1,2

Peter A. Hendriks, "A binary variant of Conway's audioactive sequence", lecture at 1192nd meeting of WWWW, Groningen, The Netherlands (Jul 15 1999).

T. Sillke, The binary form of Conway's sequence

\left({8\over 9}+{1\over 18}\sqrt[ 3 ]{748-36\sqrt{93}} + {1\over 18}\sqrt[ 3 ]{748+36\sqrt{93}} \right)\times \left({1\over 3}+{1\over 6}\sqrt[ 3 ]{116-12\sqrt{93}}+{1\over 6}\sqrt[ 3 ]{116+12\sqrt{93}}\right)^{\textstyle n}.

The number of digits is equal to c l^n rounded down to the nearest integer, where c and l are the real roots of 3x^3-8x^2+5x-1 and x^3-x^2-1 respectively, for all n except n=2 and n=3.

Cf. A001387.

Adjacent sequences: A049191 A049192 A049193 this_sequence A049195 A049196 A049197

Sequence in context: A111242 A133582 A085642 this_sequence A058298 A101136 A036957

base,easy,nonn

Olivier Gerard (ogerard(AT)ext.jussieu.fr).

More terms and formulae supplied by Gerton Lunter (gerton(AT)math.rug.nl)