Primes p of the form 4*k+1 for which s=26 is the least positive integer such that s*p-(floor(sqrt(s*p)))^2 is a square.

A145050

Primes p of the form 4*k+1 for which s=26 is the least positive integer such that s*p-(floor(sqrt(s*p)))^2 is a square.

Terms

    a(0) =6569a(1) =8117a(2) =8689a(3) =9221a(4) =9281a(5) =9829a(6) =10289a(7) =10457a(8) =11597a(9) =11953a(10) =12577a(11) =12721a(12) =13093a(13) =14561a(14) =15737a(15) =15817a(16) =16529a(17) =17041a(18) =17341a(19) =17737a(20) =18089a(21) =18397a(22) =19121a(23) =19997a(24) =20129a(25) =20693a(26) =20789a(27) =21601a(28) =21701a(29) =22093

External references