User:Peter Schmitt/Notes: Difference between revisions
Jump to navigation
Jump to search
imported>Peter Schmitt No edit summary |
imported>Peter Schmitt No edit summary |
||
Line 1: | Line 1: | ||
<{{{C}}}={{{A}}}>{{{B}}}<{{{D}}}> // A={{{A}}} B={{{B}}} | <{{{C}}}={{{A}}}>{{{{{{B}}}}}<{{{D}}}> // A={{{A}}} B={{{B}}} | ||
<noinclude> | <noinclude> | ||
{{r|Cardinality}} | {{r|Cardinality}} |
Revision as of 13:01, 14 August 2009
<{{{C}}}={{{A}}}>{{{{{{B}}}}}<{{{D}}}> // A={{{A}}} B={{{B}}}
- Cardinality [r]: The size, i.e., the number of elements, of a (possibly infinite) set. [e]
- Countable set [r]: A set with as many elements as there are natural numbers, or less. [e]
- Countable [r]: In mathematics, a property of sets — see: Countable set (A set with as many elements as there are natural numbers, or less.) [e]
- Uncountable [r]: In mathematics, a property of sets — see: Countable set (A set with as many elements as there are natural numbers, or less.) [e]
- Uncountable set [r]: A set with more elements than there are natural numbers. (See: Countable set.) [e]
- Transfinite number [r]: An infinite number, either a cardinal number or an ordinal number. [e]
- Cardinal number [r]: The generalization of natural numbers (as means to count the elements of a set) to infinite sets. [e]
- Ordinal number [r]: The generalization of natural numbers (as means to order sets by size) to infinite sets. [e]
- Infinity [r]: Add brief definition or description
- Infinite set [r]: The number of its elements is larger than any natural number. (See: Finite set.) [e]
- Finite set [r]: The number of its elements is a natural number (0,1,2,3,...) [e]
- Finite and infinite [r]: The distinction between bounded and unbounded in size (number of elements, length, area, etc.) [e]
- Hilbert's hotel [r]: A fictional story which illustrates certain properties of infinite sets. [e]
- Galileo's paradox [r]: The observation that there are fewer perfect squares than natural numbers but also equally many. [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]
- Zero (mathematics) [r]: The number of elements in an empty set, and a digit or symbol. [e] 0 0 (number) zero zero (disambiguation)