Good point. When the relation is obviously antisymmetric, where aRb implies not bRa, this is enough to make people realize it is not symmetric.
I wouldn’t be surprised if the easiest relations for us to imagine between two variables were simply degrees of “bidirectional implication” or “mutual exclusivity”.
Bing bing bing!
The real issue, of course, is why they’re the easiest for us to represent.
That’s coming up next.
Good point. When the relation is obviously antisymmetric, where aRb implies not bRa, this is enough to make people realize it is not symmetric.
I wouldn’t be surprised if the easiest relations for us to imagine between two variables were simply degrees of “bidirectional implication” or “mutual exclusivity”.
Bing bing bing!
The real issue, of course, is why they’re the easiest for us to represent.
That’s coming up next.