29 (number)

Template:Infobox number 29 (twenty-nine) is the natural number following 28 and preceding 30. It is a prime number.

29 is the number of days February has on a leap year.

MathematicsEdit

Integer propertiesEdit

29 is the fifth primorial prime, like its twin prime 31.

29 is the smallest positive whole number that cannot be made from the numbers <math>\{1, 2, 3, 4\}</math>, using each digit exactly once and using only addition, subtraction, multiplication, and division.<ref>{{#invoke:citation/CS1|citation |CitationClass=web }}</ref> None of the first twenty-nine natural numbers have more than two different prime factors (in other words, this is the longest such consecutive sequence; the first sphenic number<ref>Template:Cite OEIS</ref> or triprime, 30 is the product of the first three primes 2, 3, and 5). 29 is also,

the sum of three consecutive squares, 2² + 3² + 4².
the sixth Sophie Germain prime.<ref name=":0">{{#invoke:citation/CS1|citation

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a Lucas prime,<ref>{{#invoke:citation/CS1|citation

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an Eisenstein prime with no imaginary part and real part of the form 3n − 1.
a Markov number, appearing in the solutions to x² + y² + z² = 3xyz: {2, 5, 29}, {2, 29, 169}, {5, 29, 433}, {29, 169, 14701}, etc.
a Perrin number, preceded in the sequence by 12, 17, 22.<ref>{{#invoke:citation/CS1|citation

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the number of pentacubes if reflections are considered distinct.
the tenth supersingular prime.<ref>{{#invoke:citation/CS1|citation

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On the other hand, 29 represents the sum of the first cluster of consecutive semiprimes with distinct prime factors (14, 15).<ref>Template:Cite OEIS</ref> These two numbers are the only numbers whose arithmetic mean of divisors is the first perfect number and unitary perfect number, 6<ref>Template:Cite OEIS</ref><ref>Template:Cite OEIS</ref> (that is also the smallest semiprime with distinct factors). The pair (14, 15) is also the first floor and ceiling values of imaginary parts of non-trivial zeroes in the Riemann zeta function, <math>\zeta.</math>

29 is the largest prime factor of the smallest number with an abundancy index of 3,

1018976683725 = 3³ × 5² × 7² × 11 × 13 × 17 × 19 × 23 × 29 (sequence A047802 in the OEIS)

It is also the largest prime factor of the smallest abundant number not divisible by the first even (of only one) and odd primes, 5391411025 = 5² × 7 × 11 × 13 × 17 × 19 × 23 × 29.<ref>Template:Cite OEIS</ref> Both of these numbers are divisible by consecutive prime numbers ending in 29.

15 and 290 theoremsEdit

The 15 and 290 theorems describes integer-quadratic matrices that describe all positive integers, by the set of the first fifteen integers, or equivalently, the first two-hundred and ninety integers. Alternatively, a more precise version states that an integer quadratic matrix represents all positive integers when it contains the set of twenty-nine integers between 1 and 290:<ref>Template:Cite book</ref><ref>Template:Cite OEIS</ref>

The largest member 290 is the product between 29 and its index in the sequence of prime numbers, 10.<ref>Template:Cite OEIS</ref> The largest member in this sequence is also the twenty-fifth even, square-free sphenic number with three distinct prime numbers <math>p \times q \times r</math> as factors,<ref>Template:Cite OEIS</ref> and the fifteenth such that <math>p + q + r + 1</math> is prime (where in its case, 2 + 5 + 29 + 1 = 37).<ref>Template:Cite OEIS</ref>Template:Efn

Dimensional spacesEdit

The 29th dimension is the highest dimension for compact hyperbolic Coxeter polytopes that are bounded by a fundamental polyhedron, and the highest dimension that holds arithmetic discrete groups of reflections with noncompact unbounded fundamental polyhedra.<ref>Template:Cite journal</ref>

NotesEdit

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ReferencesEdit

External linksEdit

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Prime Curios! 29 from the Prime Pages

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