Let M_p = 2^p-1 be a Mersenne prime, where p is an odd prime. Sequence lists p such that b_{p-2} == -2^((p+1)/2) mod M_p, where {b_k} is defined in the Comments.

A354168

Let M_p = 2^p-1 be a Mersenne prime, where p is an odd prime. Sequence lists p such that b_{p-2} == -2^((p+1)/2) mod M_p, where {b_k} is defined in the Comments.

Terms

    a(0) =7a(1) =17a(2) =19a(3) =89a(4) =107a(5) =521a(6) =607a(7) =1279a(8) =2281a(9) =3217a(10) =4423a(11) =9689a(12) =11213a(13) =21701a(14) =44497a(15) =216091a(16) =859433a(17) =1257787a(18) =24036583a(19) =30402457a(20) =32582657a(21) =42643801a(22) =57885161a(23) =74207281a(24) =82589933

External references