The problem "Unequally Yoked" looks for all integral solutions for a^b = b^a. But of course, there are a lot of non-integral solutions. If I graph the solution set where a and b are both greater than 0, I get two intersecting curves. Where do the two curves cross?
(In reply to
re: Solution & Spoiler by e.g.)
This problem seems to be pretty well wrapped up. Kudos so far to e.g., Richard, Larry.
One observation:
The solution method that was popular in this thread involves introducing a value q, and
then evaluating x and y when q = 1. x and y are undefined when q
= 1, so a limit was taken. This is very clever, and completely
correct.
Note that this does not imply, however, that there is anything odd
about the "interesting part" of the curve. At the risk of being
wrong about my own problem, I think the curve that excludes x = y but
includes the intersection point is continuous and differentiable at all
points. I haven't done the math, but it looks regular enough.
Which reminds me. I wasn't sure how to classify this
problem. I stuck it in calculus, because most of the solution
methods I thought of involved limits or derivatives. Any comments
on the appropriate classification?
Thanks, Steve
Edited on April 27, 2005, 1:34 pm
re(2): Solution & Spoiler
