The multiplier method
Compound interest problems are much easier to solve by using the multiplier method.
For example, a 5% increase on the original balance in a bank would mean there is now 105% in the bank. This is the same as 1.05 as a decimal so this is the multiplier.
Examples
Calculate the interest on borrowing 拢40 for 3 years if the compound interestThis arises when interest on an investment is calculated and added and then this interest payment also earns interest. rate is 5% per year.
- Year 1: \(\pounds 40 \times 1.05 = \pounds 42\)
- Year 2: \(\pounds 42 \times 1.05 = \pounds 44.10\)
- Year 3: \(\pounds 44.10 \times 1.05 = \pounds 46.31\)
This calculation can be made more concise by using powers.
To calculate the money in the bank after 3 years the calculation would be:
\(40 \times 1.05 \times 1.05 \times 1.05 = 46.31\)
This can also be written as:
\(40 \times 1.05^3 = 46.31\)
Using powers saves a lot of steps if the time period for the calculation is large.
Question
拢500 is invested in a bank account that receives 3% compound interest per year. How much will be in the bank account after 7 years?
\(500 \times 1.03^7 = \pounds 614.94\)
Question
A car depreciates in value by 8% per year. It was bought for 拢10,000. How much is it worth after 5 years?
\(10,000 \times 0.92^5 = \pounds 6,590.82\)