1,1

J. K. Andersen, Consecutive Congruent Primes.

a(3) = 2213 because this number is the first in a sequence of 3 consecutive primes all of the form 8n + 5.

NextPrime[ n_Integer ] := Module[ {k = n + 1}, While[ ! PrimeQ[ k ], k++ ]; Return[ k ] ]; PrevPrime[ n_Integer ] := Module[ {k = n - 1}, While[ ! PrimeQ[ k ], k-- ]; Return[ k ] ]; p = 0; Do[ a = Table[ -1, {n} ]; k = Max[ 1, p ]; While[ Union[ a ] != {5}, k = NextPrime[ k ]; a = Take[ AppendTo[ a, Mod[ k, 8 ] ], -n ] ]; p = NestList[ PrevPrime, k, n ]; Print[ p[[ -2 ] ] ]; p = p[[ -1 ] ], {n, 1, 9} ]

Sequence in context: A100474 A152438 A060506 this_sequence A006700 A079011 A128866

Adjacent sequences: A057630 A057631 A057632 this_sequence A057634 A057635 A057636

nonn

Robert G. Wilson v (rgwv(AT)rgwv.com), Oct 10 2000

More terms from Jens Kruse Andersen (jens.k.a(AT)get2net.dk), May 28 2006