To determine the sequence of steps to move triangle ABC in Quadrant IV to triangle EGH in Quadrant II, we should identify the transformations that map the vertices of triangle ABC to those of triangle EGH.
-
Identify the Positioning of the Triangles:
- Triangle ABC: Vertices A(1, -1), B(1, -3), C(4, -3)
- Triangle EGH: Vertices E(-2, 5), G(-2, 3), H(-5, 3)
-
Check Reflection:
- By reflecting triangle ABC across the x-axis, the y-coordinates of points A, B, and C would change signs:
- A(1, -1) → A(1, 1)
- B(1, -3) → B(1, 3)
- C(4, -3) → C(4, 3)
- By reflecting triangle ABC across the x-axis, the y-coordinates of points A, B, and C would change signs:
-
Check Translation After Reflection:
- After reflecting triangle ABC across the x-axis, we can now check how to move it from the position of points A(1, 1), B(1, 3), C(4, 3) to the points of triangle EGH.
- To move from A(1, 1) to E(-2, 5):
- The x-coordinate moves from 1 to -2, which is a change of -3.
- The y-coordinate moves from 1 to 5, which is a change of +4.
- A similar calculation gives us the translation vector to move all points of the triangle.
To achieve this configuration and notice the transformations:
- A reflection across the x-axis, then we can apply a translation based on the determined changes.
Given the options available, the correct transformation sequence involves reflecting triangle ABC to the appropriate quadrant and then using the resulting translation.
The right choice from the options provided is likely (based on this analysis):
- reflection to Quadrant I, then a translation of (3, 2)
This option implies the necessary changes to achieve congruence, based on the reflection across the x-axis and necessary translation to align the triangles.