# Greetings from The On-Line Encyclopedia of Integer Sequences! http://oeis.org/ Search: id:a057175 Showing 1-1 of 1 %I A057175 #45 Sep 08 2022 08:45:02 %S A057175 3,59,223,547,773,1009,1823,3803,49223,193247,703393,860029 %N A057175 Numbers n such that (9^n + 1)/10 is a prime. %C A057175 Repunit primes in base -9. - _Paul Bourdelais_ %H A057175 P. Bourdelais, A Generalized Repunit Conjecture %H A057175 H. Dubner and T. Granlund, Primes of the Form (b^n+1)/(b+1), J. Integer Sequences, 3 (2000), #P00.2.7. %H A057175 H. Lifchitz, Mersenne and Fermat primes field %H A057175 Eric Weisstein's World of Mathematics, Repunit %t A057175 lst={};Do[p=(9^n+1)/10;If[PrimeQ[p], AppendTo[lst, n]], {n, 7!}];lst (* _Vladimir Joseph Stephan Orlovsky_, Sep 29 2008 *) %t A057175 Select[Range[4000], PrimeQ[(9^# + 1)/10] &] (* _Vincenzo Librandi_, Aug 03 2015 *) %o A057175 (PFGW v3.3.1 from primeform.net) pfgw -b2 -f10 bNeg9.txt:: %o A057175 ABC2 (9^$a+1)/10 // -f{4*$a} %o A057175 a: primes from 3 to 1e6} %o A057175 (Magma) [n: n in [0..800] | IsPrime((9^n + 1) div 10 )]; // _Vincenzo Librandi_, Aug 03 2015 %o A057175 (PARI) first(m)=my(v=vector(m));t=0;for(i=1,m,while(!isprime((9^t + 1)\10),t++);v[i]=t;t++;);v; \\ _Anders Hellström_, Aug 16 2015 %K A057175 nonn %O A057175 1,1 %A A057175 _N. J. A. Sloane_, Sep 15 2000 %E A057175 a(9) corresponds to a probable prime, was discovered on Oct 22 2007. Trial factored to 1E11 with Fermat base 2 primality test. - _Paul Bourdelais_ %E A057175 a(10) corresponds to a probable prime, discovered by _Paul Bourdelais_, Feb 01 2010 %E A057175 a(11) corresponds to a probable prime, discovered by _Paul Bourdelais_, Aug 03 2015 %E A057175 a(12) corresponds to a probable prime, discovered by _Paul Bourdelais_, Sep 23 2020 # Content is available under The OEIS End-User License Agreement: http://oeis.org/LICENSE