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%I #36 Apr 04 2015 09:59:11
%S 2,71,8281828459045235360287471,
%T 352662497757247093699959574966967627724076630353547594571382178525166427427466391932003059
%N Cut decimal expansion of e (A001113) into pieces that are primes, each prime being greater in length than the last.
%C Feb 06 2012: _Charles R Greathouse IV_ found the next few terms. He reports that the sequence starts 2, 71, 8281828459045235360287471, 352...3059 (90 digits), 9218...939 (456 digits), 239...6753 (608 digits), 985...8631 (1421 digits), 382...0327 (1469 digits). Since these terms are too large to display here, M. F. Hasler points out that we could add a sequence giving the starting place (in the decimal expansion of e) where the next prime begins.
%C If we omit the condition that the terms increase in length, the sequence begins 2, 7. The third term is the 649-digit number 18281...0429, found by _Charles R Greathouse IV_, Feb 06 2012.
%Y Cf. A001113, A073246, A104843.
%Y A subsequence of A198188. - _M. F. Hasler_, Feb 05 2012
%K nonn,base
%O 1,1
%A _N. J. A. Sloane_, Feb 05 2012
%E a(4) from _Ignacio Larrosa CaƱestro_, Feb 05 2012