Smallest odd prime base q such that p^6 divides q^(p-1) - 1, where p = Prime[n].

Terms

a(0) =193a(1) =1459a(2) =14557a(3) =152617a(4) =2120879a(5) =7654109a(6) =24527681a(7) =2342959a(8) =90603883a(9) =1657641497a(10) =40373093a(11) =2175429661a(12) =1614357949a(13) =119612113a(14) =14635471219a(15) =2816276179a(16) =15591204869a(17) =1006953931a(18) =7726467079a(19) =48931161299a(20) =54908441659a(21) =41985419521a(22) =583493688221a(23) =200335697059a(24) =96891225583a(25) =50303508131a(26) =129847013561a(27) =362253784469a(28) =625810253147a(29) =195406393583