This is probably hard to believe but I do not have the intuitions necessary to see the “mysteries” of some paradoxes. For example, the liar paradox “this sentence is false” simply appears meaningless to me and I do not enter the logic of: If 'This sentence is false.” is true, then since it is stating that the sentence is false, if it is actually true that would mean that it is false, and so on.
Language conveys information and I can’t extract relevant information from this sentence, this is why I do not understand why people manage to reason logically with it. — Skalidris

In general, if a sentence such as (1) asserts that (all, some, most, etc.) of the sentences of a certain class C are true, its truth value can be ascertained if the truth values of the sentences in the class C are ascertained. If some of these sentences themselves involve the notion of truth, their truth value in turn must be ascertained by looking at other sentences, and so on. If ultimately this process terminates in sentences not mentioning the concept of truth, so that the truth value of the original statement can be ascertained, we call the original sentence grounded; otherwise, ungrounded.

The first one is the sentence “The sun is yellow”, and the second one is “this sentence is false”. — Skalidris

Let's assume the correspondence theory of truth1: that a sentence is true is that it corresponds to a fact. We can use this to rephrase the liar sentence:

1. This sentence does not correspond to a fact.

We can also consider:

2. (3) corresponds to a fact.
3. (2) does not correspond to a fact.

Do (1), (2), and (3) each correspond to a fact?

1 Even if it's incorrect, the question above is worth considering. — Michael

If 'This sentence is false.” is true, then since it is stating that the sentence is false, if it is actually true that would mean that it is false, and so on.
Language conveys information and I can’t extract relevant information from this sentence, this is why I do not understand why people manage to reason logically with it. — Skalidris

For example, the liar paradox “this sentence is false” simply appears meaningless to me and I do not enter the logic of: If 'This sentence is false.” is true, then since it is stating that the sentence is false, if it is actually true that would mean that it is false, and so on. — Skalidris

For example, the liar paradox “this sentence is false” simply appears meaningless to me and I do not enter the logic ... — Skalidris

Its just a bad contraction. If we break out the sentence into its full meaning, its fine.

A. This is a sentence. True
B. The sentence in point A is a false sentence. False.

There ya go. — Philosophim

This sentence contains 36 characters

Should we break the above sentence into the below?

A. This is a sentence
B. The sentence in point A contains 36 characters — Michael

Except you can’t break it down that way because “This sentence contains 36 characters” is true but “The sentence in point A contains 36 characters” is false. — Michael

Most "paradoxes" are simply self-contradictory, self-refuting or circular statements or statements based on a false hypotheses. In short, invalid statements. — Alkis Piskas

the paradox is right there in the initial version of Principia Mathematica — Banno

What if you may already intuitively understand that the statement is lacking substance? — Vaskane

Therefore, if someone uttered the statement, it would beg the question, "Which sentence do you mean?" — Corvus

The term "paradox" is overrated and abused. Most "paradoxes" are simply self-contradictory, self-refuting or circular statements or statements based on a false hypotheses. — Alkis Piskas

There are such factors as perspective and relativity, which alone leave certain paradoxes "open" or "unsolvable". E.g. The Ship of Theseus paradox (thought experiment). — Alkis Piskas

Yes, my reaction exactly. The most intriguing thing about this paradox is that a lot of people don't mind reasoning with something that is empty of meaning... Probably because they did not check that it actually has meaning prior entering this logic loop. — Skalidris

The Ship of Theseus paradox looks more like a philosophical or linguistic issue than a paradox. — Skalidris

I think we can show this by considering the complement of a liar sentence:

1. This sentence is true

If (1) is true then there is no paradox. If (1) is not true then there is no paradox. But is (1) true or not true? — Michael

disagreed that a and 2 are equivalent — Brendan Golledge

When you used formal logic, you didnt prove that x is true — Brendan Golledge

or that x->y is true — Brendan Golledge

If A is false, then B is not false. Given the definition of the sentence you are using, A is false (or meaningless) and B is true. — Brendan Golledge

As for your formal logic, I think I am confused about whether you are asserting logic or truth. For instance, I cant tell whether you mean, "if X is true, then Y is true" (I agree with this logic) or "X IS true, and therefore Y is true" (I disagree with this because I think X is either false or meaningless). — Brendan Golledge

1. X := (X → Y)
2. X → X
3. X → (X → Y)
4. X → Y (from 3 by contraction)
5. X (substitute 4 by 1)
6. Y (from 4 and 5) — Michael

1. X means that if X is true then Y is true (definition)
2. If X is true then X is true (law of identity)
3. If X is true then if X is true then Y is true is true (switch in the definition of X given in (1))
4. If X is true then Y is true (from 3 by contraction)
5. X is true (switch out the definition of X given in (1))
6. Y (from 4 and 5) — Michael

A) if this sentence is true then Germany borders China
B) if (A) is true then Germany borders China — Michael

If A is false, then B is not false. Given the definition of the sentence you are using, A is false (or meaningless) and B is true.

"A" is not the same as B: "if A is true, then the statement given by A is true". B as written here is true regardless of the truth value of A. I could just as well write, A: "The sky is pink" and B: "if A is true, then the sky is pink". This A is false and this B is true. — Brendan Golledge

"A" is not the same as B: "if A is true, then the statement given by A is true". B as written here is true regardless of the truth value of A. I could just as well write, A: "The sky is pink" and B: "if A is true, then the sky is pink". This A is false and this B is true. — Brendan Golledge

But the paper went on further to prove that if 6 is false, then 1 must also be false. So, it is a bad definition. — Brendan Golledge

You can also do a truth table of X, Y, and X -> Y and see that X <-> (X -> Y) is false. — Brendan Golledge

Is this statement false? If I've done the truth table right, then it means that the first line of the proof is wrong. — Brendan Golledge