OFFSET
0,1
COMMENTS
Decimal expansion has increasingly large gaps of zeros, the digits delimited by these zeros are equal to 2^(2^m) as m=0,1,2,3,... The continued fraction expansion (A122165) and consists entirely of 3's, 5's and 7's, after an initial partial quotient of 4. - Paul D. Hanna, Aug 22 2006
LINKS
Aubrey J. Kempner, On Transcendental Numbers, Transactions of the American Mathematical Society, volume 17, number 4, October 1916, pages 476-482.
FORMULA
Equals -Sum_{k>=1} mu(2*k)/(5^k - 1), where mu is the Möbius function (A008683). - Amiram Eldar, Jul 12 2020
EXAMPLE
0.241602560006553600000...
From Paul D. Hanna, Aug 22 2006: (Start)
Decimal expansion consists of large gaps of zeros between strings of digits that form powers of 2; this can be seen by grouping the digits as follows:
x = .2 4 16 0 256 000 65536 000000 4294967296 000000000000 ...= 0.24160256000655360000004294...
and then recognizing the substrings as powers of 2:
2 = 2^(2^0), 4 = 2^(2^1), 16 = 2^(2^2), 65536 = 2^(2^4), 4294967296 = 2^(2^5), 18446744073709551616 = 2^(2^6), ... (End)
MATHEMATICA
RealDigits[ N[ Sum[1/5^(2^n), {n, 0, Infinity}], 110]][[1]]
PROG
(PARI) {a(n)=local(x=sum(k=0, ceil(3+log(n+1)), 1/5^(2^k))); (floor(10^n*x))%10} \\ Paul D. Hanna, Aug 22 2006
CROSSREFS
KEYWORD
cons,nonn
AUTHOR
Robert G. Wilson v, Dec 11 2002
EXTENSIONS
Edited by R. J. Mathar, Aug 02 2008
STATUS
approved