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Proof that an invertible function f can have only one inverse

User Alexander Zinchuk
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1 Answer

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24 votes

Explanation:

We remeber that If we compose a function and it's inverse,


f(f {}^( - 1) x) = x

A invertible function is one to one so suppose that we have two inverse, g(x) and h(x). Let plug them in ,


f(h(x)

and


f(g(x)

Since f is a invertible function, it is one to one so if g and h are both inverse of f, then they are eqaul


f(h(x) = f(g(x)


h(x) = g(x)

Thus, a invertible function can have only one inverse.

User Bruceceng
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