Continuous Compound Interest
The formula for calculating the amount to which an investment grows is given by
where
is the principal amount invested
the amount – principal plus interest - after
years
is the interest rate for the period in question – 7% would be written
i
is the number of periods.
Something strange happens as the number of periods is increased, and the interest rate per period correspondingly decreased.
If £1000 is invested for 1 years at a fixed rate of 6% per annum the amount after 1 year is
If the amount is paid quarterly four times a year then the interest rate per quarter is 1.5%. The number of periods is now 4. The amount after four years is
Extra interest is earned just by compounding more often even though the interest rate has not gone up.
If the interest is compounded n times a year, then the interest rate per period is 0.06 over n so the amount at the end of the year is
£1000*(1 +{0.06 over n})^n
If we let n tend to infinity- compounding interest every tiny fraction of a nanosecond, we can use the identity
to write for the amount after one year,
We can generalise this to any interest rate r and any number of years
If
is invested for years at a rate of interestcompounded continuously, the amount in the account after n years is
This is continuous compound interest, and always earns more interest than when interest is added after each time period longer than zero.
