Answer:
90° counterclockwise rotation about the origin
Step-by-step explanation:
Point W appears to be rotated 90° counterclockwise from the first quadrant to the second.
The quadrilateral may be rotated 90° counterclockwise about the origin.
If that's the case, the coordinates (x, y) have become ( -y, x).
Let's check if this is the correct transformation.
[tex]\begin{array}{ccc}\textbf{Point} & \mathbf{(x, y)} & \mathbf{(-y, x)}\\W & (3, 6) & (-6, 3)\\X & (5, -10) & (10, 5)\\Y & (-2, -4) & (4, -2)\\Z & (-4, -8)& (8,-4)\\\end{array}[/tex]
The new coordinates are those of W'X'Y'Z'.
The quadrilateral is rotated 90° counterclockwise about the origin.
