Russell's Paradox [and ZFC optional]
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Russell's Paradox
In Russell's Paradox, \(W \) is mathematically well-defined as a set. The question resides with "which well-defined collections are sets?" Russell's Paradox is not relevant when \(W \) is not a set; even Russell himself knew that it was unjustified to assume that \(W \) was a set! ZFC avoided Russell's Paradox by not allowing \(W \) to be a set. -
Zermelo-Frankel with Choice axioms (ZFC)