"axiom of power set" meaning in All languages combined

See axiom of power set on Wiktionary

Proper name [English]

Head templates: {{en-proper noun|head=axiom of power set}} axiom of power set
  1. (set theory) The axiom that the power set of any set exists and is a valid set, which appears in the standard axiomatisation of set theory, ZFC. Wikipedia link: axiom of power set Categories (topical): Set theory Synonyms (axiom of set theory): power set axiom Translations (axiom of set theory): potenssijoukkoaksiooma (Finnish), assioma dell'insieme potenza [masculine] (Italian)
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          "ref": "1978, Thomas Jech, Set Theory, Academic Press, page 38:",
          "text": "The axiom of choice differs from other axioms of ZF by stating existence of a set (i.e., a choice function) without defining it (unlike, for instance, the axiom of pairing or the axiom of power set).",
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