A163078 -id:A163078 - cp's OEIS frontend

A163076 Primes of the form k$ - 1. Here '$' denotes the swinging factorial function (A056040).

5, 19, 29, 139, 251, 12011, 48619, 51479, 155117519, 81676217699, 1378465288199, 5651707681619, 386971244197199, 1580132580471899, 30067266499541039, 6637553085023755473070799, 35257120210449712895193719, 399608854866744452032002440111

Offset: 1

Peter Luschny, Jul 21 2009

nonn

			Since 4$ = 6 the prime 5 is listed.

Jinyuan Wang, Table of n, a(n) for n = 1..53
Peter Luschny, Die schwingende Fakultät und Orbitalsysteme, August 2011.
Peter Luschny, Swinging Primes.

Cf. A055490, A056040, A163078 (arguments k), A163074, A163075.

a := proc(n) select(isprime, map(x -> A056040(x)-1,[$1..n])); sort(%) end:

Reap[Do[f = n!/Quotient[n, 2]!^2; If[PrimeQ[p = f - 1], Sow[p]], {n, 1, 70}]][[2, 1]] // Union (* Jean-François Alcover, Jun 28 2013 *)

More terms from Jinyuan Wang, Mar 22 2020

A163077 Numbers k such that k$ + 1 is prime. Here '$' denotes the swinging factorial function (A056040).

Original entry on oeis.org

0, 1, 2, 3, 4, 5, 8, 9, 14, 15, 24, 27, 31, 38, 44, 45, 49, 67, 76, 92, 99, 119, 124, 133, 136, 139, 144, 168, 171, 185, 265, 291, 332, 368, 428, 501, 631, 680, 689, 696, 765, 789, 890, 1034, 1233, 1384, 1517, 1615, 1634, 1809, 2632, 2762, 3925, 4419, 5108, 5426

Offset: 1

Peter Luschny, Jul 21 2009

nonn

			0$ + 1 = 1 + 1 = 2 is prime, so 0 is in the sequence.

Peter Luschny, Die schwingende Fakultät und Orbitalsysteme, August 2011.
Peter Luschny, Swinging Primes.

Cf. A002981, A163078, A163079, A163080.

a := proc(n) select(x -> isprime(A056040(x)+1),[$0..n]) end:

fQ[n_] := PrimeQ[1 + 2^(n - Mod[n, 2])*Product[k^((-1)^(k + 1)), {k, n}]]; Select[ Range[0, 8660], fQ] (* Robert G. Wilson v, Aug 09 2010 *)

is(k) = ispseudoprime(1+k!/(k\2)!^2); \\ Jinyuan Wang, Mar 22 2020

a(45)-a(56) from Robert G. Wilson v, Aug 09 2010

A163080 Primes p such that p$ - 1 is also prime. Here '$' denotes the swinging factorial function (A056040).

Original entry on oeis.org

3, 5, 7, 13, 41, 47, 83, 137, 151, 229, 317, 389, 1063, 2371, 6101, 7873, 13007, 19603

Offset: 1

Peter Luschny, Jul 21 2009

a(n) are the primes in A163078.

			3 is prime and 3$ - 1 = 5 is prime, so 3 is in the sequence.

Peter Luschny, Die schwingende Fakultät und Orbitalsysteme, August 2011.
Peter Luschny, Swinging Primes.

Cf. A056040, A103317, A163079, A163078.

a := proc(n) select(isprime,select(k -> isprime(A056040(k)-1),[$0..n])) end:

sf[n_] := n!/Quotient[n, 2]!^2; Select[Prime /@ Range[200], PrimeQ[sf[#] - 1] &] (* Jean-François Alcover, Jun 28 2013 *)

is(k) = isprime(k) && ispseudoprime(k!/(k\2)!^2-1); \\ Jinyuan Wang, Mar 22 2020

a(14)-a(18) from Jinyuan Wang, Mar 22 2020

cp's OEIS Frontend

A163076 Primes of the form k$ - 1. Here '$' denotes the swinging factorial function (A056040).

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A163077 Numbers k such that k$ + 1 is prime. Here '$' denotes the swinging factorial function (A056040).

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Examples

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Crossrefs

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Maple

Mathematica

PARI

Extensions

A163080 Primes p such that p$ - 1 is also prime. Here '$' denotes the swinging factorial function (A056040).

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Programs

Maple

Mathematica

PARI

Extensions