How Compound Interest Works

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Summary

Compound interest is interest earned on both the original amount (principal) and on previously earned interest. Unlike simple interest — which only grows the original amount — compound interest creates a snowball effect where your money grows faster the longer it’s invested. Combined with regular contributions, compound interest is the primary mechanism behind long-term wealth building.

How it works

The calculator combines two components:

Lump-sum growth — your initial deposit grows by earning interest on itself
Annuity growth — your regular monthly contributions each earn interest from the point they’re deposited

Contributions are assumed to be made at the end of each compounding period (ordinary annuity convention). Interest is applied first, then the contribution is added — so each contribution starts earning interest from the next period.

Compounding frequency

Interest can compound at different intervals:

Frequency	Periods per year	Effect
Monthly	12	Most common for savings accounts and funds
Quarterly	4	Used by some building societies
Annually	1	Simplest to understand; slightly lower returns

More frequent compounding produces slightly higher returns because interest starts earning interest sooner. At typical rates (3–7%), the difference between monthly and annual compounding is roughly 0.1–0.5% per year.

The formula

FV = P(1 + r/n)^(nt) + PMT × [((1 + r/n)^(nt) − 1) / (r/n)]

Where

FV= Future value — the total amount after t years

P= Principal — starting amount (£)

r= Annual interest rate (as a decimal, e.g. 0.07 for 7%)

n= Compounding frequency — times per year interest is applied

t= Time period in years

PMT= Regular contribution per compounding period (£)

The first term is the lump-sum growth of the initial principal. The second term is the future value of an ordinary annuity — the accumulated value of all regular contributions with compound interest.

The Rule of 72

A quick mental shortcut: divide 72 by your annual interest rate to estimate how many years it takes for your money to double.

At 4% → doubles in ~18 years
At 7% → doubles in ~10 years
At 10% → doubles in ~7 years

Worked examples

Lump sum + monthly contributions: £10,000 at 7% for 10 years

Lump-sum future value

£10,000 × (1 + 0.07/12)^120 = £10,000 × 2.0097 = £20,096.61

= £20,097

Annuity future value (£500/month)

£500 × ((1.00583)^120 − 1) / 0.00583 = £500 × 173.08 = £86,541.93

= £86,542

Total future value

£20,097 + £86,542

= £106,639

Total contributions

£10,000 + (£500 × 12 × 10)

= £70,000

Total interest earned

£106,639 − £70,000

= £36,639

Result

Final value: £106,639 — you contributed £70,000 and earned £36,639 in interest (52% return on contributions)

Contributions only: £200/month at 5% for 20 years

Annuity future value

£200 × ((1 + 0.05/12)^240 − 1) / (0.05/12) = £200 × 411.03

= £82,207

Total contributions

£200 × 12 × 20

= £48,000

Total interest earned

£82,207 − £48,000

= £34,207

Result

Final value: £82,207 — you contributed £48,000 and earned £34,207 in interest (71% return on contributions)

Lump sum only: £50,000 at 4% annually for 30 years

Future value

£50,000 × 1.04^30 = £50,000 × 3.2434

= £162,170

Total interest earned

£162,170 − £50,000

= £112,170

Result

Final value: £162,170 — the £50,000 more than tripled in 30 years at just 4% annually

Inputs explained

Starting amount — the lump sum you’re investing or have already saved (can be £0)
Monthly contribution — how much you add each month (can be £0 for a one-off lump sum)
Annual interest rate — the expected annual return. For cash savings, use the AER offered by your bank. For equity investments, 5–7% (after inflation) is a common long-term assumption.
Time period — how many years the money will be invested
Compounding frequency — how often interest is applied. Monthly is standard for most UK savings accounts and investment platforms.

Outputs explained

Final value — the total amount at the end of the period (principal + contributions + all interest earned)
Total contributions — starting amount plus all monthly contributions over the period
Total interest — the difference between final value and total contributions — this is the “free” money from compounding
Interest as % of contributions — shows how much extra you earned relative to what you put in
Growth chart — stacked area showing contributions (teal) vs interest earned (purple) over time
Year-by-year table — detailed schedule of balance, contributions, and interest at each year-end

Assumptions & limitations

Constant rate — the calculator assumes a fixed annual return for the entire period. In reality, returns fluctuate year to year. For equities, the actual annual return might range from −30% to +30%, while the long-term average is ~7% real.
No fees or taxes — investment fees (e.g. platform charges, fund OCFs) and tax on interest income are not deducted. In a stocks & shares ISA, growth is tax-free; in a general account, interest above the Personal Savings Allowance (£1,000 for basic-rate, £500 for higher-rate taxpayers) is taxable.
No inflation adjustment — all values are in nominal terms. To see real (inflation-adjusted) growth, subtract expected inflation (~2%) from your rate.
End-of-period contributions — contributions are assumed to be added at the end of each compounding period (ordinary annuity). If you contribute at the start, actual returns would be slightly higher.

Verification

Test case	Input	Expected FV	Source
Lump + monthly	£10k + £500/mo, 7%, monthly, 10yr	£106,639	Standard formula
Monthly only	£0 + £200/mo, 5%, monthly, 20yr	£82,207	Standard formula
Lump only (annual)	£50k + £0, 4%, annual, 30yr	£162,170	Standard formula
Zero rate	£10k + £500/mo, 0%, monthly, 10yr	£70,000	Contributions only
No contributions (monthly)	£10k, 7%, monthly, 10yr	£20,097	A = P(1+r/n)^(nt)

Sources

Industry

The Calculator Site — Compound Interest Formulaaccessed 16 Feb 2026

Gov

SEC Investor.gov — Compound Interest Calculatoraccessed 16 Feb 2026

Gov

MoneyHelper — Savings Calculatoraccessed 16 Feb 2026

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