%I #7 Oct 24 2019 23:01:59
%S 9,2,4,21,2942,53513091,167326045060176459,
%T 28151219628621255951104435939025563,
%U 1114022548504683064752039841443977072775869961232641319345703597106467
%N Egyptian fraction representation of sqrt(96) (A010547) using a greedy function.
%t Egyptian[nbr_] := Block[{lst = {IntegerPart[nbr]}, cons = N[ FractionalPart[ nbr], 2^20], denom, iter = 8}, While[ iter > 0, denom = Ceiling[ 1/cons]; AppendTo[ lst, denom]; cons -= 1/denom; iter--]; lst]; Egyptian[ Sqrt[ 96]]
%Y Egyptian fraction representations of the square roots: A006487, A224231, A248235-A248322.
%Y Egyptian fraction representations of the cube roots: A129702, A132480-A132574.
%K nonn
%O 0,1
%A _Robert G. Wilson v_, Oct 04 2014
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