How would you describe this series of transformations?
(1 point)
• Reflection across the y-axis and then a translation of (-3, -5) shows that triangle ABC is congruent to triangle A"B" C'"
• Since triangles ABC and A"B" C" do not have the same orientation, they are not congruent.
Rotation of 90 degrees clockwise and then reflection across the x-axis shows that triangle ABC is congruent to triangle
А"В" О"
• Translation of (2, 0) and then reflection across the X-axis shows that triangle ABC is congruent to triangle A"B " © "
It seems that the series of transformations described includes a reflection, translation, rotation, and another reflection. The first transformation is a reflection across the y-axis followed by a translation of (-3, -5), which shows that triangle ABC is congruent to triangle A"B" C'". However, since the orientation of triangles ABC and A"B" C" are different, they are not congruent.
The second transformation is a rotation of 90 degrees clockwise followed by a reflection across the x-axis, showing that triangle ABC is congruent to triangle A"B" О".
Finally, the third transformation is a translation of (2, 0) followed by a reflection across the x-axis, showing that triangle ABC is congruent to triangle A"B" ©".