User talk:JrandWP/sandbox/A000040

A number n is prime if it is greater than 1 and has no positive divisors except 1 and n.

A natural number is prime if and only if it has exactly two (positive) divisors.

A prime has exactly one proper positive divisor, 1.

The paper by Kaoru Motose starts as follows: "Let q be a prime divisor of a Mersenne number 2^p-1 where p is prime. Then p is the order of 2 (mod q). Thus p is a divisor of q - 1 and q > p. This shows that there exist infinitely many prime numbers." - Pieter Moree, Oct 14 2004

1 is not a prime, for if the primes included 1, then the factorization of a natural number n into a product of primes would not be unique, since n = n*1.

Prime(n) and pi(n) are inverse functions: A000720(a(n)) = n and a(n) is the least number m such that a(A000720(m)) = a(n). a(A000720(n)) = n if (and only if) n is prime.

Second sequence ever computed by electronic computer, on EDSAC, May 09 1949 (see Renwick link). - Russ Cox, Apr 20 2006

Every prime p > 3 is a linear combination of previous primes prime(n) with nonzero coefficients c(n) and |c(n)| < prime(n). - Amarnath Murthy, Franklin T. Adams-Watters and Joshua Zucker, May 17 2006; clarified by Chayim Lowen, Jul 17 2015

The Greek transliteration of 'Prime Number' is 'Protos Arithmos'. - Daniel Forgues, May 08 2009 [Edited by Petros Hadjicostas, Nov 18 2019]

A number n is prime if and only if it is different from zero and different from a unit and each multiple of n decomposes into factors such that n divides at least one of the factors. This applies equally to the integers (where a prime has exactly four divisors (the definition of divisors is relaxed such that they can be negative)) and the positive integers (where a prime has exactly two distinct divisors). - Peter Luschny, Oct 09 2012

Motivated by his conjecture on representations of integers by alternating sums of consecutive primes, for any positive integer n, Zhi-Wei Sun conjectured that the polynomial P_n(x)= sum_{k=0}^n a(k+1)*x^k is irreducible over the field of rational numbers with the Galois group S_n, and moreover P_n(x) is irreducible mod a(m) for some m<=n(n+1)/2. It seems that no known criterion on irreduciblity of polynomials implies this conjecture. - Zhi-Wei Sun, Mar 23 2013

Questions on a(2n) and Ramanujan primes are in A233739. - Jonathan Sondow, Dec 16 2013

From Hieronymus Fischer, Apr 02 2014: (Start)

Natural numbers such that there is exactly one base b such that the base-b alternate digital sum is 0 (see A239707).

Equivalently: Numbers p > 1 such that b = p-1 is the only base >= 1 for which the base-b alternate digital sum is 0.

Equivalently: Numbers p > 1 such that the base-b alternate digital sum is <> 0 for all bases 1 <= b < p-1. (End)

An integer n > 1 is a prime if and only if it is not the sum of positive integers in arithmetic progression with common difference 2. - Jean-Christophe Hervé, Jun 01 2014

Conjecture: Numbers having prime factors <= p(n+1) are {k|k^f(n) mod primorial(n)=1}, where f(n) = lcm(p(i)-1, i=1..n) = A058254(n) and primorial(n) = A002110(n). For example, numbers with no prime divisor <= p(7) = 17 are {k|k^60 mod 30030=1}. - Gary Detlefs, Jun 07 2014

Cramer conjecture prime(n+1) - prime(n) < C log^2 prime(n) is equivalent to the inequality (log prime(n+1)/log prime(n))^n < e^C, as n tend to infinity, where C is an absolute constant. - Thomas Ordowski, Oct 06 2014

I conjecture that for any positive rational number r there are finitely many primes q_1,...,q_k such that r = Sum_{j=1..k} 1/(q_j-1). For example, 2 = 1/(2-1)+1/(3-1)+1/(5-1)+1/(7-1)+1/(13-1) with 2, 3, 5, 7 and 13 all prime, 1/7 = 1/(13-1)+1/(29-1)+1/(43-1) with 13, 29 and 43 all prime, and 5/7 = 1/(3-1)+1/(7-1)+1/(31-1)+1/(71-1) with 3, 7, 31 and 71 all prime. - Zhi-Wei Sun, Sep 09 2015

I also conjecture that for any positive rational number r there are finitely many primes p_1,...,p_k such that r = sum_{j=1..k} 1/(p_j+1).  For example, 1 = 1/(2+1)+1/(3+1)+1/(5+1)+1/(7+1)+1/(11+1)+1/(23+1) with 2, 3, 5, 7, 11 and 23 all prime, and 10/11 = 1/(2+1)+1/(3+1)+1/(5+1)+1/(7+1)+1/(43+1)+1/(131+1)+1/(263+1) with 2, 3, 5, 7, 43, 131 and 263 all prime. - Zhi-Wei Sun, Sep 13 2015

Satisfies a(n) = 2*n + Sum_{k=1..(a(n)-1)} cot(k*Pi/a(n))*sin(2*k*n^a(n)*Pi/a(n)). - Ilya Gutkovskiy, Jun 29 2016

Numbers n such that ((n-2)!!)^2 == +-1 (mod n). - Thomas Ordowski, Aug 27 2016

Does not satisfy Benford's law [Diaconis, 1977; Cohen-Katz, 1984; Berger-Hill, 2017]. - N. J. A. Sloane, Feb 07 2017

Prime numbers are the integer roots of 1 - sin(Pi*Gamma(s)/s)/sin(Pi/s). - Peter Luschny, Feb 23 2018

T. M. Apostol, Introduction to Analytic Number Theory, Springer-Verlag, 1976, page 2.

E. Bach and Jeffrey Shallit, Algorithmic Number Theory, I, Chaps. 8, 9.

D. M. Bressoud, Factorization and Primality Testing, Springer-Verlag NY 1989.

Ernesto Cesàro, "Sur une formule empirique de M. Pervouchine", Comptes rendus hebdomadaires des séances de l'Académie des sciences (in French), 119 (1894), 848-849.

M. Cipolla, "La determinazione asintotica dell'n-mo numero primo.", Rend. d. R. Acc. di sc. fis. e mat. di Napoli, s. 3, VIII (1902), pp. 132-166.

R. Crandall and C. Pomerance, Prime Numbers: A Computational Perspective, Springer, NY, 2001; see p. 1.

Martin Davis, "Algorithms, Equations, and Logic", pp. 4-15 of S. Barry Cooper and Andrew Hodges, Eds., "The Once and Future Turing: Computing the World", Cambridge 2016.

J.-P. Delahaye, Merveilleux nombres premiers, Pour la Science-Belin Paris, 2000.

J.-P. Delahaye, Savoir si un nombre est premier: facile, Pour La Science, 303(1) 2003, pp. 98-102.

Diaconis, Persi, The distribution of leading digits and uniform distribution mod 1, Ann. Probability, 5, 1977, 72--81,

M. Dietzfelbinger, Primality Testing in Polynomial Time, Springer NY 2004.

M. du Sautoy, The Music of the Primes, Fourth Estate / HarperCollins, 2003; see p. 5.

J. Elie, "L'algorithme AKS", in 'Quadrature', No. 60, pp. 22-32, 2006 EDP-sciences, Les Ulis (France);

Seymour. B. Elk, "Prime Number Assignment to a Hexagonal Tessellation of a Plane That Generates Canonical Names for Peri-Condensed Polybenzenes", J. Chem. Inf. Comput. Sci., vol. 34 (1994), pp. 942-946.

W. & F. Ellison, Prime Numbers, Hermann Paris 1985

T. Estermann, Introduction to Modern Prime Number Theory, Camb. Univ. Press, 1969.

J. M. Gandhi, Formulae for the nth prime. Proc. Washington State Univ. Conf. on Number Theory, 96-106. Wash. St. Univ., Pullman, Wash., 1971.

G. H. Hardy and E. M. Wright, An Introduction to the Theory of Numbers. 3rd ed., Oxford Univ. Press, 1954, p. 2.

Peter Hilton and Jean Pedersen, A Mathematical Tapestry: Demonstrating the Beautiful Unity of Mathematics, Cambridge University Press, 2010, pp. (260-264).

H. D. Huskey, Derrick Henry Lehmer [1905-1991]. IEEE Ann. Hist. Comput. 17 (1995), no. 2, 64-68. Math. Rev. 96b:01035, cf. http://www.ams.org/mathscinet-getitem?mr=1336709

M. N. Huxley, The Distribution of Prime Numbers, Oxford Univ. Press, 1972.

D. S. Jandu, Prime Numbers And Factorization, Infinite Bandwidth Publishing, N. Hollywood CA 2007.

E. Landau, Handbuch der Lehre von der Verteilung der Primzahlen, Chelsea, NY, 1974.

D. H. Lehmer, The sieve problem for all-purpose computers. Math. Tables and Other Aids to Computation, Math. Tables and Other Aids to Computation, 7, (1953). 6-14. Math. Rev. 14:691e

D. N. Lehmer, "List of Prime Numbers from 1 to 10,006,721", Carnegie Institute, Washington, D.C. 1909.

W. J. LeVeque, Topics in Number Theory. Addison-Wesley, Reading, MA, 2 vols., 1956, Vol. 1, Chap. 6.

H. Lifchitz, Table des nombres premiers de 0 à 20 millions (Tomes I & II), Albert Blanchard, Paris 1971.

R. F. Lukes, C. D. Patterson and H. C. Williams, Numerical sieving devices: their history and some applications. Nieuw Arch. Wisk. (4) 13 (1995), no. 1, 113-139. Math. Rev. 96m:11082, cf http://www.ams.org/mathscinet-getitem?mr=96m:11082

P. Ribenboim, The New Book of Prime Number Records, Springer-Verlag NY 1995.

P. Ribenboim, The Little Book of Bigger Primes, Springer-Verlag NY 2004.

H. Riesel, Prime Numbers and Computer Methods for Factorization, Birkhäuser Boston, Cambridge MA 1994.

B. Rittaud, "31415879. Ce nombre est-il premier?" ['Is this number prime?'], La Recherche, Vol. 361, pp. 70-73, Feb 15 2003, Paris.

D. Shanks, Solved and Unsolved Problems in Number Theory, 2nd. ed., Chelsea, 1978, Chap. 1.

N. J. A. Sloane, A Handbook of Integer Sequences, Academic Press, 1973 (includes this sequence).

N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence).

D. Wells, Prime Numbers: The Most Mysterious Figures In Math, J. Wiley NY 2005.

H. C. Williams and Jeffrey Shallit, Factoring integers before computers. Mathematics of Computation 1943-1993: a half-century of computational mathematics (Vancouver, BC, 1993), 481-531, Proc. Sympos. Appl. Math., 48, AMS, Providence, RI, 1994. Math. Rev. 95m:11143

N. J. A. Sloane, Table of n, prime(n) for n = 1..100000

M. Agrawal, N. Kayal & N. Saxena, PRIMES is in P, Annals of Maths., 160:2 (2004), pp. 781-793. [alternate link]

M. Agrawal, A Short History of "PRIMES is in P"

P. Alfeld, Notes and Literature on Prime Numbers

J. W. Andrushkiw, R. I. Andrushkiw and C. E. Corzatt, Representations of Positive Integers as Sums of Arithmetic Progressions, Mathematics Magazine, Vol. 49, No. 5 (Nov., 1976), pp. 245-248.

Anonymous, Prime Number Master Index (for primes up to 2*10^7)

Anonymous, prime number

Christian Axler, New estimates for the n-th prime number, arXiv:1706.03651 [math.NT], 2017.

P. T. Bateman & H. G. Diamond, A Hundred Years of Prime Numbers, Amer. Math. Month., Vol. 103 (9), Nov. 1996, pp. 729-741.

A. Berger and T. P. Hill, What is Benford's Law?, Notices, Amer. Math. Soc., 64: 2 (2017), 132-134.

E. R. Berlekamp, A contribution to mathematical psychometrics, Unpublished Bell Labs Memorandum, Feb 08 1968 [Annotated scanned copy]

D. J. Bernstein, Proving Primality After Agrawal-Kayal-Saxena

D. J. Bernstein, Distinguishing prime numbers from composite numbers

P. Berrizbeitia, Sharpening "Primes is in P" for a large family of numbers, arXiv:math/0211334 [math.NT], 2002.

A. Booker, The Nth Prime Page

F. Bornemann, PRIMES Is in P: A Breakthrough for "Everyman"

A. Bowyer, Formulae for Primes [broken link ?]

B. M. Bredikhin, Prime number

R. P. Brent, Primality testing and integer factorization

J. Britton, Prime Number List

D. Butler, The first 2000 Prime Numbers

C. K. Caldwell, The Prime Pages: Tables of primes; Lists of small primes (from the first 1000 primes to all 50,000,000 primes up to 982,451,653.)

C. K. Caldwell, A Primality Test

C. K. Caldwell and Y. Xiong, What is the smallest prime?, J. Integer Seq. 15 (2012), no. 9, Article 12.9.7 and arXiv:1209.2007 [math.HO], 2012.

Chris K. Caldwell, Angela Reddick, Yeng Xiong and Wilfrid Keller, The History of the Primality of One: A Selection of Sources, Journal of Integer Sequences, Vol. 15 (2012), #12.9.8.

M. Chamness, Prime number generator (Applet)

Daniel I. A. Cohen and Talbot M. Katz, Prime numbers and the first digit phenomenon, J. Number Theory 18 (1984), 261-268.

P. Cox, Primes is in P

P. J. Davis & R. Hersh, The Mathematical Experience, The Prime Number Theorem

J.-M. De Koninck, Les nombres premiers: mysteres et consolation

J.-M. De Koninck, Nombres premiers: mysteres et enjeux

J.-P. Delahaye, Formules et nombres premiers

U. Dudley, Formulas for primes, Math. Mag., 56 (1983), 17-22.

Pierre Dusart, Autour de la fonction qui compte le nombre de nombres premiers, Thèse, Université de Limoges, France, (1998).

Pierre Dusart, The k-th prime is greater than k(ln k + ln ln k-1) for k>=2, Mathematics of Computation 68: (1999), 411-415.

J. Elie, L'algorithme AKS ou Les nombres premiers sont de classe P

David Eppstein, Making Change in 2048, arXiv:1804.07396 [cs.DM], 2018.

L. Euler, Observations on a theorem of Fermat and others on looking at prime numbers, arXiv:math/0501118 [math.HO], 2005-2008.

W. Fendt, Table of Primes from 1 to 1000000000000

P. Flajolet, S. Gerhold and B. Salvy, On the non-holonomic character of logarithms, powers and the n-th prime function, arXiv:math/0501379 [math.CO], 2005.

J. Flamant, Primes up to one million

K. Ford, Expositions of the PRIMES is in P theorem.

L. & Y. Gallot, The Chronology of Prime Number Records

P. Garrett, Big Primes, Factoring Big Integers

P. Garrett, Naive Primality Test

P. Garrett, Listing Primes

N. Gast, PRIMES is in P: Manindra Agrawal, Neeraj Kayal and Nitin Saxena (in French)

D. A. Goldston, S. W. Graham, J. Pintz and C. Y. Yildirim, Small gaps between primes and almost primes, arXiv:math/0506067 [math.NT], 2005.

S. W. Golomb, A Direct Interpretation of Gandhi's Formula, Mathematics Magazine, Vol. 81, No. 7 (Aug. - Sep., 1974), pp. 752-754.

A. Granville, It is easy to determine whether a given integer is prime [alternate link]

P. Hartmann, Prime number proofs (in German)

Haskell Wiki, Prime Numbers

ICON Project, List of first 50000 primes grouped within ten columns

James P. Jones, Daihachiro Sato, Hideo Wada and Douglas Wiens, Diophantine representation of the set of prime numbers, The American Mathematical Monthly 83, no. 6 (1976): 449-464. DOI: 10.2307/2318339.

N. Kayal & N. Saxena, Resonance 11-2002, A polynomial time algorithm to test if a number is prime or not

E. Landau, Handbuch der Lehre von der Verteilung der Primzahlen, vol. 1 and vol. 2, Leipzig, Berlin, B. G. Teubner, 1909.

W. Liang & H. Yan, Pseudo Random test of prime numbers, arXiv:math/0603450 [math.NT], 2006.

J. Malkevitch, Primes

Mathworld Headline News, Primality Testing is Easy

K. Matthews, Generating prime numbers

Y. Motohashi, Prime numbers-your gems, arXiv:math/0512143 [math.HO], 2005.

Kaoru Motose, On values of cyclotomic polynomials. II, Math. J. Okayama Univ. 37 (1995), 27-36.

J. Moyer, Some Prime Numbers

C. W. Neville, New Results on Primes from an Old Proof of Euler's, arXiv:math/0210282 [math.NT], 2002-2003.

L. C. Noll, Prime numbers, Mersenne Primes, Perfect Numbers, etc.

M. A. Nyblom and C. Evans, On the enumeration of partitions with summands in arithmetic progression, Australasian Journal of Combinatorics, Vol. 28 (2003), pp. 149-159.

J. J. O'Connor & E. F. Robertson, Prime Numbers

M. E. O'Neill, The Genuine Sieve of Eratosthenes, J. of Functional Programming, Vol 19 Issue 1, Jan 2009, p. 95ff, CUP NY

M. Ogihara & S. Radziszowski, Agrawal-Kayal-Saxena Algorithm for Testing Primality in Polynomial Time

P. Papaphilippou, Plotter of prime numbers frequency graph (flash object) [From Philippos Papaphilippou (philippos(AT)safe-mail.net), Jun 02 2010]

J. M. Parganin, Primes less than 50000

Matthew Parker, The first billion primes (7-Zip compressed file) [a large file]

Ed Pegg, Jr., Sequence Pictures, Math Games column, Dec 08 2003. [Cached copy, with permission (pdf only)]

I. Peterson, Prime Pursuits

Omar E. Pol, Illustration of initial terms

Omar E. Pol, Sobre el patrón de los números primos, and from Jason Davies, An interactive companion (for primes 2..997)

Popular Computing (Calabasas, CA), Sieves: Problem 43, Vol. 2 (No. 13, Apr 1974), pp. 6-7. [Annotated and scanned copy]

Primefan, The First 500 Prime Numbers and Script to Calculate Prime Numbers.

Project Gutenberg Etext, First 100,000 Prime Numbers

C. D. Pruitt, Formulae for Generating All Prime Numbers

R. Ramachandran, Frontline 19 (17) 08-2000, A Prime Solution

W. S. Renwick, EDSAC log.

F. Richman, Generating primes by the sieve of Eratosthenes

Barkley Rosser, Explicit Bounds for Some Functions of Prime Numbers, American Journal of Mathematics 63 (1941) 211-232.

J. Barkley Rosser and Lowell Schoenfeld, Approximate formulas for some functions of prime numbers, Illinois J. Math. Volume 6, Issue 1 (1962), 64-94.

S. M. Ruiz and J. Sondow, Formulas for pi(n) and the n-th prime, arXiv:math/0210312 [math.NT], 2002-2014.

S. O. S. Math, First 1000 Prime Numbers

A. Schulman, Prime Number Calculator

M. Slone, PlanetMath.Org, First thousand positive prime numbers

A. Stiglic, The PRIMES is in P little FAQ

Zhi-Wei Sun, On functions taking only prime values, J. Number Theory, 133 (2013), no. 8, 2794-2812.

Zhi-Wei Sun, A conjecture on unit fractions involving primes, Preprint 2015.

Tomas Svoboda, List of primes up to 10^6 [Slow link]

J. Teitelbaum, Review of "Prime numbers:A computational perspective" by R. Crandall & C. Pomerance

J. Thonnard, Les nombres premiers(Primality check; Closest next prime; Factorizer)

J. Tramu, Movie of primes scrolling

A. Turpel, Aesthetics of the Prime Sequence [broken link ?]

S. Wagon, Prime Time: Review of "Prime Numbers:A Computational Perspective" by R. Crandall & C. Pomerance

M. R. Watkins, unusual and physical methods for finding prime numbers

S. Wedeniwski, Primality Tests on Commutator Curves

E. Wegrzynowski, Les formules simples qui donnent des nombres premiers en grande quantites

Eric Weisstein's World of Mathematics, Prime-Generating Polynomial, Prime Number, and Prime Spiral.

Wikipedia, Prime number and Prime number theorem.

G. Xiao, Primes server, Sequential Batches Primes Listing (up to orders not exceeding 10^308)

G. Xiao, Numerical Calculator, To display p(n) for n up to 41561, operate on "prime(n)"

Index entries for "core" sequences

Index entries for sequences related to Benford's law

Additional (less important) items -- comments, formulas, references, links, programs, etc. -- related to the prime numbers, A000040. [HTML version] - [Plain text (TXT) version].

For n >= 2, n*(log n + log log n - 3/2) < a(n); for n >= 20, a(n) < n*(log n + log log n - 1/2). [Rosser and Schoenfeld]

For all n, a(n) > n log n. [Rosser]

n log(n) + n (log log n - 1) < a(n) < n log n + n log log n for n >= 6. [Dusart, quoted in the Wikipedia article]

a(n) = n log n + n log log n + (n/log n)*(log log n - log n - 2) + O( n (log log n)^2/ (log n)^2). [Cipolla, see also Cesàro or the "Prime number theorem" Wikipedia article for more terms in the expansion]

a(n) = 2 + Sum_{k = 2..floor(2n*log(n)+2)} (1-floor(pi(k)/n)), for n > 1, where the formula for pi(k) is given in A000720 (Ruiz and Sondow 2002). - Jonathan Sondow, Mar 06 2004

I conjecture that Sum_{i>=1} (1/(prime(i)*log(prime(i)))) = Pi/2 = 1.570796327...; Sum_{i=1..100000} (1/(prime(i)*log(prime(i)))) = 1.565585514... It converges very slowly. - Miklos Kristof, Feb 12 2007

The last conjecture has been discussed by the math.research newsgroup recently. The sum, which is greater than Pi/2, is shown in sequence A137245. - T. D. Noe, Jan 13 2009

A000005(a(n)) = 2; A002033(a(n+1)) = 1. - Juri-Stepan Gerasimov, Oct 17 2009

A001222(a(n)) = 1. - Juri-Stepan Gerasimov, Nov 10 2009

From Gary Detlefs, Sep 10 2010: (Start)

Conjecture:

a(n) = {n| n! mod n^2 = n(n-1)}, n <> 4.

a(n) = {n| n!*h(n) mod n = n-1}, n <> 4, where h(n) = Sum_{k=1..n} 1/k. (End)

For n = 1..15, a(n) = p + abs(p-3/2) + 1/2, where p = m + int((m-3)/2), and m = n + int((n-2)/8) + int((n-4)/8). - Timothy Hopper, Oct 23 2010

a(2n) <= A104272(n) - 2 for n > 1, and a(2n) ~ A104272(n) as n -> infinity. - Jonathan Sondow, Dec 16 2013

Conjecture: Sequence = {5 and n <> 5| ( Fibonacci(n) mod n = 1 or Fibonacci(n) mod n = n - 1) and 2^(n-1) mod n = 1}. - Gary Detlefs, May 25 2014

Conjecture: Sequence = {5 and n <> 5| ( Fibonacci(n) mod n = 1 or Fibonacci(n) mod n = n - 1) and 2^(3*n) mod 3*n = 8}. - Gary Detlefs, May 28 2014

a(n) = 1 + Sum_{m=1..L(n)} (abs(n-Pi(m))-abs(n-Pi(m)-1/2)+1/2), where Pi(m) = A000720(m) and L(n) >= a(n)-1. L(n) can be any function of n which satisfies the inequality. For instance, L(n) can be ceiling((n+1)*log((n+1)*log(n+1))) since it satisfies this inequality. - Timothy Hopper, May 30 2015, Jun 16 2015

Sum_{n>=1} 1/a(n)^s = P(s), where P(s) is the prime zeta function. - Eric W. Weisstein, Nov 08 2016

a(n) = floor(1 - log(-1/2 + Sum_{ d | A002110(n-1) } mu(d)/(2^d-1))/log(2)) where mu(d) = A008683(d). Golomb gave a proof in 1974: Give each positive integer a probability of W(n) = 1/2^n, then the probability M(d) of the integer multiple of number d equals 1/(2^d-1). Suppose Q = a(1)*a(2)*...*a(n-1) = A002110(n-1), then the probability of random integers that are mutually prime with Q is Sum_{ d | Q } mu(d)*M(d) = Sum_{ d | Q } mu(d)/(2^d-1) = Sum_{ gcd(m, Q) = 1 } W(m) = 1/2 + 1/2^a(n) + 1/2^a(n+1) + 1/2^a(n+2) + ... So ((Sum_{ d | Q } mu(d)/(2^d-1)) - 1/2)*2^a(n) = 1 + x(n), which means that a(n) is the only integer so that 1 < ((Sum_{ d | Q } mu(d)/(2^d-1)) - 1/2)*2^a(n) < 2. - Jinyuan Wang, Apr 08 2019

# For illustration purposes only:

isPrime := s -> is(1 = sin(Pi*GAMMA(s)/s)/sin(Pi/s)):

select(isPrime, [$2..100]); # Peter Luschny, Feb 23 2018

(MAGMA) a := func< n | NthPrime(n) >;

(PARI) {a(n) = if( n<1, 0, prime(n))};

(PARI) /* The following functions provide asymptotic approximations, one based on the asymptotic formula cited above (slight overestimate for n > 10^8), the other one based on pi(x) ~ li(x) = Ei(log(x)) (slight underestimate): */

prime1(n)=n*(log(n)+log(log(n))-1+(log(log(n))-2)/log(n)-((log(log(n))-6)*log(log(n))+11)/log(n)^2/2)

prime2(n)=solve(X=n*log(n)/2, 2*n*log(n), real(eint1(-log(X)))+n)

\\ M. F. Hasler, Oct 21 2013

(PARI) forprime(p=2, 10^3, print1(p, ", ")) \\ Felix Fröhlich, Jun 30 2014

(PARI) primes(10^5) \\ Altug Alkan, Mar 26 2018

(Sage) a = sloane.A000040

a.list(58)  # Jaap Spies, 2007

(Sage) prime_range(1, 300)  # Zerinvary Lajos, May 27 2009

(Maxima) A000040(n) := block(

if n = 1 then return(2),

return( next_prime(A000040(n-1)))

)$ /* recursive, to be replaced if possible - R. J. Mathar, Feb 27 2012 */

(Haskell) See also Haskell Wiki Link

import Data.List (genericIndex)

a000040 n = genericIndex a000040_list (n - 1)

a000040_list = base ++ larger where

base = [2, 3, 5, 7, 11, 13, 17]

larger = p : filter prime more

prime n = all ((> 0) . mod n) $ takeWhile (\x -> x*x <= n) larger

_ : p : more = roll $ makeWheels base

roll (Wheel n rs) = [n * k + r | k <- [0..], r <- rs]

makeWheels = foldl nextSize (Wheel 1 [1])

nextSize (Wheel size bs) p = Wheel (size * p)

[r | k <- [0..p-1], b <- bs, let r = size*k+b, mod r p > 0]

data Wheel = Wheel Integer [Integer]

-- Reinhard Zumkeller, Apr 07 2014

(GAP)

A000040:=Filtered([1..10^5], IsPrime); # Muniru A Asiru, Sep 04 2017

Cf. A000720 ("pi"), A001223 (differences between primes), A002476, A002808, A003627, A006879, A006880, A008578, A233588.

Cf. primes in lexicographic order: A210757, A210758, A210759, A210760, A210761.

Cf. A003558, A179480 (relating to the Quasi-order theorem of Hilton and Pedersen).

Boustrophedon transforms: A000747, A000732, A230953.

a(2n) = A104272(n) - A233739(n).

Sequence in context: A158611 A226159 A182986 * A008578 A216883 A216884

Adjacent sequences:  A000037 A000038 A000039 * A000041 A000042 A000043