Set Notations in LaTeX
Set notation –
In set theory and its applications to logic, mathematics, and computer science, set-builder notation is a mathematical notation for describing a set by enumerating its elements or stating the properties that its members must satisfy.
For example, empty set is represented as .
So Let’s see the latex code of Set Notations one by one.
Set notation and their Latex Code :
TERM | SYMBOL | LATEX |
---|---|---|
1. empty set | ![]() |
\varnothing |
2. set of natural numbers | ![]() |
\mathbb{N} |
3. set of integers | ![]() |
\mathbb{Z} |
4. set of rational numbers | ![]() |
\mathbb{Q} |
5. set of algebraic numbers | ![]() |
\mathbb{A} |
6. set of real numbers | ![]() |
\mathbb{R} |
7. set of complex numbers | ![]() |
\mathbb{C} |
8. is member of | ![]() |
]\in |
9. is not member of | ![]() |
\notin |
10. owns (has member) | ![]() |
\ni |
11. is proper subset of | ![]() |
\subset |
12. is subset of | ![]() |
\subseteq |
13. is proper superset of | ![]() |
\supset |
14. is superset of | ![]() |
\supseteq |
15. set union | ![]() |
\cup |
15. set intersection | ![]() |
\cap |
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