Just a friendly correction :-). You have repeatedly confused the meaning of open and closed. "Closed" means including the end element given in the range, and "open" means excluding it.
It may make more sense to think of intervals in the real numbers. "[1,2)" doesn't have a maximum to the right - it has 1.9999....... but not 2. Thus it's "open" to the right. Whereas "[1,2]" includes its maximum (2), so its sealed.
The terms open and closed apply to any set of numbers (not just intervals), where "closed" means that the set includes the limit of any series of numbers in the set, and open means "not closed".
Much appreciated! The terminology and notation seemed backwards to me, and I basically never use it except when discussing Djikstra on HN ;-)
Visually, it looks like ) has more "room" than ], if that makes sense, and that "closed" would mean that the element defines the 'lid' of the range, while "open" means it defines the final extent.
But you can't argue with nomenclature, and extending the definition to the reals helped make it click for me, so I'm unlikely to screw it up again. Thanks!
You could imagine the curved parentheses as "cutting the corner" of the square brackets - or imagine the curve as just gently kissing the endpoint at a single point, while the flat square solidly includes it. "Open" makes sense because it satisfies the criterion that for any number in the interval, you can find a larger (or smaller) number that is also in it - there's "no end".
It may make more sense to think of intervals in the real numbers. "[1,2)" doesn't have a maximum to the right - it has 1.9999....... but not 2. Thus it's "open" to the right. Whereas "[1,2]" includes its maximum (2), so its sealed.
The terms open and closed apply to any set of numbers (not just intervals), where "closed" means that the set includes the limit of any series of numbers in the set, and open means "not closed".