Simple vs. Compound Interest: Definition and Formulas (2024)

Other Compound Interest Concepts

Time Value of Money

Since money is not “free” but has a cost in terms of interest payable, it follows that a dollar today is worth more than a dollar in the future. This concept is known as the time value of money and forms the basis for relatively advanced techniques like discounted cash flow (DFC) analysis. The opposite of compounding is known as discounting. The discount factor can be thought of as the reciprocal of the interest rateand is the factor by which a future value must be multiplied to get the present value.

The formulasfor obtaining the future value (FV) and present value (PV) are as follows:

$\begin{aligned}&\text{FV}=PV\times\left[\frac{1+i}{n}\right]^{(n\times t)}\\&\text{PV}=FV\div\left[\frac{1+i}{n}\right]^{(n\times t)}\\&\textbf{where:}\\&i=\text{Interest rate in percentage terms}\\&n=\text{Number of compounding periods per year}\\&t=\text{Total number of years for the investment or loan}\end{aligned}$​FV=PV×[n1+i​](n×t)PV=FV÷[n1+i​](n×t)where:i=Interestrateinpercentagetermsn=Numberofcompoundingperiodsperyeart=Totalnumberofyearsfortheinvestmentorloan​

The Rule of 72

The Rule of 72 calculates the approximate time over which an investment will double at a given rate of return or interest “i” and is given by (72 ÷ i). It can only be used for annual compounding but can be very helpful in planning how much money you might expect to have in retirement.

For example, an investment that has a 6% annual rate of return will double in 12 years (72 ÷ 6%).

An investment with an 8% annual rate of return will double in nine years (72 ÷ 8%).

Compound Annual Growth Rate (CAGR)

The compound annual growth rate (CAGR) is used for most financial applications that require the calculation of a single growth rate over a period.

For example, if your investment portfolio has grown from $10,000 to $16,000 over five years, then what is the CAGR? Essentially, this means that PV = $10,000, FV = $16,000, and nt = 5, so the variable “i” has to be calculated. Using a financial calculator or Excel spreadsheet, it can be shown that i = 9.86%.

Please note that according to cash flow convention, your initial investment (PV) of $10,000 is shown with a negative sign since it represents an outflow of funds. PV and FV must necessarily have opposite signs to solve “i” in the above equation.

Real-Life Applications

CAGRis extensively used to calculate returns over periods for stocks, mutual funds, and investment portfolios. CAGR is also used to ascertain whether a mutual fund manager or portfolio manager has exceeded the market’s rate of return over a period. For example, if a market index has provided total returns of 10% over five years, but a fund manager has only generated annual returns of 9% over the same period, then the manager has underperformed the market.

CAGR can also be used to calculate the expected growth rate of investment portfolios over long periods, which is useful for such purposes as saving for retirement. Consider the following examples:

1. A risk-averse investor is happy with a modest 3% annual rate of return on their portfolio. Their present $100,000 portfolio would, therefore,grow to $180,611 after 20 years. In contrast, a risk-tolerant investor who expects an annual rate of return of 6% on their portfolio would see $100,000 grow to $320,714 after 20 years.
2. CAGR can be used to estimate how much needs to be stowed away to save for a specific objective. A couple who would like to save $50,000 over 10 years towarda down payment on a condo would need to save $4,165 per year if they assume an annual return (CAGR) of 4% on their savings. If they’reprepared to take on additional risk and expect a CAGR of 5%, then they would need to save $3,975 annually.
3. CAGR can also be used to demonstrate the virtues of investing earlier rather than later in life. If the objective is to save $1 million by retirement at age 65, based on a CAGR of 6%, a 25-year-old would need to save $6,462 per year to attain this goal. A 40-year-old, on the other hand, would need to save $18,227, or almost three times that amount, to attain the same goal.

Additional Interest Considerations

Make sure you know the exact annual percentage rate (APR) on your loansince the method of calculation and number of compounding periods can have an impact on your monthly payments. While banks and financial institutions have standardized methods to calculate interest payable on mortgages and other loans, the calculations may differ slightly from one country to the next.

Compounding can work in your favor when it comes to your investments, but it can also work for you when making loan repayments. For example, making half your mortgage payment twice a month, rather than making the full payment once a month, will end up cutting down your amortization period and saving you a substantial amount of interest.

Compounding can work against you if you carry loans with very high rates of interest, like credit card or department store debt. For example, a credit card balance of $25,000 carried at an interest rate of 20%—compounded monthly—would result in a total interest charge of $5,485 over one year or $457 per month.

The Bottom Line

Get the magic of compounding working for you by investing regularly and increasing the frequency of your loan repayments. Familiarizing yourself with the basic concepts of simple interest and compound interest will help you make better financial decisions, saving you thousands of dollars and boosting your net worth over time.