Summary Of: Cardinal numbers

Encyclodia Page On: Cardinal numbers

These Are Links To Other Documents

Names of numbers in English | | | mathematics | numbers | cardinality | sets | finite sets | natural number | transfinite | bijective functions | Georg Cantor | real numbers | natural numbers | natural numbers | aleph numbers | well-ordered sets | ordinal numbers | axiom of choice | rejects | set theory | combinatorics | abstract algebra | mathematical analysis | Georg Cantor | set theory | one-to-one correspondence | transfinite cardinal numbers | denumerable (countably infinite) sets | aleph-null | ordered pairs | rational numbers | algebraic numbers | original presentation | nested intervals | diagonal argument | cardinality of the continuum | continuum hypothesis | counting number | natural numbers | finite | infinite sets | injective | mapping | onto | sets | bijection | Schroeder-Bernstein theorem | von Neumann cardinal assignment | well-ordering principle | Hilbert's paradox of the Grand Hotel | ordinals | real numbers | Cantor's diagonal argument | continuum hypothesis | axiom of choice | von Neumann cardinal assignment | Principia Mathematica | ZFC | axiomatic set theory | type theory | New Foundations | rank | Dana Scott | injective | Cantor–Bernstein–Schroeder theorem | axiom of choice | Dedekind-infinite | proper subset | Dedekind-finite | finite | natural numbers | infinite | Hebrew alphabet | ordinal | arithmetic | Successor cardinal | successor ordinal | disjoint | union | associative | commutative | cartesian product | commutative | distributes | functions | empty function | power set | Cantor's diagonal argument | class | proper class | König's theorem | cofinality | continuum hypothesis | cardinality of the continuum | real numbers | generalized continuum hypothesis | ZFC | Counting | Names of numbers in English | Large cardinal | Nominal number | Ordinal number | Serial number | | Mathematics portal | The paradox of the greatest cardinal | Aleph number | Beth number | Halmos, Paul | Naive set theory | ISBN 0-387-90092-6 | Eric W. Weisstein | MathWorld | v | d | Number systems | Natural numbers | Negative numbers | Integers | Rational numbers | Irrational numbers | Real numbers | Imaginary numbers | Complex numbers | Algebraic numbers | Transcendental numbers | Quaternions | Octonions | Sedenions | Cayley–Dickson construction | Split-complex numbers | Bicomplex numbers | Biquaternions | Split-quaternions | Tessarines | Hypercomplex numbers | Musean hypernumbers | Superreal numbers | Hyperreal numbers | Supernatural numbers | Surreal numbers | Dual numbers | Transfinite numbers | Extended real numbers | Ordinal numbers | p-adic numbers | Category | Cardinal numbers |