Discrete Compounding vs. Continuous Compounding: What's the Difference? (2024)

Discrete Compounding vs. Continuous Compounding: An Overview

People invest with the expectation of receiving more than what they invested. That added amount is commonly referred to as interest. Depending on the investment, interest can compound differently. The most common ways interest accrues is through discrete compounding and continuous compounding.

Discrete compounding and continuous compounding are closely related terms. Discretely compounded interest is calculated and added to the principal at specific intervals (e.g., annually, monthly, or weekly). Continuous compounding uses a natural log-based formula to calculate and add back accrued interest at the smallest possible intervals.

Interest can be compounded discretely at many different time intervals. Discrete compounding explicitly defines the number of and the distance between compounding periods. For example, an interest that compounds on the first day of every month is discrete.

There is only one way to perform continuous compounding—continuously. The distance between compounding periods is so small (smaller than even nanoseconds) that it is mathematically equal to zero.

Discrete Compounding

If the interest rate is simple (no compounding takes place), then the future value of any investment can be written as:

$\begin{aligned} &FV = P (1+ \frac{r}{m})^{mt}\\ &\textbf{where:}\\ &FV = \text{Future value}\\ &P = \text{Principal}\\ &(r/m) = \text{Interest rate}\\ &mt = \text{Time period}\\ \end{aligned}$​FV=P(1+mr​)mtwhere:FV=FuturevalueP=Principal(r/m)=Interestratemt=Timeperiod​

Compounding interest calculates interest on the principal and accrued interest. When interest is compounded discretely, its formula is:

$\begin{aligned} &\text{FV} = \text{P} (1+ \frac{r}{m})^{mt}\\ &\textbf{where:}\\ &t = \text{The term of the contract (in years)}\\ &m = \text{The number of compounding periods per year}\\ \end{aligned}$​FV=P(1+mr​)mtwhere:t=Thetermofthecontract(inyears)m=Thenumberofcompoundingperiodsperyear​

Continuous Compounding

Continuous compounding introduces the concept of the natural logarithm. This is the constant rate of growth for all naturally growing processes. It's a figure that developed out of physics.

The natural log is typically represented by the letter e. To calculate continuous compounding for an interest-generating contract, the formula needs to be written as:

$FV=P\times e^{rt}$FV=P×ert

Special Considerations

Interest rates impact people in different ways. For example, an investor wants to earn the most interest possible, as it brings more of a return to their initial investment amount. A borrower wants the least amount of interest possible, because that makes the cost of borrowing lower. More interest on borrowed money ends up making it more expensive.

As an individual, you want to ensure that you are finding the best interest profile for yourself. In the case of an investor, they would benefit from compounding rather than simple interest, because simple interest calculates interest only on the principal amount. While this is good for borrowers, it is bad for investors.

As an investor, compounding is always the best scenario; however, if you can receive continuous compounding over discrete compounding, that is even better.

The Bottom Line

Compounding refers to how interest is calculated on interest on an investment. The two most common methods, discrete compounding and continuous compounding, will have different outcomes on the return of an investment.

Continuous compounding adds more interest, so it is better for investors, whereas discrete compounding adds less. However, all forms of compounding are better for investors than simple interest, which only calculates interest on the principal amount.