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Upper & Lower Bounds | Mathematics for GCSE/IGCSE - Year 11 PDF Download

Bounds & Error Intervals

What are bounds?

  • Bounds refer to the smallest (lower bound, LB) and largest (upper bound, UB) numbers that a rounded number can lie between.
    • They indicate how low or high the number could have been before it was rounded.
  • The bounds for a number, x, are expressed as LB ≤ x < UB.
    • Note that the lower bound is included in the range of possible values for x, but the upper bound is not.

How do we find bounds when a number has been rounded?

  • The basic rule is "Half Up, Half Down."
    • Upper Bound: To find the upper bound, add half the degree of accuracy.
    • Lower Bound: To find the lower bound, subtract half the degree of accuracy.
    • Error Interval: LB ≤ x < UB.
  • It's tempting to think that the upper bound should end in a 9, or 99, etc., but the Error Interval LB ≤ x < UB does not include the upper bound.
    • The upper bound is the cut-off point for the greatest value that the number could have been rounded from but will not actually round to the number itself.

Calculations using Bounds

How do I find the bounds of a calculation?

  • Adding Numbers: 𝑇=𝑎+𝑏T = a + b
    • Upper Bound: Add the upper bound of 𝑎a and the upper bound of 𝑏b.
    • Lower Bound: Add the lower bound of 𝑎a and the lower bound of 𝑏b.
  • Subtracting Numbers: 𝑇=𝑎𝑏T = a − b
    • Upper Bound: Use the upper bound of 𝑎a and subtract the lower bound of 𝑏b.
    • Lower Bound: Use the lower bound of 𝑎a and subtract the upper bound of 𝑏b.
  • Multiplying Numbers: 𝑇=𝑎×𝑏T = a × b
    • Upper Bound: Multiply the upper bound of 𝑎a and the upper bound of 𝑏b.
    • Lower Bound: Multiply the lower bound of a and the lower bound of 𝑏b.
  • Dividing Numbers: 𝑇=𝑎÷𝑏T = a ÷ b
    • Upper Bound: Use the upper bound of 𝑎a and divide it by the lower bound of 𝑏b.
    • Lower Bound: Use the lower bound of 𝑎a and divide it by the upper bound of 𝑏b.

How can bounds help with calculations?

  • You can utilize bounds to determine the level of accuracy in a calculation.
  • This helps in deciding how to round your answer. 
    • For example, if the lower bound of a value is 8.33217 and the upper bound is 8.33198, the true value lies between these bounds.
    • When both bounds round to 8.332 to 4 significant figures, any discrepancies when rounded to 5 significant figures become apparent.
    • This ensures that the answer unequivocally rounds to 8.332 with 4 significant figures.
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FAQs on Upper & Lower Bounds - Mathematics for GCSE/IGCSE - Year 11

1. How can upper and lower bounds be used in calculations?
Ans. Upper and lower bounds are used to determine the possible range within which a number lies. When performing calculations, it is important to use these bounds to ensure the final answer is accurate within a certain margin of error.
2. How can rounded numbers affect the determination of bounds?
Ans. Rounded numbers can introduce errors in calculations when determining bounds. It is important to consider the impact of rounding on the accuracy of the final result, especially when dealing with upper and lower bounds.
3. Can bounds be used to improve the accuracy of calculations?
Ans. Yes, bounds can be used to improve the accuracy of calculations by providing a range within which the actual value lies. This helps in minimizing errors and ensuring the final result is as precise as possible.
4. Why is it important to understand the concept of upper and lower bounds in mathematics?
Ans. Understanding the concept of upper and lower bounds is essential in mathematics as it helps in determining the range of possible values for a number. This knowledge is crucial for accurate calculations and ensuring the validity of results.
5. How can error intervals be used in conjunction with upper and lower bounds?
Ans. Error intervals can be used in conjunction with upper and lower bounds to determine the margin of error in a calculation. By considering both bounds and error intervals, one can better assess the accuracy of the final result and account for any potential uncertainties.
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