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For a relation, $, to be called a partial ordering on a set, S, the following three properties must be met:
1) If T is any subset of S, then T $ T.
2) If T and U are any two subsets of S that meet the condition T $ U as well as the condition U $ T, then T = U.
3) If T, U, and V are any three subsets of S that meet the condition T $ U as well as the condition U $ V, then T $ V.
For the relation, $, to be called a total ordering on the set, S, the following statement must hold in addition to the previous three:
If T and U are any two subsets of S, then either T $ U or U $ T.
This final property is called totality.
For an example of a partial ordering relation, see the related link on "less than or equal to."
Also, see the corresponding related link for the definition of "relation."
What else can I help you with?
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the number of tuple in a relation is called the cordinality of a relation?
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The framework is the metal skeleton of the removable partial denture.
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Flake
What is an event that will never happen called?
partial
What is a negatively atom partial called?
Electrons
What is the cordinality of dbms?
the number of tuple in a relation is called the cordinality of a relation?
