1729 (NUMBER)

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:''This article is about the number 1729. For the year, see 1729.''

1729
Cardinal	One thousand seven hundred [and] twenty-nine
Ordinal	1729th
Factorization	$7\; cdot\; 13\; cdot\; 19$
Divisors	7, 13, 19, 91, 133, 247
Roman numeral	MDCCXXIX
Binary	11011000001
Octal	3301
Duodecimal	1001
Hexadecimal	6C1

'1729' is known as the 'Hardy-Ramanujan number' after a famous anecdote of the British mathematician G. H. Hardy regarding a hospital visit to the Indian mathematician Srinivasa Ramanujan. In Hardy's words:^[1]
The quotation is sometimes expressed using the term "positive cubes", as the admission of negative perfect cubes (the cube of a negative integer) gives the smallest solution as 91 (which is a factor of 1729):
:91 = 6³ + (−5)³ = 4³ + 3³
Of course, equating "smallest" with "most negative", as opposed to "closest to zero" gives rise to solutions like −91, −189, −1729, and further negative numbers. This ambiguity is eliminated by the term "positive cubes".
Numbers such as
:1729 = 1³ + 12³ = 9³ + 10³
that are the smallest number that can be expressed as the sum of two cubes in ''n'' distinct ways have been dubbed taxicab numbers. 1729 is the second taxicab number (the first is 2 = 1³ + 1³). The number was also found in one of Ramanujan's notebooks dated years before the incident.
1729 is the third Carmichael number and the first absolute Euler pseudoprime.
1729 is a Zeisel number. It is a centered cube number, as well as a dodecagonal number, a 24-gonal and 84-gonal number.
Investigating pairs of distinct integer-valued quadratic forms that represent every integer the same number of times, Schiemann found that such quadratic forms must be in four or more variables, and the least possible discriminant of a four-variable pair is 1729 (Guy 2004).
Because in base 10 the number 1729 is divisible by the sum of its digits, it is a Harshad number. It also has this property in octal (1729 = 3301₈, 3 + 3 + 0 + 1 = 7) and hexadecimal (1729 = 6C1₁₆, 6 + C + 1 = 19₁₀), but not in binary.
1729 has another interesting property: the 1729th decimal place is the beginning of the first occurrence of all ten digits consecutively in the decimal representation of the transcendental number ''e'', although, of course, this fact would not have been known to either mathematician, since the computer algorithms used to discover this were not implemented until much later.^[2]
Masahiko Fujiwara showed that 1729 is one of four natural numbers (the others are 81 and 1458 and the trivial case 1) which, when its digits are added together, produces a sum which, when multiplied by its reversed self, yields the original number:
: 1 + 7 + 2 + 9 = 19
: 19 · 91 = 1729
Fujiwara claimed that he proved there are only four numbers that have the property. Even though it seems to be true, he never has shown his proof.
It has occasionally been suggested that Hardy's story is apocryphal, on the grounds that he almost certainly would have been familiar with some of these features of the number.

Contents

References to 1729

Quotation

See also

References

Notes

External links

References to 1729

The television show ''Futurama'' contains several jokes about the Hardy-Ramanujan number. In one episode, the robot Bender receives a Christmas card from the machine that built him labeled "Son #1729". Ken Keeler, a writer on the show with a Ph. D. in Applied Math, said that "that 'joke' alone is worth six years of grad school." In another episode, Bender's serial number is revealed to be the sum of two cubes: his number is 2716057 = 952³ + (−951)³, while that of fellow robot Flexo is 3370318 = 119³ + 119³. (This datum is one of the pieces of evidence the episode uses to establish that Bender and Flexo are a pair of good-and-evil twins.) The starship ''Nimbus'' displays the hull registry number BP-1729, which simultaneously riffs on the ''USS Enterprise'''s NCC-1701. Finally, the episode The Farnsworth Parabox contains a montage sequence where the heroes visit several parallel universes in rapid succession, one of which is labeled "Universe 1729".
The physicist Richard Feynman demonstrated his abilities at mental calculation when, during a trip to Brazil, he was challenged to a calculating contest against an experienced abacist. The abacist happened to challenge Feynman to compute the cube root of 1729.03; since Feynman knew that 1729 was equal to 12³+1, he was able to give an accurate value for its cube root mentally using interpolation techniques (specifically, binomial expansion). The abacist had to solve the problem by a more laborious algorithmic method, and lost the competition to Feynman.
Some reports say that the octal equivalent (3301) was the password to Xerox PARC's main computer.
The play ''Proof'' (and its adapted Film) by David Auburn also contains a reference to 1729.
The movie ''Lucky Number Slevin'' also references the number 1729 in association with the character Nick Fisher.

Quotation

★ "Every positive integer is one of Ramanujan's personal friends."—J. E. Littlewood, on hearing of the taxicab incident.

See also

★ Interesting number paradox

★ Berry paradox

References

★ Martin Gardner, ''Mathematical Puzzles and Diversions'', 1959

★ Richard K. Guy, ''Unsolved Problems in Number Theory'', 2nd ed., Springer, 2004. D1 mentions the Hardy-Ramanujan number.

Notes

1. http://www-gap.dcs.st-and.ac.uk/~history/Quotations/Hardy.html
2. http://www.mathpages.com/home/kmath028.htm

External links

★ MathWorld: Hardy-Ramanujan Number

★ The Dullness of 1729