Math, asked by archanajha9698, 9 months ago

Prove that distinct equivalence classes are disjoint

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Answered by subhadra53

Answer:

For each a,b∈A, a∼b if and only if [a]=[b]. Two elements of A are equivalent if and only if their equivalence classes are equal. Any two equivalence classes are either equal or they are disjoint. This means that if two equivalence classes are not disjoint then they must be equal.

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