Continuously Compounded Interest: What's e Got To Do With It?

Lesson Plan - Get It!

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You may already be familiar with compound interest—the idea that money can grow over time when interest is added to the principal repeatedly.

The more often interest is added, the faster the money grows.

• But what happens if you compound interest continuously without any breaks?

That’s where e comes in.

Mathematicians Jacob Bernoulli and Leonhard Euler studied this idea in the 1600s and 1700s. Bernoulli discovered that if interest is compounded more and more frequently—hourly, by the second, or even at every tiny moment—the formula for compound interest approaches a limit.

Euler later proved that this limit is an irrational number called e, approximately equal to 2.718.

Break it down step by step.

The Compound Interest Formula

The formula for compound interest is:

A = P(1 + ^r/_n)nt

Where:

A = final amount in the account

P = initial principal (starting amount)

r = annual interest rate (as a decimal)

n = number of times interest is compounded per year

t = number of years

The more frequently interest is added (larger n), the greater the final amount.

• But what if interest is compounded at every possible moment?

Replace the formula with this version, using e:

A = Pe^(rt)

This is the formula for continuous compounding—where n becomes infinitely large.

Example: Growing Your Money

Say you invest $1,000 at an annual interest rate of 5%, compounded continuously.

• How much will you have in 10 years?

A = 1000e(0.05 × 10)

A ≈ 1000e0.5

A ≈ 1000 × 1.6487

A ≈ $1,648.72

With continuous compounding, your money grows a little faster than with daily or monthly interest. That’s why banks, businesses, and scientists rely on this formula for precise calculations.

Now, practice using the formula yourself in the Got It? section!