Consider six consecutive positive integers. Show that there is a prime number that divides exactly one of them.
I am more inclined than ever to believe Steve Herman's conjecture:
"For n>1, there is a prime number that divides exactly one of any n consecutive positive integers."
Here's my thinking, with some hand-waving:
Define JLo's condition: n consecutive numbers satisfy JLo's
condition if some prime number <=n does not divide at least two of
the numbers or if at least one of the numbers is not divisible by a
prime <=n.
Observation: If a sequence satisfies JLo's condition, then it has at least one prime number that divides exactly one of them
Observation: For n <= 19, we can prove that all sequences satisfy JLo's condition.
Handwaving: For n >= 20, any sequence that does not satisfy JLo's
condition must have a sufficiently large starting number that at least
one of it's terms (and in fact, most of its' terms) have a prime factor
> n. That prime factor perforce divides only one term in the
sequence. For instance, for n = 25, the first sequence that does
not satisfy JLo's condition starts with something like
185,065,429. Every one of the 13 odd terms in this sequence (and
in any 25-length sequence which do not satisfy JLo's condition) are
provably divisible by exactly one prime < 25. Unless all of 13
them are exact powers of one of the 9 primes less than 25, then one of
them has a prime factor > 25. It is impossible for all of them
to be exact powers of one of the 8 primes less than 25, so there is a
prime number that divides exactly one of any 25 consecutive positive
integers.
So, I know that I can prove Steve Herman's conjecture for n= 20, 21,
22, 23, 24, 25. It might be possible to take an approach like
this and formalize and actually prove this for all n, but I'm not going
to be doing it. And it is also possible that the conjecture is
true but unprovable.
Steve Herman's conjecture -- proof outline
