How does compound interest work?

Compound interest earns interest on both your principal and accumulated interest. $10,000 at 7% becomes $10,700 year 1, then $11,449 year 2 (7% of $10,700). The more frequently interest compounds (daily vs monthly), the more you earn.

What is the rule of 72?

Rule of 72: divide 72 by your interest rate to find years to double. At 7% = 72/7 = 10.3 years to double. At 10% = 7.2 years. Quick mental math for exponential growth.

How much does compound interest grow over 20 years?

$10,000 at 7% for 20 years = $38,697 (nearly 4x). Add $200/month contributions = $117,059. Time and consistency beat trying to find high returns. Start early — the last 10 years of compounding adds as much as the first 20.

Compound Interest Calculator (2026)

Q: What is the difference between simple and compound interest?

Simple interest = principal × rate × time. Compound interest = principal × (1 + rate)^time. $10,000 at 7% for 30 years: simple = $31,000 total, compound = $76,123 total. Compounding makes the difference.

How to Use This Compound Interest Calculator

Enter your starting amount, expected annual return rate, time period, and optional monthly contributions. The calculator instantly shows your future value, total invested, and interest earned. Adjust the compounding frequency to compare daily, monthly, quarterly, and annual options.

How Compound Interest Works

Compound interest is interest calculated on both the initial principal and the accumulated interest from previous periods. Albert Einstein reportedly called it "the eighth wonder of the world" — and with good reason. The longer money compounds, the more dramatically it grows.

The difference between simple and compound interest becomes striking over long periods. $10,000 invested at 7% simple interest for 30 years grows to $31,000. With monthly compounding, that same $10,000 grows to over $81,000 — nearly 3× more, from the same initial investment.

The Compound Interest Formula

The standard compound interest formula is:

A = P × (1 + r/n)^n×t

Variable	Meaning
A	Final amount (future value)
P	Principal (initial investment)
r	Annual interest rate (as decimal)
n	Compounding frequency per year
t	Time in years

Example: $10,000 at 7% Over 30 Years

Compounding	Future Value	Interest Earned
Annual	$76,122	$66,122
Monthly	$81,165	$71,165
Daily	$81,635	$71,635

More frequent compounding produces marginally higher returns. The difference between monthly and daily compounding is small, but the difference between annual and daily is meaningful over decades.

The Power of Regular Contributions

Adding even modest monthly contributions dramatically accelerates growth. Adding $200/month to that same $10,000 at 7% over 30 years grows to over $281,000 — compared to $81,000 without contributions. Regular contributions add $72,000 in contributions but generate over $129,000 in additional interest.

Rule of 72

A quick mental shortcut: divide 72 by your interest rate to estimate how many years until your money doubles. At 7%, money doubles roughly every 72 ÷ 7 = 10.3 years. At 10%, it doubles every 7.2 years.

Frequently Asked Questions

Simple interest is calculated only on the principal. Compound interest is calculated on the principal plus all previously accumulated interest. Over long periods, compound interest grows exponentially while simple interest grows linearly.

More frequent compounding means slightly higher returns. Daily compounding earns marginally more than monthly, which earns more than annual. However, the difference between daily and monthly is small — the rate and time period matter far more.

The S&P 500 has historically returned approximately 10% annually before inflation, or about 7% after inflation. A diversified portfolio of stocks and bonds typically returns 5–8% annually over the long term. These are historical averages and future returns are not guaranteed.

No — the calculator shows nominal returns without adjusting for inflation. To estimate real (inflation-adjusted) returns, subtract the expected inflation rate (typically 2–3%) from your interest rate before entering it.

(2026) Free Compound Interest Calculator — See Your Money Grow