1. The problem asks to identify the points on the graph corresponding to given ordered pairs. 2. Each ordered pair is in the form $(x,y)$ where $x$ is the horizontal coordinate and $y$ is the vertical coordinate. 3. To find the label of each point, locate the $x$ value on the x-axis and the $y$ value on the y-axis, then find the point where these coordinates intersect. 4. The first one is given: $(2,4)$ corresponds to point D. 5. Now, find the labels for the rest: - $( -3, 5 )$: The point with $x=-3$ and $y=5$ is not explicitly labeled in the description, but closest to B at $(-3,3)$, so no exact match on graph. - $( -4, -2 )$: Point Q is at approximately $(-3,-2)$, and M at $(-2,-2)$, but T is $(-4,0)$ and P is $(-4,-4)$, so no exact $(-4,-2)$ labeled. - $( -2, -4 )$: Point N is at $(-2,-4)$. - $( 0, 3 )$: Point C is at $(0,2)$, no exact $(0,3)$ labeled. - $( 5, -4 )$: No point with $x=5$ on the graph, so no label. - $( -4, 0 )$: Point T. - $( 3, -3 )$: Point I is at $(3,-2)$, H is at $(4,-4)$, no exact $(3,-3)$ labeled. - $( 0, -2 )$: No exact point labeled at $(0,-2)$. - $( 3, 2 )$: No exact point labeled at $(3,2)$. - $( -2, 1 )$: Point S is at $(-1,1)$, no exact $(-2,1)$ labeled. - $( 3, 0 )$: No exact point labeled at $(3,0)$. 6. Since many points are not labeled exactly on the graph, the only exact matches are: - $(2,4)$: D - $(-2,-4)$: N - $(-4,0)$: T 7. For the rest, the graph does not provide exact labels. Final answers: - $(2,4)$: D - $(-3,5)$: No label - $(-4,-2)$: No label - $(-2,-4)$: N - $(0,3)$: No label - $(5,-4)$: No label - $(-4,0)$: T - $(3,-3)$: No label - $(0,-2)$: No label - $(3,2)$: No label - $(-2,1)$: No label - $(3,0)$: No label