1,2

Labos, E. Graph of first 50000 terms

10 is a member because the 10th prime, 29, is congruent to -1 mod 10.

NextPrim[n_] := Block[{k = n + 1}, While[ !PrimeQ[k], k++ ]; k]; p = 1; Do[ If[Mod[p = NextPrim[p], n] == n - 2, Print[n]], {n, 1, 10^9}] (from Robert G. Wilson v Feb 18 2004)

Cf. A004648 and esp. A023143.

Cf. A052013, A048891, A092044, A092045, A092046, A092047, A092048, A092049, A092050, A092051, A092052.

Sequence in context: A005433 A139009 A049204 this_sequence A068910 A146027 A035358

Adjacent sequences: A045921 A045922 A045923 this_sequence A045925 A045926 A045927

nonn

Len Smiley (smiley(AT)math.uaa.alaska.edu)

More terms from Patrick De Geest (pdg(AT)worldofnumbers.com), Nov 15 1999.