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.