1 Answer

Yih · Answer 1 · 2023-10-18T15:58:51+0000

Given:

$\begin{gathered} F(x)=√(x-5)+4 \\ G(x)=(x-4)^2+5 \end{gathered}$

Required:

Find F(x) and G(x) are inverse functions or not.

Step-by-step explanation:

Given that

$\begin{gathered} F(x)=√(x-5)+4 \\ G(x)=(x-4)^(2)+5 \end{gathered}$

Let

$\begin{gathered} y=√(x-5)+4 \\ y-4=√(x-5) \end{gathered}$

Take the square on both sides.

Interchange x and y as:

$\begin{gathered} (x-4)^2=y-5 \\ y=(x-4)^2+5 \end{gathered}$

Substitute y = G(x)

This is the G(x) function.

So F(x) and G(x) are inverse functions.

$\begin{gathered} G(x)-5=(x-4)^2 \\ √(G(x)-5)=x-4 \\ x=√(G(x)-5)+4 \end{gathered}$

Final Answer:

Option A is the correct answer.

Your comment on this question: