It also can help to think about this if you realize that adjacent numbers in the fibonacci sequence are relatively prime.
Thanks, -- Raul On Thu, Feb 20, 2014 at 9:04 PM, elton wang <ahala2...@yahoo.com> wrote: > Two building blocks are needed for this: one is you already know the > relationship of continued fractions and Fibonacci numbers, and another is > that you know (+%)/ is for continued fractions. In the same vein, we can > also try this (1&(+%)^:_)1 ( = 1.61803, golden ratio) > > > > > > > On Thursday, February 20, 2014 5:49 PM, Peter B. Kessler > <peter.b.kess...@oracle.com> wrote: > > A more interesting question is: Why did you think of doing it that way? > The really interesting question is: How can I learn to think that way? > > ... peter > > > On 02/20/14 12:42, Roger Hui wrote: > > % 1 +. (+%)/\ 100 $ 1x > ---------------------------------------------------------------------- > For information about J forums see http://www.jsoftware.com/forums.htm > ---------------------------------------------------------------------- > For information about J forums see http://www.jsoftware.com/forums.htm > ---------------------------------------------------------------------- For information about J forums see http://www.jsoftware.com/forums.htm