https://file.aiquickdraw.com/mathbot/file/1727919769253f8p0g733.jpg

To find \( h(3) \) from the graph, we need to locate the point where \( x = 3 \) and determine the corresponding \( y \)-value on the function \( h(x) \).

From the graph:

- When \( x = 3 \), the function \( h(x) \) appears to reach a point where the \( y \)-value is 0.

Thus, \( h(3) = 0 \).

Would you like further details or have any other questions?

Here are 5 related questions to consider:
1. What is \( h(-3) \) based on the graph?
2. Can you identify any local maxima or minima of \( h(x) \)?
3. What is the behavior of \( h(x) \) as \( x \to \infty \)?
4. How can you determine if \( h(x) \) is increasing or decreasing at specific points?
5. What is the domain and range of \( h(x) \) from the graph?

**Tip:** When interpreting graphs, always make sure to carefully read the axes and labels to avoid misinterpretation of values.

Learn how to find the value of h(3) by interpreting the graph of the function h(x). In this problem, we evaluate the graph at x = 3 and determine that h(3) = 0. Suitable for students in Grades 9-12.

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