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The Rule of 72 is a handy tool used in finance to estimate the number of years it would take to double a sum of money through interest payments, given a particular interest rate. The rule can also estimate the annual interest rate required to double a sum of money in a specified number of years. The rule states that the interest rate multiplied by the time period required to double an amount of money is approximately equal to 72.

The Rule of 72 is applicable in cases of exponential growth, (as in compound interest) or in exponential "decay," as in the loss of purchasing power caused by monetary inflation.

Method 1
Method 1 of 4:

Estimating "Doubling" Time

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  1. R is the rate of growth (the annual interest rate), and T is the time (in years) it takes for the amount of money to double. [1]
  2. For example, how long does it take to turn $100 into $200 at a yearly interest rate of 5%? Letting R = 5, we get 5 x T = 72. [2]
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  3. In this example, divide both sides of the above equation by R (that is, 5) to get T = 72 ÷ 5 = 14.4. So it takes 14.4 years for $100 to double at an interest rate of 5% per annum. (The initial amount of money doesn't matter. It will take the same amount of time to double no matter what the beginning amount is.)
    • How long does it take to double an amount of money at a rate of 10% per annum? 10 x T = 72. Divide both sides of the equation by 10, so that T = 7.2 years.
    • How long does it take to turn $100 into $1600 at a rate of 7.2% per annum? Recognize that 100 must double four times to reach 1600 ($100 → $200, $200 → $400, $400 → $800, $800 → $1600). For each doubling, 7.2 x T = 72, so T = 10. So, as each doubling takes ten years, the total time required (to change $100 into $1,600) is 40 years.
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Method 2
Method 2 of 4:

Estimating the Growth Rate

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  1. R is the rate of growth (the interest rate), and T is the time (in years) it takes to double any amount of money. [3]
  2. For example, let's say you want to double your money in ten years. What interest rate would you need in order to do that? Enter 10 for T in the equation. R x 10 = 72. [4]
  3. Divide both sides by 10 to get R = 72 ÷ 10 = 7.2. So you will need an annual interest rate of 7.2% in order to double your money in ten years.
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Method 3
Method 3 of 4:

Estimating Exponential "Decay" (Loss)

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  1. Let T = 72 ÷ R. This is the same equation as above, just slightly rearranged. Now enter a value for R. An example: [5]
    • How long will it take for $100 to assume the purchasing power of $50, given an inflation rate of 5% per year?
      • Let 5 x T = 72, so that T = 72 ÷ 5 = 14.4. That's how many years it would take for money to lose half its buying power in a period of 5% inflation. (If the inflation rate were to change from year to year, you would have to use the average inflation rate that existed over the full time period.)
  2. R = 72 ÷ T. Enter a value for T, and solve for R. For example: [6]
    • If the buying power of $100 becomes $50 in ten years, what is the inflation rate during that time?
      • R x 10 = 72, where T = 10. Then R = 72 ÷ 10 = 7.2%.
  3. If you can detect a general trend, don't worry about temporary numbers that are wildly out of range. Drop them from consideration.
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Doubling Time Chart

Method 4
Method 4 of 4:

Derivation

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  1. 1
    Understand how the derivation works for periodic compounding. [7]
    • For periodic compounding, FV = PV (1 + r)^T, where FV = future value, PV = present value, r = growth rate, T = time.
    • If money has doubled, FV = 2*PV, so 2PV = PV (1 + r)^T, or 2 = (1 + r)^T, assuming the present value is not zero.
    • Solve for T by taking the natural logs on both sides, and rearranging, to get T = ln(2) / ln(1 + r).
    • The Taylor series for ln(1 + r) around 0 is r - r 2 /2 + r 3 /3 - ... For low values of r, the contributions from the higher power terms are small, and the expression approximates r, so that t = ln(2) / r.
    • Note that ln(2) ~ 0.693, so that T ~ 0.693 / r (or T = 69.3 / R, expressing the interest rate as a percentage R from 0-100%), which is the rule of 69.3. Other numbers such as 69, 70, and 72 are used for easier calculations.
  2. 2
    Understand how the derivation works for continuous compounding. For periodic compounding with multiple compounding per year, the future value is given by FV = PV (1 + r/n)^nT, where FV = future value, PV = present value, r = growth rate, T = time, and n = number of compounding periods per year. For continuous compounding, n approaches infinity. Using the definition of e = lim (1 + 1/n)^n as n approaches infinity, the expression becomes FV = PV e^(rT). [8]
    • If money has doubled, FV = 2*PV, so 2PV = PV e^(rT), or 2 = e^(rT), assuming the present value is not zero.
    • Solve for T by taking natural logs on both sides, and rearranging, to get T = ln(2)/r = 69.3/R (where R = 100r to express the growth rate as a percentage). This is the rule of 69.3.
    • For continuous compounding, 69.3 (or approximately 69) gives more accurate results, since ln(2) is approximately 69.3%, and R * T = ln(2), where R = growth (or decay) rate, T = the doubling (or halving) time, and ln(2) is the natural log of 2. 70 may also be used as an approximation for continuous or daily (which is close to continuous) compounding, for ease of calculation. These variations are known as rule of 69.3 , rule of 69 , or rule of 70 .
      • A similar accuracy adjustment for the rule of 69.3 is used for high rates with daily compounding: T = (69.3 + R/3) / R.
    • The Eckart-McHale second order rule , or E-M rule, gives a multiplicative correction to the Rule of 69.3 or 70 (but not 72), for better accuracy for higher interest rate ranges. To compute the E-M approximation, multiply the Rule of 69.3 (or 70) result by 200/(200-R), i.e., T = (69.3/R) * (200/(200-R)). For example, if the interest rate is 18%, the Rule of 69.3 says t = 3.85 years. The E-M Rule multiplies this by 200/(200-18), giving a doubling time of 4.23 years, which better approximates the actual doubling time 4.19 years at this rate.
      • The third-order Padé approximant gives even better approximation, using the correction factor (600 + 4R) / (600 + R), i.e., T = (69.3/R) * ((600 + 4R) / (600 + R)). If the interest rate is 18%, the third-order Padé approximant gives T = 4.19 years.
    • To estimate doubling time for higher rates, adjust 72 by adding 1 for every 3 percentages greater than 8%. That is, T = [72 + (R - 8%)/3] / R. For example, if the interest rate is 32%, the time it takes to double a given amount of money is T = [72 + (32 - 8)/3] / 32 = 2.5 years. Note that 80 is used here instead of 72, which would have given 2.25 years for the doubling time.
    • Here is a table giving the number of years it takes to double any given amount of money at various interest rates, and comparing the approximation with various rules:
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Rate Actual
Years
Rule
of 72
Rule
of 70
Rule of
69.3
E-M
rule
0.25%
277.605 288.000 280.000 277.200 277.547
0.5%
138.976 144.000 140.000 138.600 138.947
1%
69.661 72.000 70.000 69.300 69.648
2%
35.003 36.000 35.000 34.650 35.000
3%
23.450 24.000 23.333 23.100 23.452
4%
17.673 18.000 17.500 17.325 17.679
5%
14.207 14.400 14.000 13.860 14.215
6%
11.896 12.000 11.667 11.550 11.907
7%
10.245 10.286 10.000 9.900 10.259
8%
9.006 9.000 8.750 8.663 9.023
9%
8.043 8.000 7.778 7.700 8.062
10%
7.273 7.200 7.000 6.930 7.295
11%
6.642 6.545 6.364 6.300 6.667
12%
6.116 6.000 5.833 5.775 6.144
15%
4.959 4.800 4.667 4.620 4.995
18%
4.188 4.000 3.889 3.850 4.231
20%
3.802 3.600 3.500 3.465 3.850
25%
3.106 2.880 2.800 2.772 3.168
30%
2.642 2.400 2.333 2.310 2.718
40%
2.060 1.800 1.750 1.733 2.166
50%
1.710 1.440 1.400 1.386 1.848
60%
1.475 1.200 1.167 1.155 1.650
70%
1.306 1.029 1.000 0.990 1.523

Expert Q&A

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  • Question
    How do I calculate a daily simple interest rate?
    Paridhi Jain
    Certified Public Accountant
    Paridhi Jain is a Certified Public Accountant and the Co-Founder of Seva Ltd, a CPA firm operating in Maryland and Alabama. She has over 10 years of professional experience in the financial sector and has built a reputation for assisting small business owners navigate the intricacies of regulatory compliance, encompassing areas from company structuring and entity formation to detailed nexus determinations for income and sales tax. She is an active member of the Alabama Society of CPAs and has a certification in pre-professional accounting. She graduated Magna Cum Laude from the University of Maryland, Baltimore County with a major in Information Systems.
    Certified Public Accountant
    Expert Answer
    A good example is if you have $100 and you've mentioned a daily interest rate. Assuming an annual interest rate of 10% on a loan of $100, it means you agree to pay back $110 at the end of the year. Now, if we're dealing with daily compounding, the daily interest would be calculated as 10% divided by 365 days in a year. This equates to approximately 0.027%, or around 2.7 cents per day. Over the course of a year, this adds up to $10 in interest. So, on a daily basis, you're looking at about 0.027% interest.
  • Question
    What is compound annual growth rate, and how do I calculate it?
    Paridhi Jain
    Certified Public Accountant
    Paridhi Jain is a Certified Public Accountant and the Co-Founder of Seva Ltd, a CPA firm operating in Maryland and Alabama. She has over 10 years of professional experience in the financial sector and has built a reputation for assisting small business owners navigate the intricacies of regulatory compliance, encompassing areas from company structuring and entity formation to detailed nexus determinations for income and sales tax. She is an active member of the Alabama Society of CPAs and has a certification in pre-professional accounting. She graduated Magna Cum Laude from the University of Maryland, Baltimore County with a major in Information Systems.
    Certified Public Accountant
    Expert Answer
    Let's delve into the compound annual growth rate (CAGR). Instead of being the borrower, envision yourself as the lender, like a bank investing $100 in someone. Anticipating a return of $110 by the year's end, on December 31, you have $110. The following day, your 10% return is not just on the original $100 but on the new total of $110. This compounding effect unfolds annually, meaning in the second year, you're not just earning 10% on the initial $100; it's 10% on the new amount, resulting in $11. This progression represents the annual growth of your money.
  • Question
    When would I need to use the rule of 72?
    Donagan
    Top Answerer
    It's a handy shortcut when considering compounded, monetary gains or losses. For example, you might want to know how long it would take for invested money to double in value, given a specific rate of interest. See the introduction to the above article.
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      Tips

      • Let the Rule of 72 work for you by starting to save now. At a growth rate of 8% a year (the approximate rate of return in the stock market), you would double your money in nine years (72 ÷ 8 = 9), quadruple your money in 18 years, and have 16 times your money in 36 years.
      • The value of 72 was chosen as a convenient numerator in the above equation. 72 is easily divisible by several small numbers: 1,2,3,4,6,8,9, and 12. It provides a good approximation for annual compounding at typical rates (from 6% to 10%). The approximations are less exact at higher interest rates.
      • You can use Felix's Corollary to the Rule of 72 to calculate the "future value" of an annuity (that is, what the annuity's face value will be at a specified future time). You can read about the corollary on various financial and investing websites.
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      Warnings

      • Let the rule of 72 convince you not to take on high-interest debt (as is typical with credit cards). At an average interest rate of 18%, semiretired credit card debt doubles in just four years (72 ÷ 18 = 4), quadruples in eight years, and becomes completely unmanageable after that.
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