineering relationship. Therefore, a production function can be understood as a constraint on the activities of producers that is imposed by the existing technology. Equation (1) is assumed to provide, for any conceivable set of inputs, the engineer ’s solution to the problem of how to best (most efficiently) combine different quantities of those inputs to get the output. ![]() To simplify, we will use this production function in the remainder of the entry. Often, production functions appear in textbooks written with two inputs as q = f(k,l), where k denotes the amount of capital and l denotes the amount of labor. ![]() Where q represents the flow of output produced and x 1, …, x n are the flows of inputs, each measured in physical quantities -for example, the number of bushels of corn produced and the number of tractors and workers utilized. A production function is a mathematical description of the various technical production possibilities faced by a firm. The central concept in this model is the production function. To represent this process, economists use an abstract model of production. The principal activity of a firm is to produce a good or provide a service, that is, to turn inputs into output.
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