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OCR GCSE Maths (Higher) Study Notes

1.9.2 Making Estimates

Estimation is a vital mathematical skill, enabling quick approximations and checks for answer reasonableness. It's especially useful when precise values aren't necessary. This guide focuses on estimating calculations involving numbers, quantities, and measurements, highlighting the importance of rounding in problem contexts.

Importance of Making Estimates

  • Enhances number sense: Develops intuition for numbers and operations.
  • Efficiency: Provides a quick way to obtain approximate answers.
  • Verification: Acts as a check against precise calculations.

Techniques for Making Estimates

Rounding Numbers

Rounding is fundamental to effective estimation:

  • Nearest 10, 100, 1000, etc.: Adjust based on the digit immediately right of the target place.
  • Decimal places: Round according to the desired decimal place.
  • Significant figures: Keep a specified number of significant digits from the first non-zero digit.

Estimating Sums and Differences

1. Round each number to a meaningful figure before adding or subtracting.

2. Combine rounded values for an approximate result.

Estimating Products and Quotients

1. Round numbers to a significant figure for multiplication or division.

2. Calculate with rounded numbers to estimate the result.

Worked Examples

Example 1: Estimating a Sum

Estimate the sum: 123.45+678.9123.45 + 678.9

1. Round: 123.45120123.45 \approx 120, 678.9680678.9 \approx 680

2. Sum: 120+680=800120 + 680 = 800

3. Estimated Sum: 800

Example 2: Estimating a Product

Estimate the product: 49.6×7.849.6 \times 7.8

1. Round: 49.65049.6 \approx 50, 7.887.8 \approx 8

2. Multiply: 50×8=40050 \times 8 = 400

3. Estimated Product: 400

Example 3: Estimation in a Real-Life Context

Estimate carpeting cost for a room 5.8 m5.8 \ m by 4.5 m4.5 \ m at £29.99/m2£29.99/m^2.

1. Area Estimation: 5.8 m6 m5.8 \ m \approx 6 \ m, 4.5 m5 m4.5 \ m \approx 5 \ m

  • Area: 6 m×5 m=30 m26 \ m \times 5 \ m = 30 \ m^2

2. Cost Estimation: £29.99/m2£29.99/m^2 £30/m2\approx £30/m²

  • Cost: 30 m2×£30/m2=£90030\ m^2 \times £30/m^2= £900

3. Adjusted Estimation: 5.8 m×4.5 m=26.1 m226 m25.8\ m \times 4.5\ m = 26.1\ m^2 \approx 26\ m^2, adjusted to a more accurate rounding leads to:

  • Area: 26 m226 \ m^2, Cost: 26 m2×£30/m2=£78026 \ m^2 \times £30/m^2 = £780

Tips for Effective Estimation

  • Contextual awareness: Determine the needed accuracy.
  • Benchmarks: Use common benchmarks for quick estimates.
  • Practice: Improve with varied estimation problems.

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