The following problem was asked in the Art of Problem Solving forum; here you can see the question (post #4) and my answer (post #5).
Remark. In steps 2), 4), and 5) of the solution of the following Problem, we have used this fact that any bounded sequence of real numbers that is either increasing or decreasing, is convergent (see the Fact in this post!).
Problem. Consider the sequence defined by
Show that is convergent.
Solution. I’m going to give the solution in several steps.
1) The sequence is decreasing.
Proof. It’s clear that and, by induction, Thus
2)
Proof. By 1), and so exists and Now, by Stolz-Cesaro,
and so
3) The sequence is eventually decreasing.
Proof. By 2), there exists an such that for all It is easy to see that for all and so, for we have
which then gives
4)
Proof. By 3), exists (as a finite number), and so, by Stolz-Cesaro,
5) The sequence is convergent.
Proof. By 4), there exists an such that for all and so
Hence is bounded, because the series converges, and so the sequence converges because it is increasing.
Exercise. Regarding step 5) of the solution, explain why the fact that the series converges implies that the sequence is bounded.