Ratio & ProportionTopic Summary

Knowledge Organiser: Compound Interest and Exponential Change

Part of Compound Interest · GCSE GCSE Mathematics revision

This topic summary covers Knowledge Organiser: Compound Interest and Exponential Change within Compound Interest for GCSE Mathematics. Revise Compound Interest in Ratio & Proportion for GCSE Mathematics with 12 exam-style questions and 4 flashcards. This topic appears regularly enough that it should still be part of a steady revision cycle. It is section 6 of 6 in this topic. Use this topic summary to connect the idea to the wider topic before moving on to questions and flashcards.

Topic position

Section 6 of 6

Practice

12 questions

Recall

4 flashcards

Knowledge Organiser: Compound Interest and Exponential Change

Key Terms

Compound interest: Interest calculated on the original amount AND on previously earned interest
Exponential growth: Repeated percentage increase over time (multiplier > 1)
Exponential decay: Repeated percentage decrease over time (multiplier < 1)
Multiplier: The number raised to a power: (1 + r) for growth, (1 - r) for decay
Depreciation: A repeated percentage decrease in value (e.g. a car losing value each year)

Must-Know Facts

Compound interest applies the percentage to a growing total, not a fixed original
Growth formula: y = a × (1 + r)ⁿ
Decay formula: y = a × (1 - r)ⁿ
r is the rate as a decimal (e.g. 5% → r = 0.05)
n is the number of time periods (years, hours, etc.)
Use the power (xⁿ) button on your calculator

Key Formulas

Growth: y = a × (1 + r)ⁿ
Decay: y = a × (1 - r)ⁿ
Compound interest: A = P × (1 + r)ⁿ
Multiplier for growth: 1 + (% ÷ 100)
Multiplier for decay: 1 - (% ÷ 100)

Common Mistakes

Simple vs compound: Simple interest gives the same amount each year; compound recalculates on the growing total
Rate as percentage: r must be a decimal — 5% per year means r = 0.05, so multiplier is 1.05
n is number of periods: If investing for 3 years, use n = 3, not n = 4
Decay multiplier: 10% depreciation uses 0.9, NOT 1.1
Rounding mid-calculation: Keep full calculator accuracy and only round the final answer

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Keep building this topic

Read this section alongside the surrounding pages in Compound Interest. That gives you the full topic sequence instead of a single isolated revision point.

Worked Example 2: Depreciation What Is Exponential Change?Key Facts

Practice Questions for Compound Interest

Which formula correctly calculates the amount A after compound interest at rate r% per year for n years on principal P?

A. A = P × (1 + r/100) × n
B. A = P × (1 + r/100)^n
C. A = P + P × r/100 × n
D. A = P × r^n / 100

1 markfoundation

£2,000 is invested for 4 years. - Account A pays 5% simple interest per year. - Account B pays 4.5% compound interest per year. Which account gives more money after 4 years? Show all working.

3 marksstandard

Quick Recall Flashcards

Exponential Decay

N = N₀ × (1 - r)^t for decay rate r

Growth vs Decay

Growth: multiply by (1+r). Decay: multiply by (1-r). The multiplier is raised to the power of n (time periods).

12 questions on Compound Interest — practise free

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Worked Example 2: Depreciation

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Compound Interest