This can be abbreviated to NSW, which is also the abbreviation of the state of New South Wales in Australia.

In mathematics, a Newman-Shanks-Williams prime (often abbreviated NSW prime) is a certain kind of prime number. A prime p is an NSW prime if it is a Newman-Shanks-Williams number; that is, if it can be written in the form

$S\_\{2m+1\}=\backslash frac\{(1+\backslash sqrt\{2\})^\{2m+1\}+(1-\backslash sqrt\{2\})^\{2m+1\}\}\{2\}$

NSW primes were first described by M. Newman, D. Shanks and H. C. Williams in 1981 during the study of finite groups with square order.

The first few NSW primes are 7, 41, 239, 9369319, 63018038201, ... , corresponding to the indices 3, 5, 7, 19, 29, ... .

The sequence $S$ alluded to in the formula can be described by the following recurrence relation:

$S\_0=1$

$S\_1=1$

$S\_n=2S\_\{n-1\}+S\_\{n-2\}\backslash qquad\backslash mbox\{for\; all\; \}n\backslash geq2.$.

The first few terms of the sequence are 1, 1, 3, 7, 17, 41, 99, ... . These numbers also appear in the continued fraction convergents to √2.

External links

---

• The Prime Glossary: NSW number

Further reading

---

• M. Newman, D. Shanks and H. C. Williams, Simple groups of square order and an interesting sequence of primes, Acta. Arith., 38:2 (1980/81) 129-140.

Prime numbers

Nombre de Newman-Shanks-Williams | Bilangan prima Newman-Shanks-Williams | 纽曼-尚克斯-威廉士素数