No since it was only a one directional implication that wasn't necessary

[Ignore my comment, correct explantation given by the answer below] Small correction, their difference doesn't go to zero, the ratio between them goes to 1 as the input tends to infinity, it's a subtle difference but very meaningful in a lot of contexts. While the implications are the same for this example, it's more like the error in the approximation relative to what you are calculating is miniscule. For all that we know the error could be oscillating back and forth or even increasing, but not in a meaningful way in the scale of the argument.

@@healer1461 No, what I said is correct. Their difference does go to zero, which is a strictly stronger result than their ratio going to one and directly implies it. If their difference didn't go to zero, you couldn't interchange them in the limit as he did.

@@healer1461 n and n+1 also have ratio that goes to one, but because their difference doesn't go to zero, you cannot change n to n+1 in most cases without changing the limit, but if two functions have difference trending towards zero, they can always be interchange inside limit, provided you never violate functional domains.

@@newwaveinfantry8362 Now that I looked into it, I recognize you were right. I seem to have always assumed that their difference exploded because the way I'm used to approximating it, plus their graphs can be very misleading given for low order approximations.

@@newwaveinfantry8362 Just out curiosity, but does there exist a reasonable example of function F ~ H, where the limit as the input goes to infinity of F/G ≠ H/G, for some other function G? (Assuming everything converges)

I haven't found one yet but I think this is pretty good.

It means the limit of (Stirling's approx)/k! as k tends to infinity is 1. That's what we mean by asymptotically equal.

​@@maths_505thanks😊

The approximation working means that the limit of (Stirling's approx)/(k!) as k tends to infinity is 1.