MicroeconomicsTopic 6: “Be able to explain and calculate averageand marginal cost to make production decisions.”Reference: Gregory Mankiw’s Principles of Microeconomics, 2nd edition, Chapter 13.Long-Run versus Short-RunIn order to understand average cost and marginal cost, it is first necessary to understandthe distinction between the “long run” and the “short run.”Short run: a period of time during which one or more of a firm’s inputs cannot bechanged.Long run: a period of time during which all inputs can be changed.For example, consider the case of Bob’s Bakery. Bob’s uses two inputs to make loavesof bread: labor (bakers) and capital (ovens). (This is obviously a simplification, becausethe bakery uses other inputs such as flour and floor space. But we will pretend there arejust two inputs to make the example easier to understand.) Bakers can be hired or firedon very short notice. But new ovens take 3 months to install. Thus, the short run forBob’s Bakery is any period less than 3 months, while the long run is any period longerthan 3 months.The concepts of long run and short run are closely related to the concepts of fixed inputsand variable inputs.Fixed input: an input whose quantity remains constant during the time period inquestion.Variable input: an input whose quantity can be altered during the time period inquestion.In the case of Bob’s Bakery, ovens are a fixed input during any period less than 3months, whereas labor is a variable input.Fixed Cost, Variable Cost, and Total CostIn the short run, a firm will have both fixed inputs and variable inputs. These correspondto two types of cost: fixed cost and variable cost.Fixed cost (FC): the cost of all fixed inputs in a production process. Another wayof saying this: production costs that do not change with the quantity of outputproduced.Variable cost (VC): the cost of all variable inputs in a production process.Another way of saying this: production costs that change with the quantity ofoutput produced.In the case of Bob’s Bakery, the cost of renting ovens is a fixed cost in the short run,while the cost of hiring labor is a variable cost.Since fixed inputs cannot be changed in the short run, fixed cost cannot be changedeither. That means fixed cost is constant, no matter what quantity the firm chooses toproduce in the short run.Variable cost, on the other hand, does depend on the quantity the firm produces. Variablecost rises when quantity rises, and it falls when quantity falls.When you add fixed and variable costs together, you get total cost.Total cost (TC): the total cost of producing a given amount of output.TC = FC + VCNote: the total cost curve has the same shape as the variable cost curve because total costsrise as output increases.In the case of Bob’s Bakery, suppose the firm’s rental payments on ovens add up to $40 aday; then FC = 40. And suppose that if the firm produces 100 loaves in a day, its laborcost (wages for bakers) is $500; then VC = 500. The firm’s total cost is TC = 40 + 500 =540. Suppose that when the firm produces 150 loaves a day, its labor cost rises to $700;then the new VC = 700 and the new TC = 40 + 700 = 740. This information issummarized in the table below.Bob’s Bakery’s Total, Fixed, and Variable CostsQuantity(per day)Total Cost Fixed Cost Variable Cost100 540 40 500150 740 40 700Average Cost or Average Total CostAverage cost (AC), also known as average total cost (ATC), is the average cost per unitof output. To find it, divide the total cost (TC) by the quantity the firm is producing (Q).Average cost (AC) or average total cost (ATC): the per-unit cost of output.ATC = TC/QSince we already know that TC has two components, fixed cost and variable cost, thatmeans ATC has two components as well: average fixed cost (AFC) and average variablecost (AVC). The AFC is the fixed cost per unit of output, and AVC is the variable costper unit of output.ATC = AFC + AVCAFC = FC/QAVC = VC/QIn the case of Bob’s Bakery, we said earlier that the firm can produce 100 loaves with FC= 40, VC = 500, and TC = 540. Therefore, ATC = TC/Q = 540/100 = 5.4. Also, AFC =40/100 = 0.4 and AVC = 500/100 = 5. Notice that we can use AFC and AVC to findATC a different way: ATC = AFC + AVC = 0.4 + 5 = 5.4, which is the same answer wegot before.If Bob’s Bakery produced 150 loaves instead of 100, the calculations would be the same,except we’d use Q = 150, VC = 700, and TC = 740 instead. FC would still be 40. Thisinformation is summarized in the table below.Bob’s Bakery’s Total and Average CostsQuantity(per day)TC FC VC ATC AFC AVC100 540 40 500 5.40 0.40 5.00150 740 40 700 4.93 0.27 4.67It’s easy to find ATC using TC and Q, like we just did. But you should also be able tofind Q using TC and ATC, or find TC using Q and ATC. Since we know that ATC =TC/Q, we also know that TC = ATC × Q and Q = TC/ATC.For example, suppose you know that Bob’s Bakery has TC = 740 and ATC = 4.93. SinceATC = TC/Q, the following equation must hold:4.93 = 740/QIf you solve the equation, you’ll find that Q = 150 (approximately).Marginal CostOften, we are interested in knowing what happens to a firm’s costs if output is increasedby just a small amount. This is not the same as the average cost, because the next unit ofoutput the firm produces might be more or less costly to produce than previous units.Marginal cost (MC): the additional cost that results from increasing output by one unit.Another way of saying this: the additional cost per additional unit of output.We use the symbol ∆ (the Greek letter delta) to designate the change in a variable. Forinstance, if total cost (TC) rose from 75 to 100, we would say ∆TC = 100 - 75 = 25.Using this symbol, we can write the mathematical formula for marginal cost:MC = ∆TC/∆QNotice that we divide by the change in quantity (∆Q). Often, we set ∆Q = 1, becausemarginal cost is defined as the additional cost from one more unit of output. Butsometimes we don’t know how much the added cost from just one more unit is, so wecalculate marginal cost for a larger change in quantity.In the case of Bob’s Bakery, we said that TC = 540 when Q = 100, and TC = 740 when Q= 150. So ∆TC = 740 - 540 = 200, ∆Q = 150 - 100 = 50, and therefore MC = 200/50 = 4.We say that the marginal cost is 4 for units between 100 and 150. This is assuming wedon’t have information about how much it would cost to increase output by just one, from100 to 101