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    Set theory underlies all branches of mathematics. — Carmelics
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    Supports→The inconsistency of set theory threatens the trustworthiness of all mathematical proofs.

    Set theory underlies all branches of mathematics.

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    The inconsistency of set theory threatens the trustworthiness of all mathematica...Using classical logic, all sentences follow from a contradiction.

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    Set theory was invented to provide mathematics with a foundation.83%Category theory has been proposed as an alternative foundation for mat...82%Peano Arithmetic (PA) is an arithmetical theory.82%Set theory entails the existence of huge infinities of mathematical ob...80%

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    SEP: russell-paradox
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    The significance of Russell’s paradox can be seen once it is realized that, using classical logic, all sentences follow from a contradiction. For example, assuming both \(P\) and \({\sim}P,\) any arbitrary proposition, \(Q\), can be proved as follows: from \(P\) we obtain \(P \vee Q\) by the rule of Addition; then from \(P \vee Q\) and \({\sim}P\) we obtain \(Q\) by the rule of Disjunctive Syllogism. Because set theory underlies all branches of mathematics, many people began to worry that the in

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