Euclid-Pocklington primes: primes of the form Product_{i=1..k} prime(i) * prime(k+1)^m + 1 where prime(r) is the r-th prime and Product_{i=1..k} prime(i) < prime(k+1)^m.
A053341
Euclid-Pocklington primes: primes of the form Product_{i=1..k} prime(i) * prime(k+1)^m + 1 where prime(r) is the r-th prime and Product_{i=1..k} prime(i) < prime(k+1)^m.
Terms
- a(0) =3a(1) =5a(2) =7a(3) =17a(4) =19a(5) =151a(6) =163a(7) =257a(8) =487a(9) =751a(10) =1459a(11) =1471a(12) =39367a(13) =65537a(14) =72031a(15) =279511a(16) =33820711a(17) =86093443a(18) =258280327a(19) =372027811a(20) =4092305911a(21) =11149928791a(22) =42638305711
External references
- oeis: A053341