Expanding the space between each pair of rationals to include infinitely many more rationals would be fairly straightforward but boring; but how would you represent the infinite number of irrationals between each of the infinitely many rationals you can't even see yet?
Presumably you show the interesting numbers. This might be from a database like Plouffe's inverter (many numbers with little known about them), from the OEIS (few numbers with relatively large amounts known), from RIES (numbers with low Kolmogorov complexity), etc. Charles Greathouse Analyst/Programmer Case Western Reserve University On Thu, Aug 30, 2012 at 1:34 PM, Dave Dyer <ddyer@real-me.net> wrote:
At 09:42 AM 8/30/2012, James Propp wrote:
That would certainly be easy to code.
We don't know the identities of very many interesting numbers. I suppose it would be easy and moderately interesting to zoom in on the zone containing pi e e^pi pi^e and so on.
Expanding the space between each pair of rationals to include infinitely many more rationals would be fairly straightforward but boring; but how would you represent the infinite number of irrationals between each of the infinitely many rationals you can't even see yet?
_______________________________________________ math-fun mailing list math-fun@mailman.xmission.com http://mailman.xmission.com/cgi-bin/mailman/listinfo/math-fun