# Rule of 72

In finance, the rule of 72, the rule of 70 and the rule of 69.3 are methods for estimating an investment’s doubling time. The rule number (e.g., 72) is divided by the interest percentage per period (usually years) to obtain the approximate number of periods required for doubling. Although scientific calculators and spreadsheet programs have functions to find the accurate doubling time, the rules are useful for mental calculations and when only a basic calculator is available.

Using the rule to estimate compounding periods

To estimate the number of periods required to double an original investment, divide the most convenient “rule-quantity” by the expected growth rate, expressed as a percentage.

• For instance, if you were to invest $100 with compounding interest at a rate of 9% per annum, the rule of 72 gives 72/9 = 8 years required for the investment to be worth$200; an exact calculation gives ln(2)/ln(1+0.09) = 8.0432 years.

Similarly, to determine the time it takes for the value of money to halve at a given rate, divide the rule quantity by that rate.

• To determine the time for money’s buying power to halve, financiers divide the rule-quantity by the inflation rate. Thus at 3.5% inflation using the rule of 70, it should take approximately 70/3.5 = 20 years for the value of a unit of currency to halve.
• To estimate the impact of additional fees on financial policies (e.g., mutual fund fees and expenses, loading and expense charges on variable universal life insurance investment portfolios), divide 72 by the fee. For example, if the Universal Life policy charges an annual 3% fee over and above the cost of the underlying investment fund, then the total account value will be cut to 1/2 in 72 / 3 = 24 years, and then to just 1/4 the value in 48 years, compared to holding exactly the same investment outside the policy.

Choice of rule

The value 72 is a convenient choice of numerator, since it has many small divisors: 1, 2, 3, 4, 6, 8, 9, and 12. It provides a good approximation for annual compounding, and for compounding at typical rates (from 6% to 10%). The approximations are less accurate at higher interest rates.

For continuous compounding, 69 gives accurate results for any rate. This is because ln(2) is about 69.3%; see derivation below. Since daily compounding is close enough to continuous compounding, for most purposes 69, 69.3 or 70 are better than 72 for daily compounding. For lower annual rates than those above, 69.3 would also be more accurate than 72.

 Rate Actual Years Rate * Actual Years Rule of 72 Rule of 70 Rule of 69.3 72 adjusted E-M rule 0.25% 277.605 69.401 288.000 280.000 277.200 277.667 277.547 0.5% 138.976 69.488 144.000 140.000 138.600 139.000 138.947 1% 69.661 69.661 72.000 70.000 69.300 69.667 69.648 2% 35.003 70.006 36.000 35.000 34.650 35.000 35.000 3% 23.450 70.349 24.000 23.333 23.100 23.444 23.452 4% 17.673 70.692 18.000 17.500 17.325 17.667 17.679 5% 14.207 71.033 14.400 14.000 13.860 14.200 14.215 6% 11.896 71.374 12.000 11.667 11.550 11.889 11.907 7% 10.245 71.713 10.286 10.000 9.900 10.238 10.259 8% 9.006 72.052 9.000 8.750 8.663 9.000 9.023 9% 8.043 72.389 8.000 7.778 7.700 8.037 8.062 10% 7.273 72.725 7.200 7.000 6.930 7.267 7.295 11% 6.642 73.061 6.545 6.364 6.300 6.636 6.667 12% 6.116 73.395 6.000 5.833 5.775 6.111 6.144 15% 4.959 74.392 4.800 4.667 4.620 4.956 4.995 18% 4.188 75.381 4.000 3.889 3.850 4.185 4.231 20% 3.802 76.036 3.600 3.500 3.465 3.800 3.850 25% 3.106 77.657 2.880 2.800 2.772 3.107 3.168 30% 2.642 79.258 2.400 2.333 2.310 2.644 2.718 40% 2.060 82.402 1.800 1.750 1.733 2.067 2.166 50% 1.710 85.476 1.440 1.400 1.386 1.720 1.848 60% 1.475 88.486 1.200 1.167 1.155 1.489 1.650 70% 1.306 91.439 1.029 1.000 0.990 1.324 1.523

History

An early reference to the rule is in the Summa de arithmetica (Venice, 1494. Fol. 181, n. 44) of Luca Pacioli (1445–1514). He presents the rule in a discussion regarding the estimation of the doubling time of an investment, but does not derive or explain the rule, and it is thus assumed that the rule predates Pacioli by some time.

 “ A voler sapere ogni quantità a tanto per 100 l’anno, in quanti anni sarà tornata doppia tra utile e capitale, tieni per regola 72, a mente, il quale sempre partirai per l’interesse, e quello che ne viene, in tanti anni sarà raddoppiato. Esempio: Quando l’interesse è a 6 per 100 l’anno, dico che si parta 72 per 6; ne vien 12, e in 12 anni sarà raddoppiato il capitale. (emphasis added). ”

Roughly translated:

 “ In wanting to know of any capital, at a given yearly percentage, in how many years it will double adding the interest to the capital, keep as a rule [the number] 72 in mind, which you will always divide by the interest, and what results, in that many years it will be doubled. Example: When the interest is 6 percent per year, I say that one divides 72 by 6; 12 results, and in 12 years the capital will be doubled. ”

{\displaystyle {\begin{array}{ccc}(e^{r})^{p}&=&2\\e^{rp}&=&2\\\ln e^{rp}&=&\ln 2\\rp&=&\ln 2\\p&=&{\frac {\ln 2}{r}}\\&&\\p&\approx &{\frac {0.693147}{r}}\end{array}}}

References

1. ^ Jump up to:ab Donella Meadows, Thinking in Systems: A Primer, Chelsea Green Publishing, 2008, page 33 (box “Hint on reinforcing feedback loops and doubling time”).
2. ^Slavin, Steve (1989). All the Math You’ll Ever Need. John Wiley & Sons. pp. 153–154. ISBN 0-471-50636-2.
3. ^Kalid Azad Demystifying the Natural Logarithm (ln) from BetterExplained

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