The only issue I have is with the “and” conjunction within the conclusion when it comes to validity.
Okay.ruby sparks said:
Yes, but if you do not know that, it is not clear to me that you get that A1, A2 and A3 are valid, because it is not clear to me that you understand the meaning of "valid", at least in this context.ruby sparks said:
In the other thread, Speakpigeon made the claim that a conclusion and its negation cannot both follow, and she has not conceded that her claim was false. Several people have been confused in the other thread, perhaps as a result of her claim, or perhaps on their own, or a combination. I am trying to clear the matter a little bit, at least hopefully for some of the readers.ruby sparks said:If yes, I'm bound to ask, what is the point? I don't mean that rudely. I mean, so what if it's valid?
I do not think so, but I would need more information about what the logic machine does.ruby sparks said:
You could, but I would disagree. It is not nonsensical. If it were, one would not understand it at all.ruby sparks said:
I'm not sure what it means to "invoke a contradiction" in the set of premises, but yes, the set of premises is an inconsistent set of statements (equivalently, they can't all be true; equivalently, they entail a contradiction; equivalently, the conjunction of the premises is a contradiction).ruby sparks said:
Whether the machine will flash depends on what it does. But having contradictory premises is not a reason to reject an argument. If it were, then a lot of math papers would have to be rejected. But despite Speakpigeon's attacks against mathematicians and mathematics, the fact is that there is nothing wrong with those papers, which have furthered knowledge in many areas of mathematics - and some of those have practical applications.ruby sparks said:
Logic simply abstracts from the method of thought a person uses (e.g., modus ponens is one method of thinking). Nothing, therefore, prevents a logic that abstracts from perverse methods of thought such as asserting a contradiction. These logics might even be "useful" in some situations. They just aren't based on reality or reason.
The methods used in modern logic are based on reason, and they often are applicable to reality. Mathematics is full of arguments that, from some hypotheses, reach a contradiction. That is useful to disprove hypotheses.
Okay, you got it.ruby sparks said:
Yes, and I would say - following nearly every logician, mathematician or philosopher - that even if they are not in the premises. For example, "Joe is an elephant" and its negation "It is not the case that Joe is an elephant" both follow from the premises of A4, but only one of them is one of the premises. In fact, even if neither of them were in the premises, both a conclusion and its negation could follow. For example, we can modify A4 as follows:ruby sparks said:
Sure, though the full set of premises is inconsistent. It might be that any proper subset is consistent. In particular, there need not be two premises that contradict each other (e.g., ee A8 above, or even A4).ruby sparks said:
That is correct.ruby sparks said:
Those are two different things. That the (stated) conclusion isn't the only thing that follows from the premises is also a property of A4, A8, and a lot of other arguments that need all of the premises to derive the stated conclusion. I don't think there is a special term for that, other than saying that one or more of the premises are unnecessary, superfluous, etc.ruby sparks said:
Actually, the correct answer would be (in most such exams) that every statement follows from the premises of A4 (or A5, or A8). That is because every statement follows from a contradiction. That is the principle of explosion, which is accepted by nearly everyone. There are some philosophers who oppose it, though, and paraconsistent logics do not have it. But that is another matter, central in the other thread but not related to whether a conclusion and its negation can both follow, which as far as I know everyone accepts (well, everyone in the fields of philosophy, math and logic).ruby sparks said:
That's valid. Whether a premise has skin in the game or not is not relevant when it comes to validity.fast said:
fast said:
That is invalid. But the matter is not about whether the premise has skin in the game.fast said:
1 and 3 do not imply C, but 2 and 3 imply everything (including C and its negation). So, it is valid. However, that is not what I wanted to focus on this thread, because I wanted to separate the matter of explosion from that of whether a conclusion and its negation can both follow.fast said:
Sure, we freely choose our premises.fast said:
If you're saying that there are true contradictions (which is how I read your post), then your ideas have nothing to do with reason or reality. If that's not what you're saying then okay.
