Aleph-0/Related Articles: Difference between revisions
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imported>Jitse Niesen (start) |
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==Parent topics== | == Parent topics == | ||
{{r|cardinality}} | |||
{{r| | {{r|cardinal number}} | ||
{{r| | |||
{{r| | == Subtopics == | ||
{{r| | |||
{{r|countable set}} | |||
== Other related topics == | |||
{{r|continuum hypothesis}} | |||
{{r|natural number}} | |||
==Articles related by keyphrases (Bot populated)== | |||
{{r|Continuum hypothesis}} | {{r|Continuum hypothesis}} | ||
{{r| | {{r|Axiom of choice}} | ||
{{r| | {{r|Guilt in U.S. law}} | ||
{{r| | {{r|Transfinite number}} | ||
Latest revision as of 06:01, 8 July 2024
- See also changes related to Aleph-0, or pages that link to Aleph-0 or to this page or whose text contains "Aleph-0".
Parent topics
- Cardinality [r]: The size, i.e., the number of elements, of a (possibly infinite) set. [e]
- Cardinal number [r]: The generalization of natural numbers (as means to count the elements of a set) to infinite sets. [e]
Subtopics
- Countable set [r]: A set with as many elements as there are natural numbers, or less. [e]
- Continuum hypothesis [r]: A statement about the size of the continuum, i.e., the number of elements in the set of real numbers. [e]
- Natural number [r]: An element of 1, 2, 3, 4, ..., often also including 0. [e]
- Continuum hypothesis [r]: A statement about the size of the continuum, i.e., the number of elements in the set of real numbers. [e]
- Axiom of choice [r]: Set theory assertion that if S is a set of disjoint, non-empty sets, then there exists a set containing exactly one member from each member of S. [e]
- Guilt in U.S. law [r]: Add brief definition or description
- Transfinite number [r]: An infinite number, either a cardinal number or an ordinal number. [e]