G Week 5 Day 2 Opener
Segment CD is the perpendicular bisector of segment AB. Find each transformation mentally.
A transformation that takes A to B.
A transformation that takes B to A.
A transformation that takes C to D.
A transformation that takes D to C.
![](data:image/png;base64,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)