The Rule of 72: What It Is and How to Use It in Investing (2024)

Rate of Return	Rule of 72	Actual # of Years	Difference (#) of Years
2%	36.0	35	1.0
3%	24.0	23.45	0.6
5%	14.4	14.21	0.2
7%	10.3	10.24	0.0
9%	8.0	8.04	0.0
12%	6.0	6.12	0.1
25%	2.9	3.11	0.2
50%	1.4	1.71	0.3
72%	1.0	1.28	0.3
100%	0.7	1	0.3

Notice that although it gives an estimate, the Rule of 72 is less precise as rates of return increase.

The Rule of 72 and Natural Logs

The Rule of 72 can estimate compounding periods using natural logarithms. In mathematics, the logarithm is the opposite concept of a power; for example, the opposite of 10³ is log base 10 of 1,000.

$\begin{aligned} &\text{Rule of 72} = ln(e) = 1\\ &\textbf{where:}\\ &e = 2.718281828\\ \end{aligned}$ Ruleof72=ln(e)=1where:e=2.718281828

e is a famous irrational number similar to pi. The mostimportantproperty of the numbereis related to the slope of exponential and logarithm functions, and its first few digits are 2.718281828.

The natural logarithm is the amount of time needed to reach a certain level of growth withcontinuous compounding.

The time value of money (TVM) formula is the following:

$\begin{aligned} &\text{Future Value} = PV \times (1+r)^n\\ &\textbf{where:}\\ &PV = \text{Present Value}\\ &r = \text{Interest Rate}\\ &n = \text{Number of Time Periods}\\ \end{aligned}$ FutureValue=PV×(1+r)nwhere:PV=PresentValuer=InterestRaten=NumberofTimePeriods

To see how long it will take an investment to double, state the future value as 2 and the present value as 1.

How to Adjust the Rule of 72 for Higher Accuracy

The Rule of 72 is more accurate if it is adjusted to more closely resemble the compound interest formula—which effectively transforms the Rule of 72 into the Rule of 69.3.

Many investors prefer to use the Rule of 69.3 rather than the Rule of 72. For maximum accuracy—particularly forcontinuous compounding interest rateinstruments—use the Rule of 69.3.

The number 72, however, has many convenient factors, including two, three, four, six, and nine. This convenience makes it easier to use the Rule of 72 for a close approximation of compounding periods.

How toCalculate the Rule of 72 Using Matlab

The calculation of the Rule of 72 in Matlab requires running a simple command of “years = 72/return,” where the variable “return” is the rate of return on investment and “years” is the result for the Rule of 72. The Rule of 72 is also used to determine how long it takes for money to halve in value for a given rate ofinflation.

For example, if the rate of inflation is 4%, a command “years = 72/inflation” where the variable inflation is defined as “inflation = 4” gives 18 years.

Matlab, short for matrix laboratory, is a programming platform from MathWorks used for analyzing data and more.

Does the Rule of 72 Work for Stocks?

Stocks do not have a fixed rate of return, so you cannot use the Rule of 72 to determine how long it will take to double your money. However, you still can use it to estimate what kind of average annual return you would need to double your money in a fixed amount of time. Instead of dividing 72 by the rate of return, divide by the number of years you hope it takes to double your money.

For example, if you want to double your money in eight years, divide 72 by eight. This tells you that you need an average annual return of 9% to double your money in that time.

What Are 3 Things the Rule of 72 Can Determine?

There are two things the Rule of 72 can tell you reasonably accurately: how many years it will take to double your money and what kind of return you will need to double your money in a fixed period of time. Because you know how long it will take to double your money, it’s also easy to figure out how long it would take to quadruple your money. For example, if you can double your money in seven years, you can quadruple it in 14 years by allowing the interest to compound.

Where Is the Rule of 72 Most Accurate?

The Rule of 72 provides only an estimate, but that estimate is most accurate for rates of return of 5% to 10%. Looking at the chart in this article, you can see that the calculations become less precise for rates of return lower or higher than that range.

The Bottom Line

The Rule of 72 is a quick and easy method for determining how long it will take to double an investment, assuming you know the annual rate of return. While it is not precise, it does provide a ballpark figure and is easy to calculate.

Investments, such as stocks, do not have a fixed rate of return, but the Rule of 72 still can give you an idea of the kind of return you would need to double your money in certain amount of time. For example, to double your money in six years, you would need a rate of return of 12%.

FAQs

The Rule of 72: What It Is and How to Use It in Investing? ›

How the Rule of 72 Works. For example, the Rule of 72 states that $1 invested at an annual fixed interest rate of 10% would take 7.2 years ((72 ÷ 10) = 7.2) to grow to $2. In reality, a 10% investment will take 7.3 years to double (1.10^7.3 = 2). The Rule of 72 is reasonably accurate for low rates of return.

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What is the Rule of 72 how is it used for investing? ›

Do you know the Rule of 72? It's an easy way to calculate just how long it's going to take for your money to double. Just take the number 72 and divide it by the interest rate you hope to earn. That number gives you the approximate number of years it will take for your investment to double.

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How can you use the Rule of 72 to maximize your investments? ›

Simply put, the Rule of 72 offers a quick and straightforward method for investors to estimate the number of years required to double their money at a consistent rate of return. The formula is simple. You divide 72 by your expected annual rate of return.

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What is the Rule of 72 and how do you calculate using this rule? ›

The Rule of 72 is a calculation that estimates the number of years it takes to double your money at a specified rate of return. If, for example, your account earns 4 percent, divide 72 by 4 to get the number of years it will take for your money to double.

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Why is the Rule of 72 useful? ›

In terms of math, the rule of 72 is straightforward: It's a formula that enables you to see how long it will take, at a certain interest rate, to double your money. Conversely, you can see what interest rate will double your money by a certain date.

How long would $100,000 take to double? ›

This tells you that, at a 6% annual rate of return, you can expect your investment to double in value — to be worth $100,000 — in roughly 12 years. When calculating the Rule of 72 for any investment, note that the formula is an estimation tool and the years are approximate.

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How to calculate 72? ›

The Rule of 72 is a simple way to determine how long an investment will take to double given a fixed annual rate of interest. Dividing 72 by the annual rate of return gives investors a rough estimate of how many years it will take for the initial investment to duplicate itself.

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How to double 1000 dollars? ›

Some of the most consistent strategies to double $1,000 include:

Using the money to start a low-cost side hustle.
Starting an online business.
Buying and flipping goods.
Retail arbitrage.

May 24, 2024

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Does the Rule of 72 apply to debt? ›

You can also apply the Rule of 72 to debt for a sobering look at the impact of carrying a credit card balance. Assume a credit card balance of $10,000 at an interest rate of 17%. If you don't pay down the balance, the debt will double to $20,000 in approximately 4 years and 3 months.

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How can I double $5000 dollars? ›

To turn $5,000 into more money, explore various investment avenues like the stock market, real estate or a high-yield savings account for lower-risk growth. Investing in a small business or startup could also provide significant returns if the business is successful.

How many years does it take to double your money? ›

Very few investors know how long it takes to double their money. Rule of 72 can be of help. Divide 72 by the expected rate of return and the answer is the number of years required to double your money. For example, if a bond offers 6 percent rate of interest per year, then you will double your money in 12 years.