Graham number

This article is about the investing term named after Benjamin Graham. For the mathematical quantity named after Ronald Graham, see Graham's number.

The Graham number or Benjamin Graham number is a figure used in securities investing that measures a stock's so-called fair value.[1] Named after Benjamin Graham, the founder of value investing, the Graham number can be calculated as follows:

\sqrt{22.5\times(\text{earnings per share})\times(\text{book value per share})}

The final number is, theoretically, the maximum price that a defensive investor should pay for the given stock. Put another way, a stock priced below the Graham Number would be considered a good value, if it also meets a number of other criteria.

Graham writes:[2]

Current price should not be more than 1½ times the book value last reported. However a multiplier of earnings below 15 could justify a correspondingly higher multiplier of assets. As a rule of thumb we suggest that the product of the multiplier times the ratio of price to book value should not exceed 22.5. (This figure corresponds to 15 times earnings and 1½ times book value. It would admit an issue selling at only 9 times earnings and 2.5 times asset value, etc.)

Alternative calculation

Earnings per share is calculated by dividing net income by shares outstanding. Book value is another way of saying shareholders' equity. Therefore, book value per share is calculated by dividing equity by shares outstanding. Consequently, the formula for the Graham number can also be written as follows:

\sqrt{15 \times 1.5 \times \left(\frac{\text{net  income}}{\text{shares  outstanding}}\right) \times \left(\frac{\mathrm{shareholders'\ equity}}{\text{shares outstanding}}\right)}

References

  1. Investopedia: Definition of 'Graham Number'
  2. Graham, Benjamin; Jason Zweig (2003-07-08) [1949]. "14". The Intelligent Investor. Warren E. Buffett (collaborator) (2003 ed.). HarperCollins. p. 349. ISBN 0-06-055566-1.


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