How do you verify that f(x) and g(x) are inverses: $f(x) = x+7$ , $g(x) = x-7$ ?

Question

8248 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-10-21T09:28:39

There are two methods of checking if $f(x)$ and $g(x)$ are inverse functions. See explanation for details.

**Method 1 **

First method is to look for inverse function of both functions.

Example.

We are looking for inverse function of $f(x)=x+7$

From the expression $y=x+7$ we try to calculate $x$

$y=x+7$

$x=y-7$ , so we found that $g(x)$ is inverse of $f(x)$ .

Now we have to look for the inverse of $g(x)$

$g(x)=x-7$

$y=x-7$

$x=y+7$

So we found that $f(x)$ is the inverse function of $g(x)$

If $f$ is inverse of $g$ and $g$ is inverse of $f$ then $f$ and $g$ are inverse functions.

Method 2

The second way is to find the compound functions $f(g(x))$ and $g(f(x))$ . If they both are $h(x)=x$ then $f$ and $g$ are inverse.

Example:

$f(g(x)=[x-7]+7$ The expression in brackets is $g(x)$ inserted as $x$

$f(g(x))=x-7+7=x$

$g(f(x)=[x+7]-7$ The expression in brackets is $f(x)$ inserted as $x$

$g(f(x))=x+7-7=x$

We found out that: $f(g(x))=g(f(x))=x$ . This concludes the proof, that $f(x)$ and $g(x)$ are inverse functions.

How do you verify that f(x) and g(x) are inverses: f(x) = x+7f(x) = x+7, g(x) = x-7g(x) = x-7?