Guy also formulated a second strong law of small numbers:

When two numbers look equal, it ain't necessarily so!^[3]

Guy explains this latter law by the way of examples: he cites numerous sequences for which observing the first few members may lead to a wrong guess about the generating formula or law for the sequence. Many of the examples are the observations of other mathematicians.^[3]

One example Guy gives is the conjecture that ${\displaystyle 2^{p}-1}$  is prime—in fact, a Mersenne prime—when ${\displaystyle p}$  is prime; but this conjecture, while true for ${\displaystyle p}$  = 2, 3, 5 and 7, fails for ${\displaystyle p}$  = 11 (and for many other values).

Another relates to the prime number race: primes congruent to 3 modulo 4 appear to be more numerous than those congruent to 1; however this is false, and first ceases being true at 26861.

A geometric example concerns Moser's circle problem (pictured), which appears to have the solution of ${\displaystyle 2^{n-1}}$  for ${\displaystyle n}$  points, but this pattern breaks at and above ${\displaystyle n=6}$ .

• Insensitivity to sample size
• Law of large numbers (unrelated, but the origin of the name)
• Mathematical coincidence
• Pigeonhole principle
• Representativeness heuristic

• Caldwell, Chris. "Law of small numbers". The Prime Glossary.
• Weisstein, Eric W. "Strong Law of Small Numbers". MathWorld.
• Carnahan, Scott (2007-10-27). "Small finite sets". Secret Blogging Seminar, notes on a talk by Jean-Pierre Serre on properties of small finite sets.{{cite web}}: CS1 maint: postscript (link)
• Amos Tversky; Daniel Kahneman (August 1971). "Belief in the law of small numbers". Psychological Bulletin. 76 (2): 105–110. CiteSeerX 10.1.1.592.3838. doi:10.1037/h0031322. people have erroneous intuitions about the laws of chance. In particular, they regard a sample randomly drawn from a population as highly representative, I.e., similar to the population in all essential characteristics.