Polya's Conjecture: more odd #factors numbers
Hans Havermann
hahaj at rogers.com
Tue Jun 25 03:24:28 CEST 2002
I wrote:
> More specifically (assuming #o - #e == +1 for n = 906180357), the zero
> points (#o-#e[[n]] == 0) where a sign-change occurs (#o-#e[[n-1]] +
> #o-#e[[n+1]] == 0, ...
> 906180358, 906180376, ... 906488076, 906488080, ...
Arrgh! I calculated the zero points from scratch, only to rediscover
Tanaka's (1980) 906150256, -7, -8 [cf. A028488, A002819, A051470].
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