![]() ![]() These allow some contradictory statements to be proven without affecting other proofs. In a different solution to these problems, a few mathematicians have devised alternative theories of logic called paraconsistent logics, which eliminate the principle of explosion. However, since we know that "Not all lemons are yellow" (as this has been assumed), the first part is false, and hence the second part must be true to ensure the two-part statement to be true, i.e., unicorns exist.Therefore, the two-part statement "All lemons are yellow or unicorns exist" must also be true, since the first part "All lemons are yellow" of the two-part statement is true (as this has been assumed).We know that "All lemons are yellow", as it has been assumed to be true.We know that "Not all lemons are yellow", as it has been assumed to be true.If that is the case, anything can be proven, e.g., the assertion that " unicorns exist", by using the following argument: Mathematicians such as Gottlob Frege, Ernst Zermelo, Abraham Fraenkel, and Thoralf Skolem put much effort into revising set theory to eliminate these contradictions, resulting in the modern Zermelo–Fraenkel set theory.Īs a demonstration of the principle, consider two contradictory statements-"All lemons are yellow" and "Not all lemons are yellow"-and suppose that both are true. Around the turn of the 20th century, the discovery of contradictions such as Russell's paradox at the foundations of mathematics thus threatened the entire structure of mathematics. ![]() Due to the principle of explosion, the existence of a contradiction ( inconsistency) in a formal axiomatic system is disastrous since any statement can be proven, it trivializes the concepts of truth and falsity. The proof of this principle was first given by 12th-century French philosopher William of Soissons. genre, date, album artist.Theorem which states that any statement can be proven from a contradiction
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