Boolean algebra/Related Articles: Difference between revisions
Jump to navigation
Jump to search
imported>John R. Brews (Related topics) |
Pat Palmer (talk | contribs) m (Text replacement - "{{r|History of neuroimaging}}" to "") |
||
| (2 intermediate revisions by 2 users not shown) | |||
| Line 17: | Line 17: | ||
==Other related topics== | ==Other related topics== | ||
<!-- List topics here that are related to this topic, but neither wholly include it nor are wholly included by it. --> | <!-- List topics here that are related to this topic, but neither wholly include it nor are wholly included by it. --> | ||
{{r|Logic symbols}} | |||
{{r|Set (mathematics)}} | {{r|Set (mathematics)}} | ||
{{r|Set theory}} | {{r|Set theory}} | ||
{{r|Venn diagram}} | {{r|Venn diagram}} | ||
==Articles related by keyphrases (Bot populated)== | |||
{{r|Free will}} | |||
{{r|Standard argument against free will}} | |||
{{r|Kurt Gödel}} | |||
{{r|Number theory}} | |||
Latest revision as of 10:57, 5 October 2024
- See also changes related to Boolean algebra, or pages that link to Boolean algebra or to this page or whose text contains "Boolean algebra".
Parent topics
Subtopics
- Logic symbols [r]: A shorthand for logical constructions [e]
- Set (mathematics) [r]: Informally, any collection of distinct elements. [e]
- Set theory [r]: Mathematical theory that models collections of (mathematical) objects and studies their properties. [e]
- Venn diagram [r]: A visual representation of inclusion relations of sets or logical propositions by arrangements of regions in the plane. [e]
- Free will [r]: The intuition, or philosophical doctrine, that one can control one's actions or freely choose among alternatives. [e]
- Standard argument against free will [r]: An argument proposing a conflict between the possibility of free will and the postulates of determinism and indeterminism. [e]
- Kurt Gödel [r]: (1906-1978) Austrian-born, American mathematician, most famous for proving that in any logical system rich enough to describe naturals, there are always statements that are true but impossible to prove within the system; considered to be one of the most important figures in mathematical logic in modern times. [e]
- Number theory [r]: The study of integers and relations between them. [e]