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- Cantor–Dedekind_axiom abstract "In mathematical logic, the phrase Cantor–Dedekind axiom has been used to describe the thesis that the real numbers are order-isomorphic to the linear continuum of geometry. In other words, the axiom states that there is a one to one correspondence between real numbers and points on a line.This axiom is the cornerstone of analytic geometry. The Cartesian coordinate system developed by René Descartes explicitly assumes this axiom by blending the distinct concepts of real number system with the geometric line or plane into a conceptual metaphor. This is sometimes referred to as the real number line blend:A consequence of this axiom is that Alfred Tarski's proof of the decidability of the ordered real field could be seen as an algorithm to solve any problem in Euclidean geometry.".
- Cantor–Dedekind_axiom wikiPageID "1595873".
- Cantor–Dedekind_axiom wikiPageLength "1692".
- Cantor–Dedekind_axiom wikiPageOutDegree "16".
- Cantor–Dedekind_axiom wikiPageRevisionID "675482351".
- Cantor–Dedekind_axiom wikiPageWikiLink Alfred_Tarski.
- Cantor–Dedekind_axiom wikiPageWikiLink Algorithm.
- Cantor–Dedekind_axiom wikiPageWikiLink Analytic_geometry.
- Cantor–Dedekind_axiom wikiPageWikiLink Cartesian_coordinate_system.
- Cantor–Dedekind_axiom wikiPageWikiLink Category:Mathematical_axioms.
- Cantor–Dedekind_axiom wikiPageWikiLink Category:Real_numbers.
- Cantor–Dedekind_axiom wikiPageWikiLink Conceptual_metaphor.
- Cantor–Dedekind_axiom wikiPageWikiLink Decidability_(logic).
- Cantor–Dedekind_axiom wikiPageWikiLink Euclidean_geometry.
- Cantor–Dedekind_axiom wikiPageWikiLink Geometry.
- Cantor–Dedekind_axiom wikiPageWikiLink Isomorphic.
- Cantor–Dedekind_axiom wikiPageWikiLink Isomorphism.
- Cantor–Dedekind_axiom wikiPageWikiLink Linear_continuum.
- Cantor–Dedekind_axiom wikiPageWikiLink Mathematical_logic.
- Cantor–Dedekind_axiom wikiPageWikiLink Philip_Ehrlich.
- Cantor–Dedekind_axiom wikiPageWikiLink Real_number.
- Cantor–Dedekind_axiom wikiPageWikiLink René_Descartes.
- Cantor–Dedekind_axiom wikiPageWikiLinkText "Cantor–Dedekind axiom".
- Cantor–Dedekind_axiom hasPhotoCollection Cantor–Dedekind_axiom.
- Cantor–Dedekind_axiom wikiPageUsesTemplate Template:Google_books.
- Cantor–Dedekind_axiom wikiPageUsesTemplate Template:Mathlogic-stub.
- Cantor–Dedekind_axiom wikiPageUsesTemplate Template:Reflist.
- Cantor–Dedekind_axiom subject Category:Mathematical_axioms.
- Cantor–Dedekind_axiom subject Category:Real_numbers.
- Cantor–Dedekind_axiom comment "In mathematical logic, the phrase Cantor–Dedekind axiom has been used to describe the thesis that the real numbers are order-isomorphic to the linear continuum of geometry. In other words, the axiom states that there is a one to one correspondence between real numbers and points on a line.This axiom is the cornerstone of analytic geometry.".
- Cantor–Dedekind_axiom label "Cantor–Dedekind axiom".
- Cantor–Dedekind_axiom sameAs بديهية_كانتور_-_ديديكند.
- Cantor–Dedekind_axiom sameAs Aksiomo_de_Cantor-Dedekind.
- Cantor–Dedekind_axiom sameAs Axioma_van_Cantor-Dedekind.
- Cantor–Dedekind_axiom sameAs Axioma_de_Cantor-Dedekind.
- Cantor–Dedekind_axiom sameAs m.05f9ps.
- Cantor–Dedekind_axiom sameAs Aksioma_e_Cantorit.
- Cantor–Dedekind_axiom sameAs Q1860722.
- Cantor–Dedekind_axiom sameAs Q1860722.
- Cantor–Dedekind_axiom wasDerivedFrom Cantor–Dedekind_axiom?oldid=675482351.
- Cantor–Dedekind_axiom isPrimaryTopicOf Cantor–Dedekind_axiom.