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A095991 Numbers n such that f(k) * 2^n - 1 is prime, where f(j) = A070826(j) and k is the number of decimal digits of 2^n. +0
1
2, 3, 4, 6, 14, 17, 18, 23, 33, 43, 45, 53, 60, 70, 114, 141, 162, 178, 387, 657, 787, 951, 1517, 1882, 1999, 2423, 2722, 3635, 3636, 3893, 5021, 5631 (list; graph; listen)
OFFSET

1,1
COMMENT

a(1) through a(32) have been proved to be prime with WinPFGW. a(32) has 7901 digits. No more terms up to 7300.

LINKS

PFGW, Discussion group for the PrimeForm program.

EXAMPLE

a(5)=14 because 1155 * 2^14 - 1 = 18923519, a prime.

MATHEMATICA

Do[ If[ PrimeQ[ Product[ Prime[i], {i, Floor[ n / Log[2, 10] + 1]}] * 2^(n - 1) - 1], Print[n]], {n, 7300}] (from Robert G. Wilson v Jul 23 2004)

CROSSREFS

Sequence in context: A066463 A073146 A038767 this_sequence A049911 A056712 A002087

Adjacent sequences: A095988 A095989 A095990 this_sequence A095992 A095993 A095994

KEYWORD

more,nonn

AUTHOR

Jason Earls (zevi_35711(AT)yahoo.com), Jul 18 2004

EXTENSIONS

Edited by Robert G. Wilson v (rgwv(AT)rgwv.com), Jul 23 2004

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Last modified November 27 22:38 EST 2009. Contains 167602 sequences.

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