Compound Interest Calculator
See exactly how your money grows using compound interest. Enter your initial investment, regular contributions, interest rate, and time horizon to project your final balance, total interest earned, and a year-by-year breakdown. Choose your compounding frequency and see results at three different rate scenarios.
Compound Interest Calculator
Final balance, interest earned, and year-by-year growth with any compounding frequency
Enter your investment details to see how compound interest grows your money over time.
* Assumes constant rate and consistent contributions. Monthly contributions added at start of each month. HYSA and CD rates are variable and subject to change. Investment returns are not guaranteed. Results are for illustration only.
What Is Compound Interest?
Compound interest is interest calculated on both your original principal and on the interest that has already accumulated. Unlike simple interest, which applies only to the starting balance, compounding earns returns on returns. Each period, the interest earned gets added to the balance, and the next period's interest calculation uses that larger number. The result is exponential rather than linear growth. Given enough time, the difference is enormous.
A concrete example: $10,000 invested at 7% annual interest for 30 years grows to $76,123 with compound interest, compared to $31,000 with simple interest. The extra $45,123 comes entirely from interest earning interest. That gap widens with every additional year.
How to Use This Compound Interest Calculator
The Compound Interest Formula Explained
Basic Formula (Lump Sum, No Contributions)
A = P × (1 + r/n)^(n × t)
Where P = principal, r = annual interest rate as a decimal, n = compounding periods per year, t = years. Example: $5,000 at 5% compounded monthly for 10 years: A = $5,000 × (1 + 0.05/12)^(12 × 10) = $5,000 × 1.6470 = $8,235.
Formula with Regular Contributions
When you add contributions each period, the math extends to sum the future value of each individual contribution. In practice, the compound interest calculator runs this as a period-by-period simulation, which handles any compounding frequency and contribution timing accurately.
Daily vs. Monthly vs. Annual Compounding
The compounding frequency affects how quickly interest accumulates. With the same 5% annual rate, a $10,000 investment over 10 years produces:
| Compound Frequency | Final Balance | Interest Earned |
|---|---|---|
| Annually | $16,289 | $6,289 |
| Quarterly | $16,436 | $6,436 |
| Monthly | $16,470 | $6,470 |
| Daily | $16,487 | $6,487 |
* $10,000 principal, 5% annual rate, 10 years, no additional contributions. Daily compounds $198 more than annual compounding over the same period.
The Rule of 72: Quick Doubling Estimate
The Rule of 72 gives you a fast mental estimate of how long it takes to double your money at any given interest rate. Divide 72 by the annual interest rate and the result is the approximate years to double.
- At 4% (current HYSA range): 72 / 4 = 18 years to double
- At 7% (S&P 500 real return estimate): 72 / 7 = approximately 10.3 years
- At 10% (S&P 500 nominal estimate): 72 / 10 = 7.2 years to double
- At 0.38% (FDIC national average): 72 / 0.38 = approximately 189 years to double
The Rule of 72 works best for rates between 6% and 10%. For rates below 6%, it slightly overestimates doubling time. For rates above 10%, it slightly underestimates it. It's a back-of-the-envelope tool and a complement to precise formulas, but it's remarkably useful for quick comparisons between rate offers.
Compound Interest Rate Benchmarks for 2026
The interest rate you use in the calculator determines everything. Here are the key benchmarks as of June 2026:
| Account / Asset | Rate / APY | Best for |
|---|---|---|
| FDIC national avg (savings) | 0.38% APY | Traditional bank savings, almost always better elsewhere |
| High-yield savings (HYSA) | 4.00%–5.00% APY | Emergency fund, short-term savings, liquid cash |
| Top HYSA (Varo Money) | up to 5.00% APY | Best available savings rate as of June 2026 |
| 1-year CD | ~4.30% APY | Fixed rate for defined timeframe, no market risk |
| S&P 500 (10-yr nominal avg) | ~9.5% annualized | Long-term equity investing (no guaranteed return) |
| S&P 500 (inflation-adjusted) | ~7% annualized | Conservative long-term equity projection |
| Federal funds rate | 3.50–3.75% | Fed policy benchmark (held June 17, 2026) |
* HYSA and CD rates as of June 2026 (Fortune/Curinos). S&P 500 figures are historical averages and represent no guarantee of future performance. Fed funds rate from Federal Reserve June 17, 2026 announcement.
APY vs. APR: Which to Use in the Calculator
APY (Annual Percentage Yield) already accounts for compounding. Banks quote savings account rates in APY because it reflects the actual return you earn per year. When your account statement says "4.20% APY compounded daily," the 4.20% is the effective annual yield after compounding is applied. Enter this number directly into the calculator's interest rate field.
APR (Annual Percentage Rate) is the rate before compounding. The compound interest formula uses the pre-compounding rate (what the formula calls "r"), so if your institution quotes APR, use it in the formula directly. If they quote APY, you can use it as a close enough approximation for the calculator's annual rate field, especially for short time periods. For precise conversion: APR = n × ((1 + APY)^(1/n) - 1), where n is the compounding periods per year.
Compound Interest and Regular Contributions
Adding consistent monthly contributions dramatically accelerates compound growth. The mechanism is straightforward: each new contribution immediately starts earning interest on top of all previous interest, creating a compounding stack that grows more powerful over time.
| Scenario | 10 Years | 20 Years | 30 Years |
|---|---|---|---|
| $10,000 lump sum at 7% | $19,672 | $38,697 | $76,123 |
| $0 start + $200/mo at 7% | $34,607 | $104,921 | $243,994 |
| $10,000 + $200/mo at 7% | $54,279 | $143,618 | $320,117 |
| $10,000 + $500/mo at 7% | $96,679 | $264,021 | $594,614 |
* All figures use monthly compounding at 7% annual rate. Monthly contributions added at beginning of each month.
