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Index Numbers in Economics
1. Introduction
๐ Index numbers are statistical measures that track changes in variables over time.
- Used to measure inflation, cost of living, stock prices, and economic growth.
- Expresses relative changes as percentages, making comparisons easy.
โ Example: The Consumer Price Index (CPI) measures inflation by tracking the price level of consumer goods over time.
2. Types of Index Numbers
๐น (1) Price Index Numbers
โ Measures changes in the price level of goods and services over time.
โ Examples:
- Consumer Price Index (CPI) โ Measures the cost of living.
- Wholesale Price Index (WPI) โ Measures wholesale market price changes.
๐น (2) Quantity Index Numbers
โ Tracks changes in the physical quantity of goods produced or sold.
โ Example: Industrial Production Index (IPI), which measures manufacturing output.
๐น (3) Value Index Numbers
โ Measures total value changes (Price ร Quantity).
โ Example: GDP Deflator, which adjusts nominal GDP for inflation.
๐ Formula: Value Index=โP1Q1โP0Q0ร100\text{Value Index} = \frac{\sum P_1 Q_1}{\sum P_0 Q_0} \times 100
where:
- P1,Q1P_1, Q_1 = Price and quantity in the current year.
- P0,Q0P_0, Q_0 = Price and quantity in the base year.
3. Methods of Constructing Index Numbers
๐น (1) Simple Aggregative Method
โ Compares total prices of a group of items in different years.
๐ Formula: PI=โP1โP0ร100P_I = \frac{\sum P_1}{\sum P_0} \times 100
โ Example: If the total price of goods in 2025 is โน1200 and in the base year (2020) was โน1000, PI=12001000ร100=120P_I = \frac{1200}{1000} \times 100 = 120
โ Interpretation: Prices have increased by 20% since 2020.
๐น (2) Simple Average of Price Relatives Method
โ Calculates price changes of individual goods and takes their average.
๐ Formula: PI=โP1P0ร100NP_I = \frac{\sum \frac{P_1}{P_0} \times 100}{N}
โ Example: If rice price rose from โน20 to โน25 and wheat from โน30 to โน33, Price=2520ร100=125,Pwheat=3330ร100=110P_{\text{rice}} = \frac{25}{20} \times 100 = 125, \quad P_{\text{wheat}} = \frac{33}{30} \times 100 = 110 PI=125+1102=117.5P_I = \frac{125 + 110}{2} = 117.5
โ Interpretation: Average price increase of 17.5%.
๐น (3) Weighted Index Numbers
โ Gives importance to items based on their significance.
(i) Laspeyresโ Index (Base Year Weights)
๐ Formula: PL=โP1Q0โP0Q0ร100P_L = \frac{\sum P_1 Q_0}{\sum P_0 Q_0} \times 100
โ Uses base year quantities as weights.
โ Pros: Simple to calculate.
โ Cons: Overestimates price changes if consumption patterns change.
(ii) Paascheโs Index (Current Year Weights)
๐ Formula: PP=โP1Q1โP0Q1ร100P_P = \frac{\sum P_1 Q_1}{\sum P_0 Q_1} \times 100
โ Uses current year quantities as weights.
โ Pros: Adjusts for changing consumption.
โ Cons: Harder to compute due to varying weights.
(iii) Fisherโs Ideal Index
๐ Formula: PF=PLรPPP_F = \sqrt{P_L \times P_P}
โ Geometric mean of Laspeyres and Paasche indices.
โ Most accurate as it balances both weightings.
4. Special Types of Index Numbers
๐น (1) Consumer Price Index (CPI)
โ Measures changes in the cost of living for consumers.
โ Used to calculate inflation and adjust salaries.
โ Formula: CPI=โP1Q0โP0Q0ร100CPI = \frac{\sum P_1 Q_0}{\sum P_0 Q_0} \times 100
โ Example: If the CPI in 2020 was 100 and in 2025 it is 120, inflation is 20%.
๐น (2) Wholesale Price Index (WPI)
โ Measures price changes at the wholesale level before they reach consumers.
โ Used by policymakers to track inflation trends.
๐น (3) GDP Deflator
โ Measures overall inflation in an economy.
โ Formula: GDP Deflator=Nominal GDPReal GDPร100\text{GDP Deflator} = \frac{\text{Nominal GDP}}{\text{Real GDP}} \times 100
โ Example: If nominal GDP = โน200 trillion and real GDP = โน180 trillion, GDP Deflator=200180ร100=111.1\text{GDP Deflator} = \frac{200}{180} \times 100 = 111.1
โ Interpretation: Prices have increased by 11.1% since the base year.
5. Uses and Importance of Index Numbers
โ Inflation Measurement โ Used in setting interest rates and wages.
โ Cost of Living Adjustments โ Helps adjust pensions and salaries.
โ Stock Market Analysis โ Stock indices like NIFTY, SENSEX, S&P 500 track stock performance.
โ Economic Policy Making โ Used by governments to decide monetary and fiscal policies.
6. Limitations of Index Numbers
โ Choice of Base Year โ A bad base year can give misleading results.
โ Changes in Consumption Patterns โ Peopleโs spending habits change over time.
โ Quality Changes Not Considered โ A product may improve, but index numbers donโt always reflect quality changes.
โ Substitution Bias โ Consumers switch to cheaper alternatives when prices rise, which indices may not capture.
7. Conclusion
โ Index numbers are essential in economics to measure price changes, inflation, and economic trends.
โ CPI, WPI, and GDP Deflator are widely used indicators.
โ Weighted index numbers like Laspeyres, Paasche, and Fisherโs provide better accuracy.
โ Despite limitations, index numbers remain a key tool for economic analysis and policymaking.