For a given rational function $f(x)=P(x)/Q(x)$ with degree of $Q(x)$ greater than degree of $P(x)$ are there more than one way to split it up into partial fractions?
I do realize that the denominators for the terms corresponding to roots of $Q(x)$ must be unique. But could different different sets of numerators result in the same function $f(x)$?