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Two mathematical objects are equal if and only if they are precisely the same in every way. This defines a Binary Relation , '''equality''', denoted by the '''sign of equality''' " = " in such a way that the statement "''x'' = ''y''" means that ''x'' and ''y'' are equal. Equivalence in a more general sense is provided by the construction of an Equivalence Relation between two elements. A statement that two Expression s denote equal quantities is an Equation . Beware that sometimes a statement of the form "A = B" may not be an equality. For example, the statement ''T''(''n'') = O(''n''2) means that ''T''(''n'') grows at the ''order'' of ''n''2. It is not an equality, because the sign "=" in the statement is not the equality sign; indeed, it is meaningless to write O(''n''2) = ''T''(''n''). See Big O Notation for more on this. Given a set ''A'', the restriction of equality to the set ''A'' is a Binary Relation , which is at once Reflexive , Symmetric , Antisymmetric , and Transitive . Indeed it is the only relation on ''A'' with all these properties. Dropping the requirement of antisymmetry yields the notion of Equivalence Relation . Conversely, given any equivalence relation ''R'', we can form the representative of a class. LOGICAL FORMULATIONS The equality relation is always defined such that things that are equal have all and only the same properties. Often equality is just defined as Identity . A stronger sense of equality is obtained if some form of Leibniz's Law is added as an Axiom ; the assertion of this axiom rules out "bare particulars"—things that have all and only the same properties but are not equal to each other—which are possible in some logical formalisms. The axiom states that two things are equal if they have all and only the same Properties . Formally: : Given Any ''x'' and ''y'', ''x'' = ''y'' If , given any Predicate ''P'', ''P''(''x'') iff ''P''(''y''). In this law, the connective "iff" (meaning "if and only if") can be weakened to "if"; the modified law is equivalent to the original. Instead of considering Leibniz's law as an axiom, it can also be taken as the ''definition'' of equality. The property of being an equivalence relation, as well as the properties given below, can then be proved: they become Theorem s. SOME BASIC LOGICAL PROPERTIES OF EQUALITY The substitution property states:
In First Order Logic , this is a Schema , since we can't quantify over expressions like ''F'' (which would be a Functional Predicate ). Some specific examples of this are:
The reflexive property states: : For Any quantity ''a'', ''a'' = ''a''. This property is generally used in Mathematical Proof s as an intermediate step. The symmetric property states: The transitive property states: The Binary Relation " Is Approximately Equal " between Real Number s or other things, even if more precisely defined, is not transitive (it may seem so at first sight, but many small Difference s can add up to something big). However, equality Almost Everywhere ''is'' transitive. Although the symmetric and transitive properties are often seen as fundamental, they can be proved from the substitution and reflexive properties. SEE ALSO |
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