Measurement and Interpretation of Elasticities

1. Measurementand Interpretationof Elasticities Chapter 5

2. Discussion Topics • Own price elasticity of demand • Income elasticity of demand • Cross price elasticity of demand • Other general properties • How can we use these demand elasticities 2

3. Key Concepts Covered… • Own price elasticity = %Qi for a given%Pi, ηii • i.e., the effect of a change in the price for hamburger on hamburger demand: ηHH = %QH for a given%PH • Cross priceelasticity = %Qifor a given %Pj, ηij • i.e., the effect of a change in the price of chicken on hamburger demand: ηHC = %QH for a given%PC • Incomeelasticity = %Qifor a given%Income, ηiY • i.e., the effect of a change in income on hamburger demand: ηHY = %QH for a given%PY Pages 70-76 3

4. Key Concepts Covered… • Arc elasticity = elasticity estimated over a range of prices and quantities along a demand curve • Point elasticity = elasticity estimated at a point on the demand curve • Price flexibility = reciprocal (the inverse) of the own price elasticity • %Pifor a given%Qi Pages 70-76 4

5. Own Price Elasticityof Demand 5

6. Own Price Elasticity of Demand Own price elasticity of demand Percentage change in quantity demanded (Q) ηii= Percentage change in own price (P) $ Point Elasticity Approach: Single point on curve Own price elasticity of demand Pa Pb Q Qb Qa Q = (Qa – Qb) P = (Pa – Pb) • The subscript • a stands for after price change • bstands for before price change 6 Pages 70-72

7. Own Price Elasticity of Demand Own price elasticity of demand Specific range on curve Percentage change in quantity ηii= $ Percentage change in own price Pa Arc Elasticity Approach: Pb Own price elasticity of demand Q Qa Qb where: P= (Pa + Pb) 2 Q= (Qa + Qb) 2 Q = (Qa – Qb) P = (Pa – Pb) Equation 5.3 Avg Price • The subscript • a stands for after price change • bstands for before price change Avg Quantity Page 72 7

8. Interpreting the Own Price Elasticity of Demand Note: The %Δ in Q is in terms of the absolute value of the change 8 Page 72

9. Demand Curves Come in a Variety of Shapes $ Q 9

10. Demand Curves Come in a Variety of Shapes $ Perfectly Inelastic ∆P Perfectly Inelastic: A price change does not change quantity purchased Perfectly Elastic Q 10 Page 72

11. Demand Curves Come in a Variety of Shapes $ Inelastic Demand ∆P ∆P Elastic Demand Q ∆Q ∆Q 11 Page 73

12. Demand Curves Come in a Variety of Shapes $ Elastic where –%Q > % P Unitary Elastic where –%Q = % P Inelastic where –%Q < % P Q 12 Page 73

13. Example of Arc Own-Price Elasticity of Demand • Unitary elasticity • –% Change in Q = % Change in P • ηii= –1.0 Page 73 13

14. Elastic demand Inelastic demand Page 73 14

15. Elastic Demand Curve $ • With the price decrease from Pb to Pa • What happens to producer revenue? Pb Pa Q 0 Qb Qa 15

16. Elastic Demand Curve $ Results in a larger % increase in quantity demanded Pb Cut in price Pa Q 0 Qb Qa 16

17. Elastic Demand Curve • Producer revenue (TR) = price x quantity • Revenue before the change (TRb) is Pb x Qb • Represented by the area 0PbAQb • Revenue after the change is (TRa) is Pa x Qa • Represented by the area 0PaBQa $ C A Pb B Pa Q 0 Qa Qb 17

18. Elastic Demand Curve • Change in revenue (∆TR) is TRa – TRb • → ∆TR = 0PaBQa– 0PbAQb • → ∆TR = QbDBQa – PaPbAD • →TR ↑ • %Q ↑ is greater than %P ↓ $ Red Box Purple Box C A Pb D B Pa • When you have elastic demand • ↑ in price → ↓ total revenue • ↓ in price → ↑ total revenue Q 0 Qa Qb 18

19. Inelastic Demand Curve $ Pb Cut in price Pa Results in smaller % increase in quantity demanded Q Qb Qa 19

20. Inelastic Demand Curve $ • With price decrease from Pb to Pa • What happens to producer revenue? Pb Pa Q Qb Qa 20

21. Inelastic Demand Curve • Producer revenue (TR) = price x quantity • Revenue before the change (TRb) is Pb x Qb • Represented by the area 0PbAQb • Revenue after the change is (TRa) Pa x Qa • Represented by the area 0PaBQa $ A Pb B Pa Q 0 Qb Qa 21

22. Inelastic Demand Curve • Change in revenue (∆TR) is TRa – TRb • ∆TR = 0PaBQa– 0PbAQb • ∆TR = QbDBQa – PaPbAD • →TR ↓ • % Q increase is less than %P decrease $ Purple Box Red Box A Pb B Pa • When you have inelastic demand • ↑ in price → ↑ total revenue • ↓ in price → ↓ total revenue D Q 0 Qb Qa 22

23. Revenue Implications Typical of Agricultural Commodities 23 Page 81

24. Elastic Demand Curve $ • Consumer surplus (CS) • Before price cut CS is area PbCA • After the price cut CS is area PaCB C A Pb B Pa Q 0 Qb Qa 24

25. Elastic Demand Curve $ • The gain in consumer surplus after the price cut is area PaPbAB = PaCB – PbCA C A Pb B Pa Q 0 Qb Qa 25

26. Inelastic Demand Curve $ • Inelastic demand and price decrease • Consumer surplus increases by area PaPbAB A Pb B Pa Q 0 Qb Qa 26

27. Retail Own Price Elasticities • Beef and veal= -0.62 • Pork = -0.73 • Fluid Milk = -0.26 • Wheat = -0.11 • Rice = -0.15 • Carrots = -0.04 • Non food = -0.99 Source: Huang, (1985) Page 79 27

28. Interpretation • Let’s use rice as an example • Previous Table: own price elasticity of –0.15 • → If the price of rice drops by 10%, the quantity of rice demanded will increase by 1.5% $ Demand Curve • With a price drop • What is the impact on rice producer revenues? • What is the impact on consumer surplus from rice consumption? Pb A 10% drop B Pa 1.5% increase Q 0 QB Qa 28

29. Own Price Elasticity Example • The local Kentucky Fried Chicken outlet typically sells 1,500 Crunchy Chicken platters per month at $3.50 each • The own price elasticity for the platter is estimated to be –0.30 • If the KFC outlet increases the price of the platter to $4.00: • How many platters will the KFC outlet sell after the price change?__________ • The KFC outlet’s revenue will change by $__________ • Will consumers be worse or better off as a result of this price change?_________ Inelastic demand 29

30. The answer… • The local KFCsells 1,500 crunchy chicken platters per month at $3.50 each. The own price elasticity for this platter is estimated to be –0.30. If the local KFC outlet increases the price of the platter by 50¢: • How many platters will the chicken sell?1,440 • Solution: • -0.30 = %Q%P • -0.30= %Q[($4.00-$3.50) (($4.00+$3.50) 2)] • -0.30= %Q[$0.50$3.75] • -0.30= %Q0.1333 • → %Q=(-0.30 × 0.1333) = -0.04 or –4% • → New quantity = (1–0.04)×1,500 = 0.96×1,500 = 1,440 P Avg. Price %P 30

31. The answer… b.The Chicken’s revenue will change by +$510 Solution: Current revenue = 1,500 × $3.50 = $5,250/month New revenue = 1,440 × $4.00 = $5,760/month →revenue increases by $510/month = $5,760 - $5,250 c. Consumers will be __worse___ off as a result of this price change Why? Because price has increased 31

32. Another Example • The local KFC outlet sells 1,500 crunchy chicken platters/month when their price was $3.50. The own price elasticity for this platter is estimated to be • –1.30. If the KFC increases the platter price by 50¢: • How many platters will the chicken sell?__________ • b. The Chicken’s revenue will change by $__________ • c. Will the consumers be worse or better off as a result of this price change? Elastic demand 32

33. The answer… • The local KFC outlet sells 1,500 crunchy chicken platters/month when the price is $3.50 . The own price elasticity for this platter is estimated to be • –1.30. If the KFC increases the platter price by 50¢: • How many platters will the KFC outlet sell? 1,240 • Solution: • -1.30 = %Q%P • -1.30= %Q[($4.00-$3.50) (($4.00+$3.50) 2)] • -1.30= %Q[$0.50$3.75] • -1.30= %Q0.1333 • %Q=(-1.30 × 0.1333) = -0.1733 or –17.33% • → New quantity = (1 ̶ 0.1733)×1,500 = 0.8267 ×1,500 = 1,240 33

34. The answer… • b. The Chicken’s revenue will change by –$290 • Solution: • Current revenue = 1,500 × $3.50 = $5,250/mo • New revenue = 1,240 × $4.00 = $4,960/mo • →Revenue decreases by $290/mo = ($4,960 – $5,250) • Consumers will be worse off as a result of this price change • Why? Because the price increased. 34

35. Income Elasticityof Demand 35

36. Income Elasticity of Demand Income elasticity of demand Percentage change in quantity demanded (Q) ηY = Percentage change in income (I) where: I= (Ia + Ib) 2 Q= (Qa + Qb) 2 Q = (Qa – Qb) I = (Ia – Ib) • ηY : A quantitative measure of changes or shifts in quantity demanded (ΔQ) resulting from changes in consumer income (I) Page 74-75 36

37. Interpreting the Income Elasticity of Demand Page 75 37

38. Example • Assume Federal income taxes are cut and disposable income (i.e., income fter taxes) is increased by 5% • Assume the chicken income elasticity of demand is estimated to be 0.3645 • What impact would this tax cut have upon the demand for chicken? • Is chicken a normal or an inferior good? Why? 39

39. The Answer • 1. Assume the government cuts taxes, thereby increasing disposable income (I) by 5%. The income elasticity for chicken is 0.3645. • What impact would this tax cut have upon the demand for chicken? • Solution: • 0.3645 = %QChicken  % I • → 0.3645 = %QChicken  .05 • →%QChicken = .3645 .05 = .018 or + 1.8% • b. Chicken is a normal but not a luxury good since the income elasticity is > 0 and < 1.0 40

40. Cross Price Elasticityof Demand 41

41. Cross Price Elasticity of Demand Cross Price elasticity of demand Percentage change in quantity demanded ηij = Percentage change in another good’s price i and j are goods (i.e., apples, oranges, peaches) where: Pj= (Pja + Pjb) 2 Qi= (Qia + Qib) 2 Qi = (Qia – Qib) Pj = (Pja – Pjb) • ηij provides a quantitative measure of the impacts of changes or shifts in the demand curve as the price of other goods change Page 75 42

42. Cross Price Elasticity of Demand • If commodities i&j are substitutes (ηij > 0): • Pi↑→Qi↓, Qj↑ • i.e., strawberries vs. blueberries, peaches vs. oranges • If commodities i&j are complements (ηij < 0): • Pi↑→Qi↓, Qj↓ • i.e., peanut butter and jelly, ground beef and hamburger buns • If commodities i & j are independent (ηi j= 0): • Pi↑→Qi↓, Qj is not impacted • i.e., peanut butter and Miller Lite Page 75 43

43. Interpreting the Cross Price Elasticity of Demand Page 76 44

44. Some Examples Off diagonal values are all positive → These products are substitutes Values in red along the diagonal are own price elasticities Page 80 45

45. Some Examples Note: An increase in Ragu spaghetti sauce price has a bigger impact on Hunt’s spaghetti sauce demand (ηRH = 0.535) than an increase in Hunt’s spaghetti sauce price on Ragu demand (ηHR = 0.138) Page 80 46

46. Some Examples A 10% increase in Ragu spaghetti sauce price increases the demand for Hunt’s spaghetti sauce by 5.35% Page 80 47

47. Some Examples A 10% increase in Hunt’s spaghetti sauce price increases Ragu spaghetti sauce demand by 1.38% Page 80 48

48. Example • The cross price elasticity for hamburger demand with respect to the price of hamburger buns is equal to –0.60 • If the price of hamburger buns rises by 5%, what impact will that have on hamburger consumption? • What is the demand relationship between these products? 49

49. The Answer • The cross price elasticity for hamburger demand with respect to the price of hamburger buns is equal to –0.60 • If the price of hamburger buns rises by 5%, what impact will that have on hamburger consumption? -3.0% • Solution: • -0.60 = %QH  %PHB • -0.60 = %QH  .05 • %QH = .05  (-.60) = -.03 or – 3.0% • What is the demand relationship between these products? • These two products are complements as evidenced by the negative sign on the associated cross price elasticity 50

50. Another Example • Assume a retailer: • Sells 1,000 six-packs of Pepsi/day at a price of $3.00 per six-pack • The cross price elasticity for Pepsi with respect to Coca Cola price is 0.70 • If the price of Coca Cola rises by 5%, what impact will that have on Pepsi sales? • b. What is the demand relationship between these products? 51