What's for lunch?
Okay, let's clarify a few things here.
First, a proposition is simply a statement, the sort of thing that is either true or false. Propositions include "1 = 1", "NOT (1 = 1)", "There is a gold nugget thirty-seven feet under my house," and so on.
Now, as far as your usage of "believes" goes, I have two points to make.
(A)
(1) Your usage is quite different than the conventional meaning of "believes".
(B)
Now, definitions of terms like "believes" are generally given by stipulation, so there's nothing inherently wrong with using a different definition -- aside from the fact that you cause needless confusion when one definition has become conventional.
(C)
But, you seem to think that you have the "right" definition and anyone else is wrong. This is, of course, nonsense. The meanings of words are settled by convention and stipulation. Some definitions are more well-suited for their purpose than others, however, and your own usage of "believes" lacks any clear definition at all.
(D)
(2) Your own usage of the term is inconsistent.
We lack a clear definition of "believes" (in the sense you use it), so I have asked you questions about your usage. You have said that both of the following sentences are "untruthful" and hence false.
(a) N believes N is conscious.
(b) N does not believe N is conscious.
(E)
The negations of these two sentences are
(a') N does not believe N is conscious.
(b') It is not the case that N does not believe N is conscious.
If (a) and (b) are false, then (a') and (b') are true. That's what false means. But this is obviously a logical contradiction.
(F)
There's really nothing more to say at this point. You've shown that your own intuitions about belief are inconsistent. You have to go back and fix that inconsistency if you want to discuss anything meaningful at all.
(G)
But, generally speaking, you seem completely certain about your intuitions, with no real consideration or exposure to any of the topics at hand. Clearly, you've never read epistemology, logic or likely anything dealing with probability theory, but in each case, affirmed that you know better than the decades to centuries of work that's come before you. You've casually rejected the law of excluded middle the way some people choose a sandwich for lunch.
I just can't see this conversation leading to any fruitful end.
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(A) As far as I am concerned, the conversation has been very fruitful.
It has shown me how philosophy works its own particular magic, and how the interchangeability of particular words effectively nullify the clarity of those words.
"I said [________] but I meant [_______] ... you should have realized that!"
Conventionally convenient.
(B) As far as I am concerned, to believe something is true is different from knowing it is true.
At the moment I am involved with interacting with a christian who appears to be using the same argument that you are.
I replied to him last night, telling him about this conversation I am involved with in this thread.
I finished the email with these words.
"So you see this problem of philosophy seems handy for skirting around truthfulness. My problem with your particular interchanging 'belief' with 'knowing' is that you can speak your belief as something you know to be true, when the truth of the matter is you simply believe it to be true.
You can see in the above discussion that this personality appears to be taking a similar stance as you, and he/she and I are no further ahead in resolving the issue so that we can even be on the same page.
This is also true in regard to you and I. If you are unwilling to admit that what you believe to be true is only what you believe rather than what you know to be true, I have no interest in continuing communication with you."
As far as my having the 'right' definition (and thus everyone else must be wrong) this is not truthful.
The problem really is in the agreed consensus that the words know and believe can be and are used in interchangeable fashion as if they mean the same thing - seemingly because philosophers haven't been able to get on the same page about it.
Now I suspect that this might have something to do with the possibility that if there were clear definition between knowing truth and believing knowledge, a greater percentage of philosophies would be null and void.
But whatever the reason is, it warrants examination.
(C)
Convention and stipulation are not carved into stone or immovable. Indeed - open minded skepticism and critical thinking techniques are primary tools for stripping/chipping away at convention and stipulation which are based on philosophies of belief.
My own use of belief is pretty simple in definition. Something which is believed without evidence of its truth, or truthfulness.
I think that is clear enough.
(D) This is where you continue to bark like a dog as if I am a sheep needing to be corralled into a place you want me to be.
I have and will continue to speak about knowing, to know what is true. I am not focused upon belief at all, and in this both sentences you offered were answered truthfully by me, because (a) and (b) are both untruthful.
(a) N believes N is conscious.
(b) N does not believe N is conscious.
And you persist with trying to spin it back to belief, a case of belief...what is with that?
I not only said it was untruthful, but I went a step further and showed how it would be written in order for it to be truthful.
I do not believe I am conscious, I KNOW I am conscious.
Simple.
thus
(a) in truth is 'N Knows N is conscious.'
(b) in truth is ' N does not believe N is conscious, N knows N is conscious'
Drop the 'belief' as it is not necessary. (Convention/stipulation in this regard are based on belief, not truth)
Do you see?
(a) N believes N is conscious.
If you take the opposing or negative stand:
(b) N does not believe N is conscious.
It actually does not align with logic. How can someone conscious of their self believe they are not conscious of their self?
(E)
Firstly (a') "N does not believe N is conscious." is illogical. It is a false statement. It is a statement that has no merit.
The only way it could mean anything is to add "N
knows N is conscious"
Then this: (b') "It is not the case that N does not believe N is conscious." implies that
it is the case that N believes N is conscious, which is still illogical because belief is not necessary. N
knows N is conscious.
There is absolutely no need for N to believe N is conscious.
All that is required is that N knows N is conscious.
Therefore:
(a) N knows N is conscious = "N is conscious"
(b) N does not know that N is conscious = 'N is not conscious'
(F) I don’t have beliefs. I know or I don’t know. Belief is illogical. There is nothing I ‘have to do about it.’
(G)
I realise that this is a philosophical thread and I only wanted to know where the truth fits in with this philosophy.
It is true I know little to nothing about philosophy, epistemology and its usefulness.
It is clear that we have nothing further to work with here, I agree.
