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What is the limit of the continued fraction whose partial denominators are the composites?

  • 0
    Maybe I should have omitted "$1+{}$" at the beginning.2011-11-18

2 Answers 2

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You mean $1/(1+1/(4+1/(6+1/(8+1/(9+1/\ldots)$? It is approximately

1.240193472713540402907659901653619438804869904021954760571414246112567530857899396707443536897205404

but I doubt that there is a "closed form".

  • 1
    The Plouffe inverter http://pi.lacim.uqam.ca/eng/ recognizes neither this number nor its reciprocal.2011-11-17
2

That the continued fraction converges can be easily established through the Śleszyński-Pringsheim theorem.

For reference, here's some Mathematica code for computing this number to prec significant figures, which is similar to the code given here:

Composite[n_Integer?Positive] := FixedPoint[(n + PrimePi[#] + 1) &, n]  prec = 500; y = N[1, prec + 5]; c = y; d = 0; k = 1; While[True, p = Composite[k];   c = p + 1/c; d = 1/(p + d);   h = c*d; y *= h;   If[Abs[h - 1] <= 10^(-prec), Break[]];   k++]; N[y, prec] 

which yields

1.2401934727135404029076599016536194388048699040219547605714142461125675308578993967074435368972054040499444569870631879216700131159033931437886878647547511888183754244113415120681779806667661819237665606323444679166964461726592199240306129802843968806256258252294199900746887849052219088971773650043418994122502389225153031976851620685269261818925150482368821451503313305347497194089489582641069356680422299551667227442255378383831719803128578492721019246089346156505612206821587675561358847518295030

Its reciprocal is

0.80632580480527957525355985703886211400308652751886019336591742291710688332574070079436098605441519195401666000252471896335967661438294029308273049422789739675889321789197956373719153024896914087422889469613361550097143208723090059691265863842011401757403471316704470493263754267277999620082114009184258161800044132073167763756696153308835343268670549110722478950038217797937443267139158452067897088395434297330559287749430628860526069885283389279384016537671968819880420551471111687607529969189158471


Gerry has said that Plouffe's inverter can't recognize these numbers; neither can the ISC.

  • 0
    I mean it doesn't work on these numbers. But sure, I'll clarify...2011-11-18