Prove that f(f(x)) = x

Prove that $f(f(x))=x$

Question: If $$ f(x)=(a-x^n)^{1/n}, $$ where $$ a>0 \text{ and } n\in\mathbb N, $$ then prove that $$ f(f(x))=x $$ for all $x$.

Solution

Given: $$ f(x)=(a-x^n)^{1/n} $$

Now, $$ f(f(x)) = \left[a-\left((a-x^n)^{1/n}\right)^n\right]^{1/n} $$

Since $$ \left((a-x^n)^{1/n}\right)^n=a-x^n $$

Therefore, $$ f(f(x)) = \left[a-(a-x^n)\right]^{1/n} $$

$$ = (x^n)^{1/n} $$

$$ =x $$

Hence, $$ \boxed{f(f(x))=x} $$

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