Zsigmondy numbers for a = 6, b = 1: Zs(n, 6, 1) is the greatest divisor of 6^n - 1^n (A024062) that is relatively prime to 6^m - 1^m for all positive integers m < n.
A064082
Zsigmondy numbers for a = 6, b = 1: Zs(n, 6, 1) is the greatest divisor of 6^n - 1^n (A024062) that is relatively prime to 6^m - 1^m for all positive integers m < n.
Terms
- a(0) =5a(1) =7a(2) =43a(3) =37a(4) =311a(5) =31a(6) =55987a(7) =1297a(8) =46873a(9) =1111a(10) =72559411a(11) =1261a(12) =2612138803a(13) =5713a(14) =1406371a(15) =1679617a(17) =46441a(19) =1634221a(20) =1822428931a(21) =51828151a(23) =1678321
External references
- oeis: A064082