Describe the series of transformations that have occurred to move the triangle in Quadrant IV to the triangle in Quadrant to show that the triangles are congruent. (1 point) translation then rotation reflection, then translation rotation, then translation rotationthen reflection
The series of transformations that have occurred to move the triangle in Quadrant IV to the triangle in Quadrant I and show that the triangles are congruent is:
1. Translation: The triangle is moved horizontally and vertically to a new position in the coordinate plane.
2. Rotation: The triangle is rotated around a point to a new orientation.
3. Reflection: The triangle is reflected across a line of symmetry.
4. Translation: The triangle is moved horizontally and vertically again to its final position.
5. Rotation: The triangle is rotated once more to match the final angle of the other triangle.
So, the correct answer is:
Translation -> Rotation -> Reflection -> Translation -> Rotation