Answer :

We start with the function

[tex]$$
h(x) = 6x^7 - 9.
$$[/tex]

To find the inverse, we let

[tex]$$
y = 6x^7 - 9,
$$[/tex]

and solve for [tex]$x$[/tex] in terms of [tex]$y$[/tex].

1. Add [tex]$9$[/tex] to both sides:

[tex]$$
y + 9 = 6x^7.
$$[/tex]

2. Divide both sides by [tex]$6$[/tex]:

[tex]$$
\frac{y + 9}{6} = x^7.
$$[/tex]

3. Take the seventh root of both sides to solve for [tex]$x$[/tex]:

[tex]$$
x = \left(\frac{y + 9}{6}\right)^{\frac{1}{7}}.
$$[/tex]

Since [tex]$x = g(y)$[/tex] when the function is inverted, the inverse function is

[tex]$$
g(y) = \left(\frac{y + 9}{6}\right)^{\frac{1}{7}}.
$$[/tex]

Thus, the final answer is

[tex]$$
\boxed{g(y)=\left(\frac{y+9}{6}\right)^{\frac{1}{7}}}.
$$[/tex]

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Rewritten by : Barada