Answer:
Okay, let's analyze the graph of the function h(x) = √(x - 4):
- The graph is a parabolic curve that opens upward.
- The vertex of the graph is at the point (4, -2).
- The graph is symmetric about the vertical line x = 4.
- As x increases, the graph increases without bound.
- The y-intercept of the graph is at the point (0, -2).
Therefore, the true statements about the graph of h(x) = √(x - 4) are:
- The graph is a parabolic curve that opens upward.
- The vertex of the graph is at the point (4, -2).
- The graph is symmetric about the vertical line x = 4.
- The y-intercept of the graph is at the point (0, -2).
