There is also the issue of things only being partially orderable.
When I was recently celebrating something, I was asked to share my favorite memory. I realized I didn’t have one. Then (since I have been studying Naive Set Theory a LOT), I got tetris-effected and as soon as I heard the words “I don’t have a favorite” come out of my mouth, I realized that favorite memories (and in fact favorite lots of other things) are partially ordered sets. Some elements are strictly better than others but not all elements are comparable (in other words, the set of all memories ordered by favorite does not have a single maximal element). This gives me a nice framing to think about favorites in the future and shows that I’m generalizing what I’m learning by studying math which is also nice!
There is also the issue of things only being partially orderable.