The interesting number paradox is a humorous paradox which arises from the attempt to classify every natural number as either "interesting" or "uninteresting". The paradox states that every natural number is interesting. The "

proof Proof most often refers to: * Proof (truth), argument or sufficient evidence for the truth of a proposition * Alcohol proof, a measure of an alcoholic drink's strength Proof may also refer to: Mathematics and formal logic * Formal proof, a con ...

" is by contradiction: if there exists a non-empty set of uninteresting natural numbers, there would be a smallest uninteresting number – but the smallest uninteresting number is itself interesting because it is the smallest uninteresting number, thus producing a contradiction. "Interestingness" concerning numbers is not a formal concept in normal terms, but an innate notion of "interestingness" seems to run among some number theorists. Famously, in a discussion between the mathematicians

G. H. Hardy Godfrey Harold Hardy (7 February 1877 – 1 December 1947) was an English mathematician, known for his achievements in number theory and mathematical analysis. In biology, he is known for the Hardy–Weinberg principle, a basic principle of pop ...

and

Srinivasa Ramanujan Srinivasa Ramanujan (; born Srinivasa Ramanujan Aiyangar, ; 22 December 188726 April 1920) was an Indian mathematician. Though he had almost no formal training in pure mathematics, he made substantial contributions to mathematical analysis ...

about interesting and uninteresting numbers, Hardy remarked that the number

1729 Events January–March * January 8 – Frederick, the eldest son of King George II of Great Britain is made Prince of Wales at the age of 21, a few months after he comes to Britain for the first time after growing up in Hanover ...

of the taxicab he had ridden seemed "rather a dull one", and Ramanujan immediately answered that it is interesting, being the smallest number that is the sum of two cubes in two different ways.

Paradoxical nature

Attempting to classify all numbers this way leads to a paradox or an

antinomy Antinomy (Greek ἀντί, ''antí'', "against, in opposition to", and νόμος, ''nómos'', "law") refers to a real or apparent mutual incompatibility of two laws. It is a term used in logic and epistemology, particularly in the philosophy of I ...

of definition. Any hypothetical

partition Partition may refer to: Computing Hardware * Disk partitioning, the division of a hard disk drive * Memory partition, a subdivision of a computer's memory, usually for use by a single job Software * Partition (database), the division of a ...

of natural numbers into ''interesting'' and ''uninteresting'' sets seems to fail. Since the definition of interesting is usually a subjective, intuitive notion, it should be understood as a semi-humorous application of

self-reference Self-reference occurs in natural or formal languages when a sentence, idea or formula refers to itself. The reference may be expressed either directly—through some intermediate sentence or formula—or by means of some encoding. In philoso ...

in order to obtain a paradox. The paradox is alleviated if "interesting" is instead defined objectively: for example, the smallest natural number that does not appear in an entry of the On-Line Encyclopedia of Integer Sequences (OEIS) was originally found to be 11630 on 12 June 2009. The number fitting this definition later became 12407 from November 2009 until at least November 2011, then 13794 as of April 2012, until it appeared in sequence as of 3 November 2012. Since November 2013, that number was 14228, at least until 14 April 2014. In May 2021, the number was 20067. (This definition of uninteresting is possible only because the OEIS lists only a finite number of terms for each entry. For instance, is the sequence of ''all'' natural numbers, and if continued indefinitely would contain all positive integers. As it is, the sequence is recorded in its entry only as far as 77.) Depending on the sources used for the list of interesting numbers, a variety of other numbers can be characterized as uninteresting in the same way. For instance, the mathematician and philosopher Alex Bellos suggested in 2014 that a candidate for the lowest uninteresting number would be 224 because it was, at the time, "the lowest number not to have its own page on Wikipedia". However, as there are many significant results in mathematics that make use of

(such as

Gödel's incompleteness theorems Gödel's incompleteness theorems are two theorems of mathematical logic Mathematical logic is the study of logic, formal logic within mathematics. Major subareas include model theory, proof theory, set theory, and recursion theory. Research i ...

), the paradox illustrates some of the power of self-reference, and thus touches on serious issues in many fields of study. The paradox can be related directly to Gödel's incompleteness theorems if one defines an "interesting" number as one that can be computed by a program that contains fewer bits than the number itself. Similarly, instead of trying to quantify the subjective feeling of interestingness, one can consider the length of a phrase needed to specify a number. For example, the phrase "the least number not expressible in fewer than eleven words" sounds like it should identify a unique number, but the phrase itself contains only ten words, and so the number identified by the phrase would have an expression in fewer than eleven words after all. This is known as the

Berry paradox The Berry paradox is a self-referential paradox arising from an expression like "The smallest positive integer not definable in under sixty letters" (a phrase with fifty-seven letters). Bertrand Russell, the first to discuss the paradox in print, ...

History

In 1945,

Edwin F. Beckenbach Edwin Ford Beckenbach (July 18, 1906 – September 5, 1982) was an American mathematician. Biography Beckenbach was born July 18, 1906 in Oak Cliff, Dallas County, Texas, the son of a leather worker and on his father's side the grandson of immi ...

published a short letter in ''

The American Mathematical Monthly ''The American Mathematical Monthly'' is a mathematical journal founded by Benjamin Finkel in 1894. It is published ten times each year by Taylor & Francis for the Mathematical Association of America. The ''American Mathematical Monthly'' is an e ...

'' suggesting that

One might conjecture that there is an interesting fact concerning each of the positive integers. Here is a "proof by induction" that such is the case. Certainly, 1, which is a factor of each positive integer, qualifies, as do 2, the smallest prime; 3, the smallest odd prime; 4, Bieberbach's number; ''etc''. Suppose the set ''S'' of positive integers concerning each of which there is no interesting fact is not vacuous, and let ''k'' be the smallest member of ''S''. But this is a most interesting fact concerning ''k''! Hence ''S'' has no smallest member and therefore is vacuous. Is the proof valid?

Constance Reid included the paradox in the 1955 first edition of her

popular mathematics Popular mathematics is the presentation of mathematics to an aimed general audience. The difference between recreational mathematics and popular mathematics is that recreational mathematics intends to be fun for the mathematical community, and p ...

book ''

From Zero to Infinity ''From Zero to Infinity: What Makes Numbers Interesting'' is a book in popular mathematics and number theory by Constance Reid. It was originally published in 1955 by the Thomas Y. Crowell Company. The fourth edition was published in 1992 by the ...

'', but removed it from later editions. Martin Gardner presented the paradox as a "fallacy" in his '' Scientific American'' column in 1958, including it with six other "astonishing assertions" whose purported proofs were also subtly erroneous. A 1980 letter to '' The Mathematics Teacher'' mentions a jocular proof that "all natural numbers are interesting" having been discussed three decades earlier. In 1977, Greg Chaitin referred to Gardner's statement of the paradox and pointed out its relation to an earlier paradox of Bertrand Russell on the existence of a smallest undefinable ordinal (despite the fact that all sets of ordinals have a smallest element and that "the smallest undefinable ordinal" would appear to be a definition). In '' The Penguin Dictionary of Curious and Interesting Numbers'' (1987), David Wells commented that 39 "appears to be the first uninteresting number", a fact that made it "especially interesting", and thus 39 must be simultaneously interesting and dull.

Paradoxical nature

History

See also

Notes

References

Further reading