1 Answer

Masoud Darvishian · Answer 1 · 2023-12-30T08:25:06+0000

As given by the question

There are given that the function:

$f(x)=\sqrt[16]{x}$

Now,

To find the inverse, first interchange the function f(x) to y:

So,

$\begin{gathered} f(x)=\sqrt[16]{x} \\ y=\sqrt[16]{x} \end{gathered}$

Then,

Interchange the variable:

So,

$\begin{gathered} y=\sqrt[16]{x} \\ x=\sqrt[16]{y} \end{gathered}$

Then,

Solve the above equation for y

So,

$\begin{gathered} x=\sqrt[16y]{\square} \\ x=(y)^{(1)/(16)} \\ (x)^(16)=(y)^{(1)/(16)*16} \\ y=x^(16) \end{gathered}$

Then,

The inverse function is :

Hence, the correct option is (A) and the value is shown below:

(B):

For verify, put inverse function into the given function:

So,

$\begin{gathered} f(x)=\sqrt[16]{x} \\ f(f^(-1)(x))=\sqrt[16]{(x^(16))} \\ f(f^(-1)(x))=(x^(16))^{(1)/(16)} \\ f(f^(-1)(x))=x \end{gathered}$

And,

Put the value of f(x) into the inverse function:

So,

$\begin{gathered} f^(-1)(x)=x^(16) \\ f^(-1)(f(x))=(\sqrt[16]{x})^(16) \\ f^(-1)(f(x))=(x^{(1)/(16)})^(16) \\ f^(-1)(f(x))=x \end{gathered}$

Hence proved.

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