I teach freshman calculus, and have recently been discussing series. In one question on a recent test, I asked whether $\sum\frac{n^2}{n^3+1}$ converges or diverges.
One student got the correct answer by the following incorrect reasoning. They used L'Hopital's rule to conclude that $\frac{n^2}{n^3+1}$ has the same limit as $\frac{2n}{3n^2}$ and as $\frac{2}{6n}$ (which is true so far). They then claimed that because $\sum\frac{2}{6n}$ diverges, the original series must diverge.
This, of course, does not follow from anything they've been taught. L'Hopital's rule merely says that if $\frac{2}{6n}$ approaches zero, we can conclude that $\frac{n^2}{n^3+1}$ approaches zero. But L'Hopital's rule, as typically stated, says nothing about the "rate" at which $\frac{n^2}{n^3+1}$ approaches zero.
However, the following conjecture seems to be true for many expressions, such as $\frac{x^a}{e^x}$, $\frac{\ln x}{x^a}$, and $\frac{x}{x^2(\ln x)^a}$. Can anyone help me come up with the "correct" conjecture, and a proof?
CONJECTURE: If $f(x)$ and $g(x)$ belong to a "nice" class of functions (which approach infinity with $x$), then the infinite series $\sum_n\frac{f(n)}{g(n)}$ and $\sum_n\frac{f'(n)}{g'(n)}$ either both converge or both diverge.
EDIT: It appears essentially the same question has already been asked. And a nice answer was given by Robert Israel. However, he requires that $f$ and $g$ be meromorphic. It would be nice if there were a slightly more general answer that included logarithms, OR a counterexample using functions built out of logarithms.