Smarandache–Wellin number
In mathematics, a Smarandache–Wellin number is an integer that in a given base is the concatenation of the first n prime numbers written in that base. Smarandache–Wellin numbers are named after Florentin Smarandache and Paul R. Wellin.
The first decimal Smarandache–Wellin numbers are:
- 2, 23, 235, 2357, 235711, 23571113, 2357111317, 235711131719, 23571113171923, 2357111317192329, ... (sequence A019518 in the OEIS).
Smarandache–Wellin prime
A Smarandache–Wellin number that is also prime is called a Smarandache–Wellin prime. The first three are 2, 23 and 2357 (sequence A069151 in the OEIS). The fourth has 355 digits and ends with the digits 719.[1]
The primes at the end of the concatenation in the Smarandache–Wellin primes are
The indices of the Smarandache–Wellin primes in the sequence of Smarandache–Wellin numbers are:
The 1429th Smarandache–Wellin number is a probable prime with 5719 digits ending in 11927, discovered by Eric W. Weisstein in 1998.[2] If it is proven prime, it will be the eighth Smarandache–Wellin prime. In March 2009 Weisstein's search showed the index of the next Smarandache–Wellin prime (if one exists) is at least 22077.[3]
Smarandache number
The Smarandache numbers are the concatenation of the numbers 1 to n. That is:
- 1, 12, 123, 1234, 12345, 123456, 1234567, 12345678, 123456789, 12345678910, 1234567891011, 123456789101112, 12345678910111213, 1234567891011121314, 123456789101112131415, ... (sequence A007908 in the OEIS)
Smarandache prime
A Smarandache prime is a Smarandache number that is also prime. However, all of the first 344869 Smarandache numbers are not prime. It is conjectured there are infinitely many Smarandache primes, but none are known as of December 2016.[4]
Factorization of Smarandache numbers
n | Factorization of Sm(n) | n | Factorization of Sm(n) |
1 | 1 | 16 | 22 × 2507191691 × 1231026625769 |
2 | 22 × 3 | 17 | 32 × 47 × 4993 × 584538396786764503 |
3 | 3 × 41 | 18 | 2 × 32 × 97 × 88241 × 801309546900123763 |
4 | 2 × 617 | 19 | 13 × 43 × 79 × 281 × 1193 × 833929457045867563 |
5 | 3 × 5 × 823 | 20 | 25 × 3 × 5 × 323339 × 3347983 × 2375923237887317 |
6 | 26 × 3 × 643 | 21 | 3 × 17 × 37 × 43 × 103 × 131 × 140453 × 802851238177109689 |
7 | 127 × 9721 | 22 | 2 × 7 × 1427 × 3169 × 85829 × 2271991367799686681549 |
8 | 2 × 32 × 47 × 14593 | 23 | 3 × 41 × 769 × 13052194181136110820214375991629 |
9 | 32 × 3607 × 3803 | 24 | 22 × 3 × 7 × 978770977394515241 × 1501601205715706321 |
10 | 2 × 5 × 1234567891 | 25 | 52 × 15461 × 31309647077 × 1020138683879280489689401 |
11 | 3 × 7 × 13 × 67 × 107 × 630803 | 26 | 2 × 34 × 21347 × 2345807 × 982658598563 × 154870313069150249 |
12 | 23 × 3 × 2437 × 2110805449 | 27 | 33 × 192 × 4547 × 68891 × 40434918154163992944412000742833 |
13 | 113 × 125693 × 869211457 | 28 | 23 × 47 × 409 × 416603295903037 × 192699737522238137890605091 |
14 | 2 × 3 × 205761315168520219 | 29 | 3 × 859 × 24526282862310130729 × 19532994432886141889218213 |
15 | 3 × 5 × 8230452606740808761 | 30 | 2 × 3 × 5 × 13 × 49269439 × 370677592383442753 × 17333107067824345178861 |
Generalization
Since there are no known original Smarandache primes, there are three generalizations of them to find some related primes.
- Least k such that concatenating k consecutive natural numbers beginning with n is prime are
- ?, 1, 1, 4, 1, 2, 1, 2, 179, ?, 1, 2, 1, 4, 5, 28, 1, 3590, 1, 4, ?, ?, 1, ?, 25, 122, ?, 46, 1, ?, 1, ?, 71, 4, 569, 2, 1, 20, 5, ?, 1, 2, 1, 8, ?, ?, 1, ?, 193, 2, ?, ?, 1, ?, ?, 2, 5, 4, 1, ?, 1, 2, ?, 4, ... (sequence A244424 in the OEIS)
- Least k such that the number formed by concatenating the decimal numbers 1, 2, 3, ..., k, but omitting n is prime are
- 2, 3, 7, 9, 11, 7, 11, 1873, 19, 14513, 13, 961, ?, 653, ?, 5109, 493, 757, 29, 1313, ... (sequence A262300 in the OEIS)
- Least k such that concatenation of first k numbers in base n is prime are
- 2, 15, 2, ?, 2, 11, 10, 3, 2, ?, 2, 5, ?, 3, 2, 13, 2, ?, ?, 3, 2, ?, 9, 7, ?, ?, 2, ?, 2, 7, ?, 3, 5, 25, 2, 323, 226, 3, 2, ?, 2, 5, ?, 3, 2, 31, 85, 7, ?, ?, 2, ?, 14, 5, ?, 3, 2, ?, 2, ?, ?, 15, 10, ?, ...
See also
References
- ↑ Pomerance, Carl B.; Crandall, Richard E. (2001). Prime Numbers: a computational perspective. Springer. pp. 78 Ex 1.86. ISBN 0-387-25282-7.
- ↑ Rivera, Carlos, Primes by Listing
- ↑ Weisstein, Eric W. "Integer Sequence Primes". MathWorld. Retrieved 2011-07-28.
- ↑ Smarandache Prime
- "Smarandache-Wellin number". PlanetMath.
- List of first 200 Smarandache numbers with factorisations
- List of first 54 Smarandache–Wellin numbers with factorisations
- Factorization of Smarandache numbers
- Triangle of the Gods
- Smarandache–Wellin primes at The Prime Glossary
- Smith, S. "A Set of Conjectures on Smarandache Sequences." Bull. Pure Appl. Sci. 15E, 101–107, 1996.