I've seen it stated in several places that the only knots that are both torus and pretzel are 8_19 and 10_124. However, it seems like 3_1 (trefoil) is a pretzel knot (1,1,1) and similarly that 5_1 is pretzel knot (1,1,1,1,1) and so on. These are both torus knots, of course. I've seen it stated elsewhere that these are indeed examples of pretzel knots. But then that means that 8_19 and 10_124 are not the only knots that are pretzel and torus. Maybe there is some minor confusion on my part that I'm overlooking...? It does seem that the only pretzel knots that are also torus are the ones that to not follow the pattern (1,1,1,1,...,1), so maybe that is the distinction. But that still doesn't explain why I have seen at least one paper specifically call the (1,1,1,1,...,1) knots pretzel knots in proofs etc. Anyway, just trying to get this clarified once and for all. Thanks!