Michael Press wrote:
>Okay. Here is a nontrivial, non-right triangle
>counter-example to the original conjecture.
>(6, 8, 7, 6).
You may have been confused by the many modifications
of the original conjecture, but as far as I can see,
the example you show above is not a counterexample to
any conjecture that was not already previously disproved.
The original conjecture was this ...
Conjecture:
There does not exist a triangle such that the sides
and angle bisectors all have integer lengths.
Note that I had previously posted the example
(a,b,c) = (14,25,25)
which has integer sides lengths and rational angle
bisector lengths, so the above triangle, scaled up by an
appropriate integer factor, yields a counterexample to
the original conjecture, and hence the conjecture was
implicitly already withdrawn.
But also note, the original conjecture required that all
sides and _all_ angle bisectors have integer lengths, so
your example is not a counterexample to the original
conjecture.
There was the followup conjecture ...
Conjecture:
If the sides of a triangle have rational lengths, then
the length of the bisector of an angle between two
unequal sides is irrational.
and for that conjecture, your example
(a,b,c) = (6,8,7)
is a counterexample, however I had already noted that
the example
(a,b,c) = (14,25,25)
is a counterexample to that conjecture as well, hence that
conjecture was also already implicitly withdrawn.
But there are some "live" conjectures ready to proved or
disproved -- see my latest replies in this thread.
Remarks:
All the currently live conjectures are based only on light
empirical evidence -- I've checked all triangles with
perimeters less than 1000.
However, other than the empirical evidence, I have no
intuition about whether they should be true or false.
Thus, empirical evidence notwithstanding, I wouldn't
be surprised if they are all false.
quasi