Prove that the inverse of one-one onto mapping is unique.
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One one means distinct elements of a set have distinct images in other set
Where as in onto means that every element in a set have at least has one pre image in other So the inverse must be a unique set when they follow the defination of one-one onto ( bijection )
Where as in onto means that every element in a set have at least has one pre image in other So the inverse must be a unique set when they follow the defination of one-one onto ( bijection )
SouravRaj:
thanks
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