Compound Interest Calculator

See how your money multiplies. Enter your principal, rate, and time – and watch the magic of compounding work.

Compound interest calculator — watch your investment grow over time

Your Investment Details

Future Value
after 20 years
Principal + Contributions
Interest Earned
Return on Investment

Growth Visualization

Principal
Interest
Principal
Interest

Year-by-Year Breakdown

Year Deposited Interest Balance
// The Formula
A = P(1 + r/n)nt
Principal × (1 + rate / frequency) raised to (frequency × years)
A

Final Amount

Total value including principal + all accumulated interest

P

Principal

Initial investment — your starting capital

r

Rate

Annual interest rate as a decimal (7% = 0.07)

n

Frequency

How many times per year interest compounds

t

Time

Number of years the money is invested

The 8th Wonder

Einstein's Favourite Formula

Compound interest rewards patience above all else. At 8% annual return, $10,000 becomes $46,610 in 20 years — without adding a single dollar more. Rule of 72: divide 72 by your rate to find years to double. At 7%, your money doubles every ~10 years.

// Why it matters

Time Is Your Greatest Asset

Compound interest creates a snowball effect that accelerates over time. Starting at 25 with $200/month at 7% yields approximately $520,000 by 65. Starting at 35 yields only $240,000. Those extra 10 years nearly double the result — the contributions barely changed, but time did.

Unlike simple interest (I = P × r × t), compound interest recalculates on the growing balance each period, leading to exponential rather than linear growth. The difference widens dramatically beyond 15 years.

Rule of 72: At 7% interest, your money doubles in roughly 72 ÷ 7 = 10.3 years. At 9%, only 8 years. At 6%, about 12 years. A useful mental shortcut for planning.

// Realistic rates to use

Benchmark Interest Rates

S&P 500 Index — ~7–10% (nominal)

Historical average ~10% before inflation, ~7% inflation-adjusted. Appropriate for long-term equity index investing models.

High-Yield Savings — 4–5%

Current online savings accounts in the US offer 4–5%. Lower risk, fully liquid, FDIC insured. Good for emergency funds and short-term goals.

Bonds / Fixed Income — 2–5%

Government and investment-grade corporate bonds. Lower returns, lower risk. Suitable for capital preservation or portfolio balance.

🌏 AU/CA Term Deposits — 4–5.5%

Australian and Canadian banks offer competitive term deposits. Often compounding quarterly or annually. Useful for medium-term goals.

// Common Questions

Frequently Asked Questions

Interest calculated on both the initial principal and the accumulated interest from previous periods. Unlike simple interest, it grows exponentially — your balance earns interest on previously earned interest, creating a snowball effect. Formula: A = P(1 + r/n)^(nt).
Simple interest (I = P × r × t) calculates only on the original principal. Compound interest recalculates on the growing balance each period. Over 20 years at 7%, the difference between the two methods on $10,000 can exceed $10,000.
Divide 72 by your annual interest rate to estimate how many years it takes to double your money. At 6%, that's 12 years; at 9%, about 8 years. Remarkably accurate for rates of 4–12%.
S&P 500 historically ~7% inflation-adjusted. High-yield savings 4–5%. Bonds 2–4%. For conservative planning use 5–6%; for long-term equity modelling, 7% is a common benchmark. Always use real (inflation-adjusted) rates for retirement planning.
Yes — enter a monthly contribution amount. The calculator compounds your contributions alongside the initial principal, giving a realistic picture of consistent regular saving or investing over time.
More frequent compounding yields marginally more growth. Daily vs. monthly difference is tiny in practice. For example, £10,000 at 5% over 10 years: annually £16,289, monthly £16,470, daily £16,487. Choose whatever matches your actual financial product.
If you earn 7%/year but inflation runs at 3%, your real return is ~4%. Always subtract expected inflation from the nominal return when planning for long-term goals. This calculator shows nominal growth — real purchasing power growth will be lower.
The maths are identical but the direction reverses. For savings it works for you. For loans (credit cards, mortgages), unpaid interest is added to principal and then itself accrues — which is why carrying a credit-card balance is so costly.
The mathematical limit where compounding happens infinitely often: A = Pe^(rt). Produces marginally more than daily compounding. No real-world product compounds continuously, but it's used in theoretical finance and options pricing.
Frequency matters most with large principal, high rates, and long time horizons. On a $1M balance at 8% over 30 years: annual compounding gives $10.06M, monthly gives $10.93M — a $870k difference. For typical savings accounts, the impact is modest.
// Explore More

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For informational purposes only — not financial, medical, or legal advice. Results are estimates; use at your own risk. Full terms