Along with the distinction between causal and logical connections, when considering the conditional premise of the syllogisms (if A then B), Jaynes warns us to distinguish between those conditional statements of a purely formal character (the material conditional ) and those which assert a logical connection.
It seems to me that the weak syllogisms only “do work” when the conditional premise is true due to a logical connection between antecedent and consequent. If no such connection exists, or rather, if our mind cannot establish such a connection, then the plausibility of the antecedent doesn’t change upon learning the consequent.
For example, “if the garbage can is green then frogs are amphibians” is true since frogs are amphibians, but this fact about frogs does not increase (or decrease) the probability that the garbage can is green since presumably, most of us don’t see a connection between the two propositions.
At some point in learning logic, I think I kind of lost touch with the common language use of conditionals as asserting connections. I like that Jaynes reminds us of the distinction.
Along with the distinction between causal and logical connections, when considering the conditional premise of the syllogisms (if A then B), Jaynes warns us to distinguish between those conditional statements of a purely formal character (the material conditional ) and those which assert a logical connection.
It seems to me that the weak syllogisms only “do work” when the conditional premise is true due to a logical connection between antecedent and consequent. If no such connection exists, or rather, if our mind cannot establish such a connection, then the plausibility of the antecedent doesn’t change upon learning the consequent.
For example, “if the garbage can is green then frogs are amphibians” is true since frogs are amphibians, but this fact about frogs does not increase (or decrease) the probability that the garbage can is green since presumably, most of us don’t see a connection between the two propositions.
At some point in learning logic, I think I kind of lost touch with the common language use of conditionals as asserting connections. I like that Jaynes reminds us of the distinction.