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Chapter 6 Measuring the Cost of Living 1. 2 In this chapter, look for the answers to these questions:  What is the Consumer Price Index (CPI)? How is.

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Presentation on theme: "Chapter 6 Measuring the Cost of Living 1. 2 In this chapter, look for the answers to these questions:  What is the Consumer Price Index (CPI)? How is."— Presentation transcript:

1 Chapter 6 Measuring the Cost of Living 1

2 2 In this chapter, look for the answers to these questions:  What is the Consumer Price Index (CPI)? How is it calculated? What’s it used for?  What are the problems with the CPI? How serious are they?  How does the CPI differ from the GDP deflator?  How can we use the CPI to compare dollar amounts from different years? Why would we want to do this, anyway?  How can we correct interest rates for inflation?

3 The Consumer Price Index (CPI)  Measures the typical consumer’s cost of living  The basis of cost of living adjustments (COLAs) in many contracts and in Social Security 3

4 How the CPI Is Calculated 1.Determine the “basket.” Statistics Canada surveys consumers to determine what’s in the typical consumer’s “shopping basket.” 2.Find the prices. Statistics Canada collects data on the prices of all the goods in the basket. 3.Compute the basket’s cost. Use the data on prices to compute the total cost of the basket. 4

5 How the CPI Is Calculated 4.Choose a base year and compute the index. The CPI in any year equals 5.Compute the inflation rate. The percentage change in the CPI from the preceding period. 100 x cost of basket in current year cost of basket in base year CPI this year – CPI last year CPI last year Inflation rate x 100% = 5

6 EXAMPLE basket: {4 pizzas, 10 lattes} $12 x 4 + $3 x 10 = $78 $11 x 4 + $2.5 x 10 = $69 $10 x 4 + $2 x 10 = $60 cost of basket $3.00 $2.50 $2.00 price of latte $122010 $112009 $102008 price of pizza year Compute CPI in each year 2008: 100 x ($60/$60) = 100 2009: 100 x ($69/$60) = 115 2010: 100 x ($78/$60) = 130 Inflation rate: 15% 115 – 100 100 x 100% = 13% 130 – 115 115 x 100% = using 2007 base year: 6

7 A C T I V E L E A R N I N G 1 Calculate the CPI CPI basket: {10 lbs beef, 20 lbs chicken} The CPI basket cost $120 in 2008, the base year. A. Compute the CPI in 2009. B. What was the CPI inflation rate from 2009-2010? price of beef price of chicken 2008$4 2009$5 2010$9$6 7

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9 CPI basket: {10# beef, 20# chicken} 2008-9: Households bought CPI basket. 2010: Households bought {5 lbs beef, 25 lbs chicken}. A C T I V E L E A R N I N G 2 Substitution bias 9 beefchicken cost of CPI basket 2008$4 $120 2009$5 $150 2010$9$6$210 A. Compute cost of the 2010 household basket. B. Compute % increase in cost of household basket over 2009-10, compare to CPI inflation rate. 9

10 Problems with the CPI: Commodity Substitution Bias  Over time, some prices rise faster than others.  Consumers substitute toward goods that become relatively cheaper.  The CPI misses this substitution because it uses a fixed basket of goods.  Thus, the CPI overstates increases in the cost of living. 10

11 Problems with the CPI: Introduction of New Goods  The introduction of new goods increases variety, allows consumers to find products that more closely meet their needs.  In effect, dollars become more valuable.  The CPI misses this effect because it uses a fixed basket of goods.  Thus, the CPI overstates increases in the cost of living. 11

12 Problems with the CPI: Unmeasured Quality Change  Improvements in the quality of goods in the basket increase the value of each dollar.  Statistics Canada tries to account for quality changes but probably misses some, as quality is hard to measure.  Thus, the CPI overstates increases in the cost of living. 12

13 Problems with the CPI  Each of these problems causes the CPI to overstate cost of living increases.  The CPI probably overstates inflation by about 0.6 percentage points per year according to research by the Bank of Canada. 13

14 Problems with the CPI  The issue is important because private and public pension programs (Old Age Security and the Canada Pension Plan), personal income tax deductions, some government social payments, and many private sector wage settlements are all adjusted upward using the CPI.  The bias in the CPI suggests that adjustments to wages, pensions, and social payments that are based on the CPI may be larger than necessary to maintain the purchasing power of these wages and benefits. 14

15 The GDP Deflator vs. the CPI  Economists and policymakers monitor both the GDP deflator and the consumer price index to gauge how quickly prices are rising. Usually, these two statistics tell a similar story.  Yet there are two important differences that can cause them to diverge: 15

16 The GDP Deflator vs. the CPI 1. The GDP deflator reflects the prices of all goods and services produced domestically, whereas the CPI reflects the prices of all goods and services bought by consumers. 2. The CPI compares the price of a fixed basket of goods and services to the price of the basket in the base year. The GDP deflator compares the price of currently produced goods and services to the price of the same goods and services in the base year. 16

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18 Imported consumer goods:  Included in CPI  Excluded from GDP deflator Imported consumer goods:  Included in CPI  Excluded from GDP deflator The basket:  CPI uses fixed basket  GDP deflator uses basket of currently produced goods & services This matters if different prices are changing by different amounts. The basket:  CPI uses fixed basket  GDP deflator uses basket of currently produced goods & services This matters if different prices are changing by different amounts. Capital goods:  Excluded from CPI  Included in GDP deflator (if produced domestically) Capital goods:  Excluded from CPI  Included in GDP deflator (if produced domestically) Contrasting the CPI and GDP Deflator 18

19 In each scenario, determine the effects on the CPI and the GDP deflator. A. Tim Horton’s raises the price of doughnuts. B. Bombardier raises the price of the subway cars it manufactures at its factory near Montreal. C. Armani raises the price of its Italian made jeans it sells in Canada. A C T I V E L E A R N I N G 3 CPI vs. GDP deflator 19

20 Correcting Variables for Inflation : Comparing Dollar Figures from Different Times  Inflation makes it harder to compare dollar amounts from different times.  Was the 1957 price of 9.5 cents per litre high or low compared with the 2009 price of gas (95 cents per litre)?  To compare the 1957 price of gas with the 2009 price, we need to inflate the price of 9.5 cents per litre to turn 1957 dollars into 2009 dollars. A price index shows us the size of this inflation correction. 20

21  In our example, year T = 1957, “today” = 2009 Price of gas in year T = 9.5 cents CPI = 14.8 in year T, CPI = 114.3 in 2009 Correcting Variables for Inflation: Comparing Dollar Figures from Different Times Amount in today’s dollars Amount in year T dollars Price level today Price level in year T = x 73.4 cents 9.5 cents 114.3 14.8 = x The price of gasoline in 1957 was 73.4 cents in today’s (2009) dollars. 21

22 Correcting Variables for Inflation: Comparing Dollar Figures from Different Times  Researchers, business analysts and policymakers often use this technique to convert a time series of current-dollar (nominal) figures into constant-dollar (real) figures.  They can then see how a variable has changed over time after correcting for inflation.  Example: the price of gasoline between 1957 to 2009. 22

23 Correcting Variables for Inflation: Indexation For example, the increase in the CPI automatically determines  The COLA in many multi-year labour contracts  The adjustments to Canada Pension Plan and Old Age Security Payments, and federal income tax brackets. A dollar amount is indexed for inflation if it is automatically corrected for inflation by law or in a contract. 23

24 Correcting Variables for Inflation: Real vs. Nominal Interest Rates The nominal interest rate:  the interest rate not corrected for inflation  the rate of growth in the dollar value of a deposit or debt The real interest rate:  corrected for inflation  the rate of growth in the purchasing power of a deposit or debt Real interest rate = (nominal interest rate) – (inflation rate) 24

25 Correcting Variables for Inflation: Real vs. Nominal Interest Rates Example:  Deposit $1,000 for one year.  Nominal interest rate is 9%.  During that year, inflation is 3.5%.  Real interest rate = Nominal interest rate – Inflation = 9.0% – 3.5% = 5.5%  The purchasing power of the $1000 deposit has grown 5.5%. 25

26 Real and Nominal Interest Rates 26


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