Doubles in
10 yrs
Years until the amount doubles
Compound interest on $1,000,000
See how $1,000,000 grows through compound interest — with a live calculator, growth curve, and rate comparison. Illustrative only, not investment advice.
$1,000,000 at 7% for 30 years (compounded monthly) becomes about $8,116,497.
Explore the growth
Drag the rate and horizon and pick a compounding frequency to see what $1,000,000 becomes.
Final balance$8,116,497
Total interest$7,116,497
Effective rate (APY)7.23%
Growth over 30 years at 7%
Final balance by rate and term
What $1,000,000 becomes — at 4, 6, 8, and 10% over 5 to 30 years (compounded monthly).
| Rate | 5 yrs | 10 yrs | 20 yrs | 30 yrs |
|---|---|---|---|---|
| 4% | $1,220,997 | $1,490,833 | $2,222,582 | $3,313,498 |
| 6% | $1,348,850 | $1,819,397 | $3,310,204 | $6,022,575 |
| 8% | $1,489,846 | $2,219,640 | $4,926,803 | $10,935,730 |
| 10% | $1,645,309 | $2,707,041 | $7,328,074 | $19,837,399 |
20-year balance by rate
Principal vs. interest (7%, 30 years)
PrincipalInterest
Milestones at 7%
Interest > principal
10 yrs
Year interest first exceeds the principal
After 30 years
$8.12M
$1,000,000 grows to about $8,116,497
Effective rate
7.23%
APY at 7% nominal, compounded monthly
How little compounding frequency matters
$1,000,000 at 5% over 20 years — from annual to continuous, the final balance shifts only by a fraction.
| Compounding | Final balance (5%, 20 yrs) |
|---|---|
| Annually | $2,653,298 |
| Quarterly | $2,701,485 |
| Monthly | $2,712,640 |
| Daily | $2,718,096 |
| Continuously | $2,718,282 |
What compound interest is — and the formula behind it
Compound interest means the interest you have already earned itself earns interest. That makes a balance grow not linearly but exponentially — unremarkable at first, then steep. The formula is A = P·(1 + r/n)^(n·t): A is the final balance, P the starting amount, r the annual rate as a decimal, n the compounding periods per year, and t the years.
Every figure on this page is illustrative only and not investment advice — real returns vary and are never guaranteed. For your own amounts, contributions, and rates, use the compound interest calculator. Background: Investopedia — Compound Interest.
Related amounts & tools
Frequently asked questions
How much does $1,000,000 grow to in 30 years at 7%?
At 7% a year, compounded monthly, $1,000,000 grows to about $8,116,497 over 30 years — with no further deposits, purely from compounding.
When does $1,000,000 double at 7%?
At 7%, $1,000,000 doubles after about 10 years. The Rule of 72 estimates this quickly: 72 ÷ 7 ≈ 10.3 years.
What does $1,000,000 become in 20 years at 5%?
At 5% a year, compounded monthly, $1,000,000 grows to about $2,712,640 over 20 years.
How much does the rate change the outcome?
A lot. Over 30 years, $1,000,000 grows to about $8,116,497 at 7%, but about $19,837,399 at 10%. A few extra percentage points nearly double the final figure — that is the leverage of time.
Does compounding frequency make a big difference?
Only a small one. At 7% nominal, the effective annual rate (APY) with monthly compounding is about 7.23%. Moving from annual to monthly or daily changes the final figure by only fractions of a percent — the rate and the time horizon matter far more.
What formula is used here?
With the compound interest formula A = P·(1 + r/n)^(n·t): P is the starting amount ($1,000,000), r the annual rate, n the compounding periods per year, and t the years. All figures here are illustrative only and not investment advice.
Run your own numbers
The compound interest calculator opens pre-filled with $1,000,000 and lets you add contributions, rates, and terms.