1,1

This is the four-consecutive-prime minus one equivalent of A103533.

n: prime(n) * prime(n+1) * prime(n+2) * prime(n+3) - 1

1: 2 * 3 * 5 * 7 - 1 = 209 = 11 * 19

2: 3 * 5 * 7 * 11 - 1 = 1154 = 2 * 577

36: 151 * 157 * 163 * 167 - 1 = 645328246 = 2 * 322664123

47: 211 * 223 * 227 * 229 - 1 = 2445956098 = 2 * 1222978049

201: 1229 * 1231 * 1237 * 1249 - 1 = 2337448622686 = 2 * 1168724311343.

Bigomega[n_]:=Plus@@Last/@FactorInteger[n]; SemiprimeQ[n_]:=Bigomega[n]==2; Select[Table[Prime[n]*Prime[n+1]*Prime[n+2]*Prime[n+3]-1, {n, 1000}], SemiprimeQ] (*Chandler*)

Cf. A000040, A001358, A006881, A103533, A103614, A103746, A104875.

Sequence in context: A083512 A063366 A064906 this_sequence A157441 A029554 A003779

Adjacent sequences: A104871 A104872 A104873 this_sequence A104875 A104876 A104877

easy,nonn

Jonathan Vos Post (jvospost3(AT)gmail.com), Mar 29 2005

Extended by Ray Chandler (rayjchandler(AT)sbcglobal.net) Mar 29 2005