Translate the figure VWXYZ 4 units up. Which one of the following would be a vertex in the translated figure? Select all that apply

To translate the figure VWXYZ 4 units up, we need to add 4 to the y-coordinate of each vertex.

1. (−4,−2) - This point is not one of the vertices of the figure VWXYZ.
2. (1,−1) - This point is not one of the vertices of the figure VWXYZ.
3. (−3,3) - This point is not one of the vertices of the figure VWXYZ.
4. (−3,−1) - This point is one of the vertices of the figure VWXYZ. When 4 is added to the y-coordinate, it becomes (−3,3), which is a vertex in the translated figure.
5. (3,−3) - This point is not one of the vertices of the figure VWXYZ.
6. (−5,0) - This point is not one of the vertices of the figure VWXYZ.

The translated figure will have the vertex (−3,3). Thus, the answer is 4. (−3,3).

select all
that apply

Apologies for the confusion. Let's go through each option again and determine if it is a vertex in the translated figure.

1. (−4,−2) - This point is not one of the vertices of the figure VWXYZ.
2. (1,−1) - This point is not one of the vertices of the figure VWXYZ.
3. (−3,3) - This point is not one of the vertices of the figure VWXYZ.
4. (−3,−1) - This point is one of the vertices of the figure VWXYZ. When translated 4 units up, it becomes (−3,3), which is a vertex in the translated figure.
5. (3,−3) - This point is not one of the vertices of the figure VWXYZ.
6. (−5,0) - This point is not one of the vertices of the figure VWXYZ.

Therefore, the vertices in the translated figure are:
4. (−3,−1) - Translated 4 units up, becomes (−3,3).

The answer is: 4. (−3,3).