meirion.livejournal.com |
Sun 2002-08-25 01:16 |
in particular look at the section on the "curious addition tree" (10/89). i'd guess that your series are going to do the same when you get to fibonacci numbers that are more than n digits long.
the bit i find fascinating about that page is the bit about generating fibonacci numbers in terms of the golden ratio and its lesser-known sibling (does (1-sqrt(5))/2 have its own name, or is it just the discarded root of 1-x-x^2 ?)
-m- |
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