what is the vertex of the graph of $f(x) = |x - 13| + 11?$\n$(-11, 13)$\n$(-13, 11)$\n$(11, 13)$\n$(13, 11)$

what is the vertex of the graph of $f(x) = |x - 13| + 11?$\n$(-11, 13)$\n$(-13, 11)$\n$(11, 13)$\n$(13, 11)$

what is the vertex of the graph of $f(x) = |x - 13| + 11?$\n$(-11, 13)$\n$(-13, 11)$\n$(11, 13)$\n$(13, 11)$

Answer

Explanation:

Step1: Recall absolute value form

The parent absolute value function is $f(x)=|x-h|+k$, where $(h,k)$ is the vertex.

Step2: Match given function to form

For $f(x)=|x-13|+11$, we have $h=13$ and $k=11$.

Answer:

(13, 11)