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Perfectly Competitive Supply: The Cost Side of The Market Introductory Microeconomics 1 Example 6.1. How should Leroy divide his time between… …picking apples… …and writing pulp fiction? Note: Pulp magazines (or pulp fiction; often referred to as “the pulps”) were inexpensive fiction magazines. They were widely published from the 1920s through the 1950s. The term pulp fiction can also refer to mass market paperbacks since the 1950s. (from Wikipedia) 2 Example 6.1. How should Leroy divide his time between… A men's magazine will pay Leroy 10 cents per word to write fiction articles. He must decide how to divide his time between writing fiction, which he can do at a constant rate of 200 words per hour, and harvesting apples from the trees growing on his land, a task only he can perform. His return from harvesting apples depends on both the price of apples and the quantity of apples he harvests. For each hour Leroy spends picking apples, he loses the $20 he could have earned writing pulp fiction. He should thus spend an additional hour picking as long as he will add at least $20 worth of apples to his total harvest. 3 Example 6.1. How should Leroy divide his time between… Earnings aside, Leroy is indifferent between the two tasks. The amount of apples he can harvest depends on the number of hours he devotes to this activity: Hours Total bushels Additional bushels 1 8 8 2 12 4 3 15 3 4 17 2 5 18 1 4 Example 6.1. How should Leroy divide his time between… For example, if apples sell for $2.50 per bushel: Hours Total bushels Additional bushels $ for the additional hour 1 8 8 20 = 8x2.5 2 12 4 10 = 4x2.5 3 15 3 7.5 = 3x2.5 4 17 2 5 = 2x2.5 5 18 1 2.5 = 1x2.5 Leroy would earn $20 for the first hour he spent picking apples, but would earn only an additional $10 if he spent a second hour. Leroy will devote only the first hour to picking apples. That is, a total of 8 apples. 5 Example 6.1. How should Leroy divide his time between… If the price of apples then rose to $5 per bushel: Hours Total bushels Additional bushels $ for the additional hour 1 8 8 40 = 8x5 2 12 4 20 = 4x5 3 15 3 15 = 3x5 4 17 2 10 = 2x5 5 18 1 5 = 1x5 It would pay Leroy to devote a second hour to picking, which would mean a total of 12 bushels of apples. 6 Example 6.1. How should Leroy divide his time between… Once the price of apples reached $6.67 per bushel Hours Total bushels Additional bushels $ for the additional hour 1 8 8 53.36 = 8x6.67 2 12 4 26.68 = 4x6.67 3 15 3 20.00 = 3x6.67 4 17 2 13.34 = 2x6.67 5 18 1 6.67 = 1x6.67 Leroy would devote a third hour to picking apples, for a total of 15 bushels. 7 Example 6.1. How should Leroy divide his time between… If the price rose to $10 per bushel Hours Total bushels Additional bushels $ for the additional hour 1 8 8 80 = 8x10 2 12 4 40 = 4x10 3 15 3 30 = 3x10 4 17 2 20 = 2x10 5 18 1 10 = 1x10 Leroy would devote a fourth hour to picking apples, for a total of 17 bushels. 8 Example 6.1. How should Leroy divide his time between… If the price rose to $20 per bushel Hours Total bushels Additional bushels $ for the additional hour 1 8 8 160 = 8x20 2 12 4 80 = 4x20 3 15 3 60 = 3x20 4 17 2 40 = 2x20 5 18 1 20 = 1x20 Leroy would devote a fifth hour to picking apples, for a total of 18 bushels. 9 Example 6.1. How should Leroy divide his time between… Leroy's individual supply curve for apples relates the amount of apples he is willing to supply at various prices. P ($/bu) Leroy's supply curve for apples 20.00 10.00 6.67 5.00 2.50 8 12 15 18 17 Q (bu/day) 10 Example 6.1. How should Leroy divide his time between… Marginal cost can be computed: Hours Total bushels Additional bushels Marginal cost (of an additional bushel) 1 8 8 $2.5=$20/8 2 12 4 5=20/4 3 15 3 6.67=20/3 4 17 2 10=20/2 5 18 1 20=20/1 The perfectly competitive firm’s supply curve is its marginal cost curve. 11 Market Supply The quantity that corresponds to any given price on the market supply curve is the sum of the quantities supplied at that price by all individual sellers in the market. 12 Example 6.2. If the supply side of the apple market consisted of 100 suppliers just like Leroy, what would the market supply curve for apples look like? P ($/bu) Market supply curve for apples 20.00 10.00 6.67 5.00 2.50 8 12 15 18 17 Q (100s of bu/day) 13 Reasons for upward sloping supply 1. The Fruit Picker's Rule (Always pick the low-hanging fruit first). When fruit prices are low, it might pay to harvest the lowhanging fruit but not the fruit growing higher up the tree, which takes more effort to get to. But if fruit prices rise sufficiently, it will pay to harvest not only the low-hanging fruit, but also the fruit on higher branches. 2. Differences among suppliers in opportunity cost People facing unattractive employment opportunities in other occupations may be willing to pick apples even when the price of apples is low. Those with more attractive options will pick apples only if the price of apples is relatively high. 14 Supply and opportunity cost At what price would Andy Lau consider it worth his while to pick apples? 15 Profit-Maximizing Firms and Perfectly Competitive Markets Definition. The profit earned by a firm is the total revenue it receives from the sale of its product minus all costs—explicit and implicit—incurred in producing it. Definition. A profit-maximizing firm is one whose primary goal is to maximize the difference between its total revenues and total costs. Definition. A perfectly competitive market is one in which no individual supplier has significant influence on the market price of the product. 16 Profit-Maximizing Firms and Perfectly Competitive Markets Definition. A price taker is a firm that has no influence over the price at which it sells its product. Laundry Art reproduction 17 Price setters Microsoft operating systems Intel microprocessors 18 Price setter vs. price taker Generic USB MP3 player: price taker Apple iPod: Price setter 19 Factor of production Definition. A factor of production is an input used in the production of a good or service. 20 Fixed factor of production Definition. A fixed factor of production is an input whose quantity cannot be altered in the short run. Example: Transmission tower for a student radio station. 21 Variable factor of production Definition. A variable factor of production is an input whose quantity can be altered in the short run. Example: Music library for a student radio station. 22 Example 6.3. Louisville Slugger uses two inputs: labor (e.g., woodworkers)… and capital (e.g., lathes, tools, buildings) A lathe is a tool which spins a block of material to perform various operations such as cutting, sanding, knurling, or deformation with tools that are applied to the workpiece to create an object which has symmetry about an axis of rotation. … to transform raw materials (e.g., lumber) …into finished output (baseball bats). 23 The short-run production function Total number of Total number employees per day of bats per day 0 0 1 40 2 100 3 130 4 150 5 165 6 175 7 181 Note that output gains begin to diminish with the third employee. Economists refer to this pattern as the law of diminishing returns, and it always refers to situations in which at least some factors of production are fixed. 24 Some Important Cost Concepts Suppose the lease payment for the Louisville Slugger’s lathe and factory is $80 per day. This payment is both a fixed cost (since it does not depend on the number of bats per day the firm makes) and, for the duration of the lease, a sunk cost. FC = rK 25 Some Important Cost Concepts The company’s payment to its employees is called variable cost, because unlike fixed cost, it varies with the number of bats the company produces. VC = wL 26 Some Important Cost Concepts The firm’s total cost is the sum of its fixed and variable costs: Total cost = Fixed Cost + Variable Cost TC = FC + VC TC = rK + wL 27 Some Important Cost Concepts The firm’s marginal cost is the change in total cost divided by the corresponding change in output. MC = DTC/DQ MC = DVC/DQ 28 Example 6.4. If Louisville slugger pays a fixed cost of $80 per day, and to each employee a wage of $24/day, calculate the company’s output, variable cost, total cost and marginal cost for each level of employment. 29 Example 6.4. Employees per day Bats per day Fixed Cost Variable ($ per day) Cost ($/day) Total Cost ($/day) Marginal Cost ($/bat) 0 0 80 0 80 1 40 80 24 104 0.6 2 100 80 48 128 0.4 3 130 80 72 152 0.8 4 150 80 96 176 1.2 5 165 80 120 200 1.6 6 175 80 144 224 2.4 7 181 80 168 248 4.0 30 Choosing Output to Maximize Profit If a company’s goal is to maximize its profit, it should continue to expand its output as long as the marginal benefit from expanding is at least as great as the marginal cost. 31 Example 6.5. Suppose the wholesale price of each bat (net of lumber and other materials costs) is $2.50. How many bats should Louisville Slugger produce? 32 Example 6.5. If we compare this marginal benefit ($2.50 per bat) with the marginal cost entries shown in table, we see that the firm should keep expanding until it reaches 175 bats per day (6 employees per day). Employees per day Bats per day Fixed Cost ($ per day) Variable Cost ($/day) Total Cost ($/day) Marginal Cost ($/bat) 0 0 80 0 80 1 40 80 24 104 0.6 2 100 80 48 128 0.4 3 130 80 72 152 0.8 4 150 80 96 176 1.2 5 165 80 120 200 1.6 6 175 80 144 224 2.4 7 181 80 168 248 4.0 33 Example 6.5. To confirm that the cost-benefit principle thus applied identifies the profit-maximizing number of bottles to produce, we can calculate profit levels directly: Employees per day Output (bats/day) Total revenue ($/day) Total cost ($/day) Profit ($/day) 0 0 0 80 -80 1 40 100 104 -4 2 100 250 128 122 3 130 325 152 173 4 150 375 176 199 5 165 412.50 200 212.50 6 175 437.50 224 213.50 7 181 452.50 248 204.50 34 Choosing Output to Maximize Profit When the law of diminishing returns applies (that is, when some factors of production are fixed), marginal cost goes up as the firm expands production beyond some point. Under these circumstances, the firm's best option is to keep expanding output as long as marginal cost is less than price. The profit maximizing output level for the perfectly competitive firm: P = MC 35 Note on Example 6.5. Note in Example 6.5 that if the company's fixed cost had been any more than $293.50 per day (say, 300), it would have made a loss at every possible level of output. Employees per day Output (bats/day) Total revenue ($/day) Total cost ($/day) Profit ($/day) 0 0 0 300 -300 1 40 100 324 -224 2 100 250 348 -98 3 130 325 372 -47 4 150 375 396 -21 5 165 412.50 420 -7.5 6 175 437.50 444 -6.5 7 181 452.50 468 -15.6 36 Note on Example 6.5. As long as it still had to pay its fixed cost, however, its best bet would have been to continue producing 175 bats per day, because a smaller loss is better than a larger one. If a firm in that situation expected conditions to remain the same, it would want to get out of the bat business as soon as its equipment lease expired. 37 A Note on the Firm’s Shut-Down Condition It might seem that a firm that can sell as much output as it wishes at a constant market price would always do best in the short run by producing and selling the output level for which price equals marginal cost. But there are exceptions to this rule. 38 A Note on the Firm’s Shut-Down Condition Suppose, for example, that the market price of the firm’s product falls so low that its revenue from sales is smaller than its variable cost at all possible levels of output. The firm should then cease production for the time being. By shutting down, it will suffer a loss equal to its fixed costs. But by remaining open, it would suffer an even larger loss. 39 A Note on the Firm’s Shut-Down Condition P = market price of the product Q = number of units produced and sold PxQ = total revenue from sales Shutdown rule: Cease production if PxQ is less than VC for every level of Q. 40 Average Variable Cost and Average Total Cost Suppose that the firm is unable to cover its variable cost at any level of output—that is, suppose that PxQ < VC for all levels of Q. Then P < VC/Q for all levels of Q, since we obtain the second inequality by simply dividing both sides of the first one by Q. The firm’s short-run shut-down condition may thus be restated a second way: Discontinue operations in the short run if the product price is less than the minimum value of its average variable cost (AVC). 41 Short-run shut-down condition (alternate version): P < minimum value of AVC 42 Profitability Average total cost: ATC = TC/Q. Profit = total revenue – total cost = PxQ – ATCxQ = (P – ATC) Q A firm can be profitable only if the price of its product price (P) exceeds its ATC. 43 A Graphical Approach to Profit-Maximization For Louisville Slugger, we have Avg Variable Cost ($/day) Total Cost ($/day) Employe es per day Bats per day Variable Cost ($/day) Avg Total Marginal Cost Cost ($/bat) ($/bat) 0 0 0 0 80 1 40 24 0.6 104 2.6 0.6 2 100 48 0.48 128 1.28 0.4 3 130 72 0.554 152 1.169 0.8 4 150 96 0.64 176 1.173 1.2 5 165 120 0.727 200 1.21 1.6 6 175 144 0.823 224 1.28 2.4 7 181 168 0.927 248 1.37 4.0 44 A Graphical Approach to Profit-Maximization Properties of the cost curves: The upward sloping portion of the marginal cost curve (MC) corresponds to the region of diminishing returns. The marginal cost curve must intersect both the average variable cost curve (AVC) and the average total cost curve (ATC) at their respective minimum points. 45 Price = Marginal Cost: The Maximum-Profit Condition In earlier examples, we implicitly assumed that the firm could employ workers only in whole number amounts. Under these conditions, we saw that the profitmaximizing output level was one for which marginal cost was somewhat less than price (because adding yet another employee would have pushed marginal cost higher than price). But when output and employment can be varied continuously, the maximum-profit condition is that price be equal to marginal cost. 46 Example 6.6. For the bat-maker whose cost curves are shown in the next slide, find the profit-maximizing output level if bats sell for $0.80 each. How much profit will this firm earn? What is the lowest price at which this firm would continue to operate in the short run? 47 Example 6.6. The cost-benefit principle tells us that MC this firm should ATC continue to expand as AVC long as price is at least as great as marginal cost. Price If the firm follows this rule it will produce 130 bats per day, the quantity at which price and marginal cost are equal. $/bat 1.40 1.32 1.20 1.00 0.80 0.60 0.48 0.40 0.28 80 100 130 150 Bats/day 48 Example 6.6. $/bat 1.40 1.32 1.20 1.00 MB 0.80 0.60 0.48 MC 0.40 0.28 Suppose that the firm had sold some amount MC less than 130—say, only ATC 100 bats per day. AVC Its benefit from expanding output by one bat would then be Price the bat's market price, 80 cents. The cost of expanding output by one bat is equal (by definition) to the firm’s marginal cost, Bats/day 80 100 130 which at 100 bats per 150 day is only 40 cents. 49 Example 6.6. $/bat 1.40 1.32 1.20 1.00 MB 0.80 0.60 0.48 MC 0.40 0.28 So by selling the 101st bat for 80 cents and MC producing it for an extra ATC cost of only 40 cents, AVC the firm will increase its profit by 80 – 40 = 40 cents per day. Price In a similar way, we can show that for any quantity less than the level at which price equals marginal cost, the seller can boost Bats/day 80 100 130 profit by expanding 150 production. 50 Example 6.6. $/bat 1.40 MC 1.32 1.20 1.00 MB 0.80 0.60 0.48 0.40 0.28 Conversely, suppose that the firm were currently MC selling more than 130 ATC bats per day—say, 150— AVC at a price of 80 cents each. Marginal cost at an output Price of 150 is 1.32 per bat. If the firm then contracted its output by one bat per day, it would cut its costs by 1.32 cents while losing only 80 cents in revenue. Bats/day 80 100 130 As a result, its profit 150 would grow by 52 cents per day. 51 Example 6.6. The same arguments can be made regarding any quantities that differ from 130. Thus, if the firm were selling fewer than 130 bats per day, it could earn more profit by expanding; and that if it were selling more than 130, it could earn more by contracting. So at a market price of 80 cents per bat, the seller maximizes its profit by selling 130 units per week, the quantity for which price and marginal cost are exactly the same. 52 Example 6.6. Total revenue = PxQ = ($0.80/bat)x(130 bats/day) = $104 per day. Total cost = ATCxQ = $0.48/bat x 130 bats/day = $62.40/day So the firm’s profit is $41.60/day. 53 Example 6.6. Profit is equal to (P – ATC)xQ, which is equal to the area of the shaded rectangle. MC $/bat ATC AVC 0.80 Price Profit = $41.60/day 0.48 130 Bats/day 54 Example: The Holiday Store at Tung Lung Island Why does the store open only on holidays? 55 SUPPLY AND PRODUCER SURPLUS The economic surplus received by a buyer is called consumer surplus. The analogous construct for a seller is producer surplus, the difference between the price a seller actually receives for the product and the lowest price for which she would have been willing to sell it (her reservation price, which in general will be her marginal cost). Producer surplus sometimes refers to the surplus received by a single seller in a transaction, sometimes to the total surplus received by all sellers in a market or collection of markets. 56 Example 6.7. Calculating Producer Surplus How much do sellers benefit from their participation in the market for cashews? Price ($/lb) 12 10 8 6 4 2 0 2 4 6 8 S D Quantity 12 16 20 24 (1000s of lbs/day) 57 Example 6.7. Calculating Producer Surplus For all cashews sold up to 8,000 pounds per day, sellers receive a surplus equal to the difference between the market price of $8 per pound and their reservation price as given by the supply curve. Total producer surplus received by buyers in the cashew market is the area of the shaded triangle between the supply curve and the market price Price ($/lb) 12 10 8 6 4 2 0 2 4 6 8 S PS= (1/2)(8,000 lbs/day)x($8/lb) = $32,000/day D 12 16 20 24 Quantity (1000s of lbs/day) 58 Producer surplus Producer surplus is the highest price sellers would pay, in the aggregate, for the right to continue participating in the cashew market. 59 Supply is all about marginal cost. 60 Does demand ever affect supply? P S D Q 61 Example 6.8. Is the cost of a ticket to the NBA finals so high because the salaries of NBA players (such as YAO Ming) is so high? 62 Example 6.8. Partly. But then why are the wages of NBA players so high? Because so many people are willing to pay so much to be able to watch them. 63 Example 6.8. But a starving person would be willing to pay even more for food than for watching an NBA game. Food is cheap and NBA games are expensive because many people can produce food, but only few have the skills to play in the NBA. 64 Shaquille O’Neal: NBA star extraordinaire. Earnings from basketball-related activities during last championship season: $25,000,000. 65 Does demand ever affect supply? Supply depends on costs and costs always depend on demand. In many (perhaps most) cases the prices of the inputs required to produce a product will not be much affected by the demand for that product. 66 Does demand ever affect supply? The demand for bicycles will have no significant effect on the price of steel, an input for making bicycles, because the steel used in making bicycles is only a tiny fraction of the total amount of steel sold. 67 Does demand ever affect supply? So for most markets, we can assume that a shift in the demand curve will not lead to a shift in the supply curve. Assume this independence, unless otherwise stated. 68 End 69