Question

wx is a translation of wx. write the translation rule.
(x, y)→(x + □, y + )

Explanation:

Step1: Find x - translation

Let's assume a point on $\overline{WX}$ has coordinates $(x,y)$. For the x - coordinate, if we consider a point on $\overline{WX}$ and its corresponding point on $\overline{W'X'}$, we can see that to get from the x - value of a point on $\overline{WX}$ to the x - value of the corresponding point on $\overline{W'X'}$, we add 5. For example, if we look at the horizontal movement of the endpoints.

Step2: Find y - translation

For the y - coordinate, to get from the y - value of a point on $\overline{WX}$ to the y - value of the corresponding point on $\overline{W'X'}$, we add 6. We observe the vertical movement of the endpoints of the line segments.

Answer:

$(x,y)\to(x + 5,y+6)$