1. The problem asks how the point $(0,3)$ looks on a graph that also has a feature where the function does not exist (DNE) at the top of the graph. 2. Plotting the point $(0,3)$ means placing a dot at the coordinate where $x=0$ and $y=3$. 3. "DNE at the top of the graph" suggests there is a vertical asymptote or a discontinuity at some high $y$-value, meaning the function approaches but never reaches or is undefined at that point. 4. To visualize this, we can consider a function like $y=\frac{1}{x}$ which has a vertical asymptote at $x=0$ and undefined behavior there, but we want the point $(0,3)$ explicitly shown. 5. Since the function is undefined at $x=0$, the point $(0,3)$ is not on the function curve but can be marked separately. 6. The graph will show the point $(0,3)$ as a distinct dot, and the function will have a break or asymptote near that vertical line. Final answer: The point $(0,3)$ is a single dot on the graph at $x=0$, $y=3$, and the graph has a discontinuity or DNE at the top, meaning the function is undefined or breaks near that area.