\( h(x)=(x-6)^{2} \quad \begin{array}{l}\text { 11. What would be the AOS? } \\ \text { Your answer should start with "x=" } \\ \text { Typea response }\end{array} \)

The axis of symmetry (AOS) for a quadratic function in vertex form, such as \( h(x) = (x-6)^{2} \), can be determined from the expression inside the parentheses. For the given function, the AOS is simply \( x = 6 \). This means that the graph is symmetric around the vertical line \( x = 6 \). To visualize this, imagine a beautiful parabolic curve opening upwards, peaking at the vertex, which is at point \( (6, 0) \). Every point on the left side of this line has a mirror image on the right! So, when playing with the quadratic function, remember that the AOS is your trusty guide for symmetry.