1. The problem asks to translate a figure 3 units left and 1 unit down. 2. Translation means shifting every point of the figure by the same amount without changing its shape or size. 3. The original vertices of the polygon are approximately at points $(6,8)$, $(5,7)$, $(4,6)$, and $(7,9)$. 4. To translate 3 units left, subtract 3 from each x-coordinate. 5. To translate 1 unit down, subtract 1 from each y-coordinate. 6. Applying the translation to each vertex: - For $(6,8)$: new point is $(6-3, 8-1) = (3,7)$ - For $(5,7)$: new point is $(5-3, 7-1) = (2,6)$ - For $(4,6)$: new point is $(4-3, 6-1) = (1,5)$ - For $(7,9)$: new point is $(7-3, 9-1) = (4,8)$ 7. The translated polygon has vertices at $(3,7)$, $(2,6)$, $(1,5)$, and $(4,8)$. This completes the translation of the figure as requested.