Angie’s rotation maps triangle XYZ to triangle X’Y’Z’. X(3, –6) maps to X’(–3, 6) Y(1, –2) maps to Y’(–1, 2) Z(–1, –5) maps to Z’(1, 5) Which describes the rotation? mc015-1.jpg rotation mc015-2.jpg clockwise rotation mc015-3.jpg counterclockwise rotation mc015-4.jpg clockwise rotation

Analysing triangles XYZ and X'Y'Z' it can be seen that coordinates of point X (3, -6) were changed to (-3, 6), that is, (x, y) were changed to (-x, -y). The relation between Y and Y', and between Z and Z' is the same. A 180° rotation about the origin translates point (x, y) to point (-x, -y). In a 180° rotation, clockwise or counterclockwise rotation doesn't make any difference.

jayilych4real jayilych4real · Answer 2 · 2022-02-21T14:30:08+01:00

The thing which can be best described in the rotation is:

180° rotation about the origin

What is a Rotation Map?

This refers to the function which shows an undirected edge-labeled graph which uses the individual vertices to show its external neighbors.

With this in mind, we can see that because Angie’s rotation maps shows triangle XYZ to triangle X’Y’Z’. X(3, –6) maps to X’(–3, 6) Y(1, –2) maps to Y’(–1, 2) Z(–1, –5) maps to Z’(1, 5), then it is best to describe the motion as one that is 180° about the origin.

This is because from the analysis of the map, we see that the coordinates are the same between Y and Y', and between Z and Z'

Read more about rotation maps here:
https://brainly.com/question/1571997