%I #11 Jul 10 2024 14:55:48
%S 2,5,12,113,351,3623,3974,19519,355316,374835,1479821,7773940,
%T 24801641,32575581,122528384,400160733,522689117,922849850,5136938367,
%U 16333664951,135806257975,152139922926,440086103827,592226026753
%N Numerators of ordinary continued fraction convergents for 2*zeta(3).
%D Y. V. Nesterenko, Some remarks on zeta(3), Mathematical Notes, 59 (No. 6, 1996), 625-636.
%H Y. Nesterenko, <a href="http://www.ufr-mi.u-bordeaux.fr/~brisebar/GT/9899/Nest/nest29avril.html">Zeta(3) and recurrence relations.</a>
%e 2, 5/2, 12/5, 113/47, 351/146, 3623/1507, 3974/1653, ...
%p Digits := 100: t1 := evalf(2*Zeta(3)); cfrac(t1,l1,l2); l1;
%Y Cf. A060804, A060805, A060806, A060808 (denominators).
%K nonn,easy,cofr,frac
%O 0,1
%A _N. J. A. Sloane_, Apr 29 2001
%E More terms from _Vladeta Jovovic_, Apr 29 2001
%E Offset changed by _Andrew Howroyd_, Jul 10 2024