According to the table of data, when do diminishing returns in the production of pizzas begin?

• Explain the concept of a production function
• Differentiate between fixed and variable inputs
• Differentiate between total and marginal product
• Describe diminishing marginal productivity

We can summarize the ideas so far in terms of a production function, a mathematical expression or equation that explains the relationship between a firm's inputs and its outputs:

$Q=f\left[NR\text{,}L\text{,}K\text{,}t\text{,}E\right]$

A production is purely an engineering concept. If you plug in the amount of labor, capital and other inputs the firm is using, the production function tells how much output will be produced by those inputs. Production functions are specific to the product. Different products have different production functions. The amount of labor a farmer uses to produce a bushel of corn is likely different than that required to produce an automobile. Firms in the same industry may have somewhat different production functions, since each firm may produce a little differently. One pizza restaurant may make its own dough and sauce, while another may buy those pre-made. A sit-down pizza restaurant probably uses more labor (to handle table service) than a purely take-out restaurant. We can describe inputs as either fixed or variable.

Fixed inputs are those that can’t easily be increased or decreased in a short period of time. In the pizza example, the building is a fixed input. Once the entrepreneur signs the lease, he or she is stuck in the building until the lease expires. Fixed inputs define the firm’s maximum output capacity. This is analogous to the potential real GDP shown by society’s production possibilities curve, i.e. the maximum quantities of outputs a society can produce at a given time with its available resources. Fixed inputs do not change as output changes.

Variable inputs are those that can easily be increased or decreased in a short period of time. The pizzaiolo can order more ingredients with a phone call, so ingredients would be variable inputs. The owner could hire a new person to work the counter pretty quickly as well. Variable inputs increase or decrease as output changes.

Economists often use a short-hand form for the production function:

$Q=f\left[L\text{,}K\right]$

Economists also differentiate between short and long run production. The short run is the period of time during which at least some factors of production are fixed. During the period of the pizza restaurant lease, the pizza restaurant is operating in the short run, because it is limited to using the current building—the owner can’t choose a larger or smaller building. The long run is the period of time during which all factors are variable. Once the lease expires for the pizza restaurant, the shop owner can move to a larger or smaller place.

Since by definition capital is fixed in the short run, our production function becomes

Q=f[L,K−]or Q=f[L]Q=f\left[L\text{,}\stackrel{-}{K}\right]\text{or }Q=f\left[L\right]Q=f[L,K−​]or Q=f[L]

This equation simply indicates that since capital is fixed, then changing the amount of output (e.g. trees cut down per day) depends only on changing the amount of labor employed (e.g. number of lumberjacks working). We can express this production function numerically as Table 1 below shows. You can also see it graphically in Figure 2a.

Note that we have introduced some new language. We also call Output (Q) Total Product (TP), which means the amount of output produced with a given amount of labor and a fixed amount of capital. In this example, one lumberjack using a two-person saw can cut down four trees in an hour. Two lumberjacks using a two-person saw can cut down ten trees in an hour.

We should also introduce a critical concept: marginal product. Marginal product is the additional output of one more worker. Mathematically, Marginal Product is the change in total product divided by the change in labor: 

$MP=\Delta TP/\Delta L$

We can show these concepts graphically, as you can see in Figure 2 above. Figure 3 shows the more general cases of total product and marginal product curves.

Watch this video to review all of the production function and to see an example of the law of diminishing marginal product. Dr. McGlasson wants to hire students for her company to make "I love economics" signs, but she must consider how much output she can gain with each additional employee.

These questions allow you to get as much practice as you need, as you can click the link at the top of the first question (“Try another version of these questions”) to get a new set of questions. Practice until you feel comfortable doing the questions.

factors of production (or inputs): resources that firms use to produce their products, for example, labor and capitalfirm: an organization that combines inputs of labor, capital, land, and raw or finished component materials to produce outputs.fixed inputs: factors of production that can’t be easily increased or decreased in a short period of timelong run: period of time during which all of the firm’s inputs are variableproduction: the process of combining inputs to produce outputs, ideally of a value greater than the value of the inputsproduction function: mathematical equation that tells how much output a firm can produce with given amounts of inputsshort run: period of time during which at least one or more of the firm’s inputs is fixedvariable inputs: factors of production that a firm can easily increase or decrease in a short period of time

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