For Shape 1 to Shape 2: B (90-degree clockwise rotation about the origin)
For Shape 2 to Shape 1: C (90-degree counterclockwise rotation about the origin)
To map Shape 1 onto Shape 2 and then Shape 2 back onto Shape 1 with the given transformations, we must ensure that the series of transformations are inverses of each other in reverse order.
Given the first sequence for mapping Shape 1 onto Shape 2:
1. Reflection across the y-axis.
2. An additional transformation (A, B, C, or D).
3. Translation 1 unit down.
We need to find the inverse operations to map Shape 2 back onto Shape 1:
1. Translation 1 unit to the left (the inverse of translating 1 unit down is translating 1 unit up, but since we are now performing the inverse operation, it becomes 1 unit to the left).
2. The inverse of the additional transformation (A, B, C, or D).
3. Reflection across the x-axis (which is already given).
Now, let's analyze the additional transformation needed to map Shape 1 onto Shape 2:
- If you reflect Shape 1 across the y-axis, it is now a mirror image across the y-axis.
- Then if you rotate this image 90 degrees clockwise about the origin, its orientation will match that of Shape 2 if Shape 2 was originally a 90-degree counterclockwise rotation of Shape 1.
- Finally, if you translate this image 1 unit down, you will have mapped Shape 1 onto Shape 2.
Now, for the inverse sequence, starting with Shape 2:
- First, translating 1 unit left to counteract the 1 unit down translation.
- Then, the inverse transformation of a 90-degree clockwise rotation about the origin is a 90-degree counterclockwise rotation about the origin.
- Lastly, a reflection across the x-axis.
Therefore, the sequences that prove congruence between Shape 1 and Shape 2 are:
For mapping Shape 1 onto Shape 2:
1. Reflection across the y-axis.
2. 90-degree clockwise rotation about the origin (Option B).
3. Translation 1 unit down.
For mapping Shape 2 onto Shape 1:
1. Translation 1 unit left.
2. 90-degree counterclockwise rotation about the origin (Option C).
3. Reflection across the x-axis.
So the answers are:
For Shape 1 to Shape 2: B (90-degree clockwise rotation about the origin)
For Shape 2 to Shape 1: C (90-degree counterclockwise rotation about the origin)