Primes of the form 34k+1 generated recursively. Initial prime is 103. General term is a(n) = Min {p is prime; p divides (R^17 - 1)/(R - 1); p == 1 (mod 17)}, where Q is the product of previous terms in the sequence and R = 17*Q.
A125038
Primes of the form 34k+1 generated recursively. Initial prime is 103. General term is a(n) = Min {p is prime; p divides (R^17 - 1)/(R - 1); p == 1 (mod 17)}, where Q is the product of previous terms in the sequence and R = 17*Q.
Terms
- a(0) =103a(1) =307a(2) =9929a(3) =187095201191a(4) =76943a(5) =37061a(6) =137a(8) =302125531a(9) =18089a(10) =613a(11) =409a(12) =9419a(13) =193189
External references
- oeis: A125038