%I A098328
%S A098328 0,7,14,42,147,321,473,322,785,1779,3039,1957,16446,274134,374781,
%T A098328 110639,248175,385504,2359264,5108010,3822244,3812946,9896631
%N A098328 Recurrence sequence derived from the digits of the cube root of 2 after 
               its decimal point.
%F A098328 a(1)=0. a(1)=0, p(i)=position of first occurrence of a(i) in decimal 
               places of 2^(1/3), a(i+1)=p(i).
%e A098328 2^(1/3)=1.259921049894873164767210607...
%e A098328 So for example, with a(1)=0, a(2)=7 because the 7th digit after the decimal 
               point is 0; a(3)=14 because the 14th digit after the decimal point 
               is 7 and so on.
%Y A098328 Other recurrence sequences: A097614 for Pi, A098266 for e, A098289 for 
               ln(2), A098290 for Zeta(3), A098319 for 1/Pi, A098320 for 1/e, A098321 
               for gamma, A098322 for G, A098323 for 1/G, A098324 for Golden Ratio 
               (phi), A098325 for sqrt(Pi), A098326 for sqrt(2), A098327 for sqrt(e). 
               A002580 for digits of 2^(1/3).
%Y A098328 Sequence in context: A055780 A161814 A067048 this_sequence A062098 A045759 
               A166637
%Y A098328 Adjacent sequences: A098325 A098326 A098327 this_sequence A098329 A098330 
               A098331
%K A098328 base,more,nonn
%O A098328 0,2
%A A098328 Mark Hudson (mrmarkhudson(AT)hotmail.com), Sep 14 2004
%E A098328 More terms from Ryan Propper (rpropper(AT)stanford.edu), Jul 21 2006