7384853
Description
Flashcards by Andreas Spitz, updated more than 1 year ago
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Created by Andreas Spitz
almost 9 years ago
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| Question | Answer |
| \[\in\] | is an element of |
| \[\notin\] | is not an element of |
| ⊆ | is a subset of |
| ⊂ | is a proper subset of |
| {\(x_1\), \(x_2\), ...} | the set with elements \(x_1\), \(x_2\), ... |
| {\(x\) : ...} | the set of all \(x\) such that |
| \(n\) (\(A\)) | the number of elements in set \(A\) |
| \[\emptyset\] | the empty set |
| ε | the universal set |
| \[A^ ′ \] | the complement of the set \(A\) |
| \[N\] | the set of natural numbers, {1, 2, 3, ...} |
| \[Z\] | the set of integers {0,\(\pm1\), \(\pm2\), \(\pm3\)...} |
| \[Z^+\] | the set of positive integers, {1,2,3, ... } |
| \[Z^+_0\] | the set of non-negative integers, {0, 1, 2, 3, …} |
| \[R\] | the set of real numbers |
| \[Q\] | the set of rational numbers, |
| \[\cup\] | union |
| \[\cap\] | intersection |
| (\(x\), \(y\)) | the ordered pair \(x\), \(y\) |
| [\(a\), \(b\)] | the closed interval {\(x\)\(\in\)\(R\) : \(a\)\(\leq\)\(x\)\(\leq\)\(b\)} |
| [\(a\), \(b\)) | the interval {\(x\)\(\in\)\(R\) : \(a\)\(\leq\)\(x\)<\(b\)} |
| (\(a\), \(b\)] | the closed interval {\(x\)\(\in\)\(R\) : \(a\)<\(x\)\(\leq\)\(b\)} |
| (\(a\), \(b\)) | the open interval {\(x\)\(\in\)\(R\) : \(a\)<\(x\)<\(b\)} |
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