## Philosophy Lexicon of Arguments | |||

Sets: a set is a summary of objects relating to a property. In the set theory, conditions are established for the formation of sets. In general, sets of numbers are considered. Everyday objects as elements of sets are special cases and are called primordial elements. Sets are, in contrast to e.g. sequences not ordered, i.e. no order is specified for the consideration of the elements. See also element relation, sub-sets, set theory, axioms. | |||

Author | Item | Excerpt | Meta data |
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Books on Amazon |
I 49 Sets / Mates: for any propositional function there is a set, but not vice versa - basic: there are more sets than propositional functions - ((s)> power set,> irrational numbers). |
Mate I B. Mates Elementare Logik GĂ¶ttingen 1969 Mate II B. Mates 0226509869 1981 |

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Ed. Martin Schulz, access date 2017-05-26