Introduction
Simple interest is calculated only on the principal (that is, the initial amount) so the amount of interest being added to a loan or investment remains constant or fixed. However, most of the time when banks and financial institutions calculate interest, they are using compound interest.
Compound interest
Compound interest is calculated at the end of each compounding period, which is typically a day, month, quarter, or year. At the end of each compounding period, the total amount (principal plus interest) from previous compounding periods is used to calculate the new quantity of interest.
Examples
Example 1
\$8000 is invested for 3 years at a rate of 3\% p.a. compounded annually.
| Interest ($) | Balance ($) | |
|---|---|---|
| \text{After }0\text{ years} | - | 8000 |
| \text{After }1\text{ year} | ||
| \text{After }2\text{ years} | ||
| \text{After }3\text{ years} |
Complete the above table.
Calculate the total interest accumulated over 3 years.
Compound interest is calculated at the end of each compounding period, on the total amount (principal plus interest) from the previous compounding period.
Compound interest formula
Why does money grow faster with compound interest than simple interest?
For example, consider a deposit of \$1000 into an online account for 2 years that pays 10\% pa simple interest. The interest earned in the 2 years is \$1000 \times 10\% \times 2 =\$200.
But suppose that, instead of simple interest, the paid interest compounded annually. In this case, the interest earned in the first year would be \$1000 \times 10\% \times 1 = \$100.
The new principal at the end of the first year would be \$1000 + \$100 = \$1100.
The interest earned in the second year would then be \$1100 \times 10\% \times 1 = \$110.
So the total compound interest earned over the two years would be \$100 + \$110 = \$210 which is \$10 more than what was earned with simple interest. Although a \$10 difference may not seem like much, think of how much the difference would have been if a million dollars was invested instead of a thousand, or if the investment was made for twenty years instead of two.
Notice that in the above example, at the end of each compounding period there is a two step process: calculate the interest and then add it to the account balance. We could treat this as a percentage increase and combine these two steps as follows:
| \displaystyle \text{Balance after }1\text{ year} = | \displaystyle = | \displaystyle 500+500 \times 0.1 |
| \displaystyle = | \displaystyle 500 \times (1+0.1) | |
| \displaystyle = | \displaystyle 550 |
This suggests a rule:\text{New balance } = \text{ Previous balance } \times (1+0.1) In other words, we can find the balance at the end of each year by repeatedly multiplying by (1+0.1):
| \displaystyle \text{Balance after }1\text{ year} | \displaystyle = | \displaystyle 500 \times (1+0.1) |
| \displaystyle \text{Balance after }2\text{ years} | \displaystyle = | \displaystyle 500 \times (1+0.1)\times (1+0.1) |
| \displaystyle = | \displaystyle 500 \times (1+0.1)^2 | |
| \displaystyle \text{Balance after }3\text{ years} | \displaystyle = | \displaystyle 500 \times (1+0.1)\times (1+0.1) \times (1+0.1) |
| \displaystyle = | \displaystyle 500 \times (1+0.1)^3 |
This leads us to the compound interest formula: A=P\left(1+\dfrac{r}{100}\right)^n where A is the final amount of money , P is the principal , r is the interest rate per compounding period, expressed as a whole number, and n is the number of compounding time periods.
For interest rates r that are expressed as a decimal or a fraction, this formula can be used instead: A=P(1+r)^n
This formula gives us the total amount (ie. the principal and interest together). To calculate how much of the final amount is interest I, this can be done by subtracting the principal P from the total amount of the investment / loan A, I=A-P
Examples
Example 2
William's investment of \$2000 earns interest at a rate of 6\% p.a, compounded annually over 4 years. What is the future value of the investment to the nearest cent?
Example 3
Tom wants to put a deposit on a house in4 years. In order to finance the \$12\,000 deposit, he decides to put some money into a high interest savings account that pays 5\% p.a. interest compounded monthly. If P is the amount of money that he must put into his account now to accumulate enough for the deposit, find P to the nearest cent.
We can find the final value of an investment or loan using the formula:
For interest rates r that are expressed as a decimal or a fraction, this formula can be used instead: A=P(1+r)^n
We can find the interest earned using the formula: