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UNIT 7:. Firm Costs, Revenues, and Profits. Key Topics. Cost concepts Cash and Non Cash Variable and Fixed Total: TFC, TVC, TC Average: AFC, AVC, ATC, AVC & AP Marginal: MC, MC & MP Revenue concepts Total Marginal Profit concepts Profit maximizing output Firm & market supply.
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UNIT 7: Firm Costs, Revenues, and Profits
Key Topics • Cost concepts • Cash and Non Cash • Variable and Fixed • Total: TFC, TVC, TC • Average: AFC, AVC, ATC, AVC & AP • Marginal: MC, MC & MP • Revenue concepts • Total • Marginal • Profit concepts • Profit maximizing output • Firm & market supply
Key Topics - continued 4. SR production • Profits in P, ATC graph • Shut down condition (loss min.) • Firm & industry supply curves 5. LR production • Isocost lines & LR cost min. (Ch. 6 Appendix) • Returns to scale and LRAC • Equilibrium
Profit Overview (recall) • Profit = TR – TC • TR depends on P of output, Q of output • TC depends on P of inputs, Q of inputs, productivity of inputs, production technology used
Recent Examples of Firm ‘Cost’ Concerns • GM • Spent $5 billion to costs of producing Saturn cars • Labor costs per car for GM were 2x Toyota’s • United, Delta, & other airlines - Southwest’s costs often 50% less • Sears, K-Mart, Target - Trying to compete with Walmart on basis of costs • Georgia Pacific • Started using ‘thinner’ saws • Less saw dust • 800 more rail cars of lumber per year
Cost Concepts • Cash and Non Cash • Fixed and Variable • Total, Average, and Marginal
Total Fixed vs. Total Variable Costs TFC = total fixed costs = costs that have to be paid even if output = 0 = costs that do NOT vary with changes in output = ‘overhead’ and ‘sunk’ costs TVC = total variable costs = costs that DO vary with changes in output = 0 if output = 0 TC = total costs = TFC + TVC
Average Costs AFC = fixed costs per unit of output = TFC/q AVC = variable costs per unit of output = TVC/q ATC = total costs per unit of output = TC/q = AFC + AVC
Marginal Cost MC = additional cost per unit ofadditional output = = slope of TC and slope of TVC curves
MC, AVC, and ATC Relationships If MC > AVC AVC is increasing If MC < AVC AVC is declining If MC > ATC ATC is increasing If MC < ATC ATC is declining
Product and Cost Relationships Assume variable input = labor • MP = ΔQ/ΔL AP = • TVC = W ∙ L • MC = note: MC Δ is opposite of MP Δ • AVC = note: AVC Δ is opposite of AP Δ
A ‘Janitor’ Production Example Assume the only variable input a janitorial service firm uses to clean offices is workers who are paid a wage, w, of $8 an hour. Each worker can clean four offices in an hour. Use math to determine the variable cost, the average variable cost, and the marginal cost of cleaning one more office.
Assume: q = TP = 4L w = $8 NOTE: AVC = TVC/q = w/AP MC = ΔTVC/Δq = w/MP
Another Cost of Production Example Assume a production process has the following costs: TFC = 120 TVC = .1q2 MC = .2q
Complete the following table: Can you graph the cost functions (q on horizontal axis)?
Total Costs of Production TFC = AFC x q = (fixed cost per unit of output) (units of output) TVC = AVC x q = (variable cost per unit of output) (units of output) TC = ATC x q = (total cost per unit of output) (units of output)
TFC in AFC graph AFC = TFC/q TFC = AFC x q $ AFC1 TFC AFC q q1
TVC in AVC graph AVC = TVC/q TVC = AVC x q $ AVC AVC1 TVC q q1
TC in ATC graph ATC = TC/q TC = ATC x q $ ATC ATC1 TC q q1
Revenue Concepts TR = total revenue = gross income = total $ sales = PxQ = (price of output) (units of output) = AR x Q = (revenue per unit of output) (units of output) AR = average revenue = revenue per unit of output = TR/Q MR = marginal revenue = additional revenue per unit of additional output = ΔTR/ΔQ
General Types of Firms (based on the D for their product) • Perfectly Competitive D curve for their product is flat P is constant ( can sell any Q at given P determined by S&D) AR = MR = P (all constant) TR = P x Q ( linear, upward sloping given P is constant) • Imperfectly Competitive D curve for their product is downward sloping P depends on Q sold ( must lower P to sell more Q) AR = P (= firm D curve) TR = PxQ (nonlinear, inverted U shape given P is not constant) MR = slope of TR (decreases with ↑Q, also goes from >0 to <0)
General Graphs of Revenue Concepts Perfectly Competitive Firm Imperfectly Competitive Firm $ $ PR=AR=MR P=AR MR Q Q $ $ TR TR Q Q
TR in P graph (competitive firm) TR = P x q $ P P TR q q1
Revenue-Cost Concepts Profit = TR – TC Operating profit = TR - TVC
Comparing Costs and Revenues to Maximize Profit • The profit-maximizing level of output for all firms is the output level where MR = MC. • In perfect competition, MR = P, therefore, the firm will produce up to the point where the price of its output is just equal to short-run marginal cost. • The key idea here is that firms will produce as long as marginal revenue exceeds marginal cost.
General Graph of Perfectly Competitive Firm Profit Max $ MC MR Q $ TR TC Q
Perfectly Competitive Firm Profit Max (Example) P = MR = 10 MC = .2Q TR = 10Q TC = 120 + .1Q2 Π Max Q MR = MC 10 = .2Q Q = 50 Max π = TR-TC (at Q = 50) = 10(50) – [120 + .1(50)2] = 500 – 120 – 250 = 130
General Graph of Imperfectly Competitive Firm Profit Max $ MC MR Q $ TR TC Q
Imperfectly Competitive Firm Profit Max (example) P = 44-Q MR = 44-2Q TR = 44Q-Q2 MC = .2Q TC = 120 + .1Q2 Π Max Q MR=MC 44-2Q = .2Q 2.2Q = 44 Q = 20 • Max π = TR-TC (at Q = 20) = [44(20)-(20)2] – [120 + .1(20)2] = [480] – [160] = 320
Fixed Costs and Profit Max • True or False? Fixed costs do not affect the profit-maximizing level of output? • True. Only, marginal costs (changes in variable costs) determine profit-maximizing level of output. Recall, profit-max output rule is to produce where MR = MC.
Q. Should a firm ‘shut down’ in SR? • Profit if ‘produce’ = TR – TVC – TFC Profit if ‘don’t produce’ or ‘shut down’ = -TFC Shut down if • TR – TVC – TFC < -TFC • TR – TVC < 0 • TR < TVC
Perfectly Competitive Firm & Market Supply Firm S = MC curve above AVC (P=MR) > AVC Market S = sum of individual firm supplies
Graph of SR Shut Down Point $ MC Short-run Supply curve ATC AVC Market price Shut-down point Q
SR Profit Scenarios • Produce, π > 0 • Produce, π < 0 (loss less than – TFC) • Don’t produce, π = -TFC
SR vs LR Production if q = f(K,L) SR: K is fixed only decision is q which determines L LR: K is NOT fixed decisions = 1) q and 2) what combination of K & L to use to produce q Recall, π = TR – TC to max π of producing given q, need to min. TC
Budget Line = maximum combinations of 2 goods that can be bought given one’s income = combinations of 2 goods whose cost equals one’s income
Isocost Line = maximum combinations of 2 inputs that can be purchased given a production ‘budget’ (cost level) = combinations of 2 inputs that are equal in cost
Isocost Line Equation TC1 = rK + wL • rK = TC1 – wL • K = TC1/r – w/r L Note: ¯slope = ‘inverse’ input price ratio = ΔK / ΔL = rate at which capital can be exchanged for 1 unit of labor, while holding costs constant
Isocost Line (specific example) TC1 = 10,000 r = 100 max K = 10,000/100 = 100 w = 10 max L = 10,000/10 = 1000 K 100 TC1 = 10,000 K = 100 - .1L L 1000
Increasing Isocost K TC3 > TC2 > TC1 L TC1 TC2 TC3
Changing Input Prices K TC1 TC1 r w L L
Different Ways (costs) of Producing q1 K 1 2 q1 3 TC3 TC2 TC1 L
Cost Min Way of Producing q1 K K* & L* are cost-min. combinations Min cost of producing q1 = TC1 1 K* 2 q1 3 TC3 TC2 TC1 L L*
Cost Minimization - Slope of isoquant = - slope of isocost line
Average Cost and Output • SR Avg cost will eventually increase due to law of diminish MP ( MC will start to and eventually pull avg cost up) • LR economics of scale a) If increasing LR AC will with q b) If constant LR AC does not change with q c) If decreasing LR AC will if q
LR Equilibrium P of output = min LR AC LR Disequilibrium • P > min LR AC (from profits) • Firms will enter • mkt S P • P < min LR AC (firm losses) • Firms will exit • mkt S P