Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Countable_set> ?p ?o }
- Countable_set abstract "In mathematics, a countable set is a set with the same cardinality (number of elements) as some subset of the set of natural numbers. A countable set is either a finite set or a countably infinite set. Whether finite or infinite, the elements of a countable set can always be counted one at a time and, although the counting may never finish, every element of the set is associated with a natural number.Some authors use countable set to mean countably infinite alone. To avoid this ambiguity, the term at most countable may be used when finite sets are included and countably infinite, enumerable, or denumerable otherwise.The term countable set was introduced by Georg Cantor who contrasted sets which are countable with those which are uncountable (a.k.a. nonenumerable or nondenumerable). Today, countable sets form the foundation of a branch of mathematics called discrete mathematics.".
- Countable_set wikiPageID "6026".
- Countable_set wikiPageLength "23677".
- Countable_set wikiPageOutDegree "88".
- Countable_set wikiPageRevisionID "681734990".
- Countable_set wikiPageWikiLink Aleph_number.
- Countable_set wikiPageWikiLink Algebraic_number.
- Countable_set wikiPageWikiLink Axiom_of_countable_choice.
- Countable_set wikiPageWikiLink Bijection.
- Countable_set wikiPageWikiLink Cantors_Theorem.
- Countable_set wikiPageWikiLink Cantors_diagonal_argument.
- Countable_set wikiPageWikiLink Cantors_first_uncountability_proof.
- Countable_set wikiPageWikiLink Cantors_theorem.
- Countable_set wikiPageWikiLink Cardinal_number.
- Countable_set wikiPageWikiLink Cardinality.
- Countable_set wikiPageWikiLink Cartesian_product.
- Countable_set wikiPageWikiLink Category:Basic_concepts_in_infinite_set_theory.
- Countable_set wikiPageWikiLink Category:Cardinal_numbers.
- Countable_set wikiPageWikiLink Category:Infinity.
- Countable_set wikiPageWikiLink Constructible_universe.
- Countable_set wikiPageWikiLink Counting.
- Countable_set wikiPageWikiLink Denominator.
- Countable_set wikiPageWikiLink Discrete_mathematics.
- Countable_set wikiPageWikiLink Disjoint_sets.
- Countable_set wikiPageWikiLink Domain_of_a_function.
- Countable_set wikiPageWikiLink Finite_intersection_property.
- Countable_set wikiPageWikiLink Finite_set.
- Countable_set wikiPageWikiLink Fraction_(mathematics).
- Countable_set wikiPageWikiLink Function_(mathematics).
- Countable_set wikiPageWikiLink Georg_Cantor.
- Countable_set wikiPageWikiLink Hilberts_paradox_of_the_Grand_Hotel.
- Countable_set wikiPageWikiLink Infinite_set.
- Countable_set wikiPageWikiLink Injective_function.
- Countable_set wikiPageWikiLink Inner_model.
- Countable_set wikiPageWikiLink Integer.
- Countable_set wikiPageWikiLink Integers.
- Countable_set wikiPageWikiLink Löwenheim-Skolem_theorem.
- Countable_set wikiPageWikiLink Löwenheim–Skolem_theorem.
- Countable_set wikiPageWikiLink Map_(mathematics).
- Countable_set wikiPageWikiLink Mathematical_induction.
- Countable_set wikiPageWikiLink Mathematics.
- Countable_set wikiPageWikiLink McGraw-Hill.
- Countable_set wikiPageWikiLink McGraw_Hill_Financial.
- Countable_set wikiPageWikiLink Naive_Set_Theory.
- Countable_set wikiPageWikiLink Naive_set_theory.
- Countable_set wikiPageWikiLink Natural_number.
- Countable_set wikiPageWikiLink Natural_numbers.
- Countable_set wikiPageWikiLink Numerator.
- Countable_set wikiPageWikiLink One-one_correspondence.
- Countable_set wikiPageWikiLink Ordered_pair.
- Countable_set wikiPageWikiLink Ordinal_number.
- Countable_set wikiPageWikiLink Power_set.
- Countable_set wikiPageWikiLink Prime_number.
- Countable_set wikiPageWikiLink Rational_number.
- Countable_set wikiPageWikiLink Rational_numbers.
- Countable_set wikiPageWikiLink Real_number.
- Countable_set wikiPageWikiLink Recursion.
- Countable_set wikiPageWikiLink Recursively_enumerable_set.
- Countable_set wikiPageWikiLink Sequence.
- Countable_set wikiPageWikiLink Set_(mathematics).
- Countable_set wikiPageWikiLink Skolems_paradox.
- Countable_set wikiPageWikiLink Springer-Verlag.
- Countable_set wikiPageWikiLink Springer_Science+Business_Media.
- Countable_set wikiPageWikiLink Subset.
- Countable_set wikiPageWikiLink Surjective_function.
- Countable_set wikiPageWikiLink Total_order.
- Countable_set wikiPageWikiLink Transcendental_number.
- Countable_set wikiPageWikiLink Uncountable.
- Countable_set wikiPageWikiLink Uncountable_set.
- Countable_set wikiPageWikiLink Union_(set_theory).
- Countable_set wikiPageWikiLink Vector_space.
- Countable_set wikiPageWikiLink Vulgar_fraction.
- Countable_set wikiPageWikiLink Well-order.
- Countable_set wikiPageWikiLink Well_order.
- Countable_set wikiPageWikiLink File:Aplicación_2_inyectiva_sobreyectiva02.svg.
- Countable_set wikiPageWikiLink File:Countablepath.svg.
- Countable_set wikiPageWikiLink File:Pairing_natural.svg.
- Countable_set wikiPageWikiLinkText "Countable set".
- Countable_set wikiPageWikiLinkText "Countable_set".
- Countable_set wikiPageWikiLinkText "at most countable".
- Countable_set wikiPageWikiLinkText "countability".
- Countable_set wikiPageWikiLinkText "countable (or finite) sequence".
- Countable_set wikiPageWikiLinkText "countable set".
- Countable_set wikiPageWikiLinkText "countable state".
- Countable_set wikiPageWikiLinkText "countable subset".
- Countable_set wikiPageWikiLinkText "countable".
- Countable_set wikiPageWikiLinkText "countably infinite set".
- Countable_set wikiPageWikiLinkText "countably infinite".
- Countable_set wikiPageWikiLinkText "countably infinitely".
- Countable_set wikiPageWikiLinkText "countably many".
- Countable_set wikiPageWikiLinkText "countably".
- Countable_set wikiPageWikiLinkText "denumerable (countably infinite) sets".
- Countable_set wikiPageWikiLinkText "denumerable infinity".
- Countable_set wikiPageWikiLinkText "denumerable".
- Countable_set wikiPageWikiLinkText "discrete".
- Countable_set wikiPageWikiLinkText "finite or countable set".
- Countable_set wikiPageWikiLinkText "infinite".
- Countable_set wikiPageWikiLinkText "uncountable".
- Countable_set hasPhotoCollection Countable_set.
- Countable_set id "CountableSet".