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A sequence of transformations maps ∆ABC to ∆A′B′C′. The sequence of transformations that maps ∆ABC onto ∆A′B′C′ is a followed by a .

A sequence of transformations maps ABC to ABC The sequence of transformations that maps ABC onto ABC is a followed by a class=
A sequence of transformations maps ABC to ABC The sequence of transformations that maps ABC onto ABC is a followed by a class=

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sqdancefan
The ABC sequence of points is clockwise in both figures, so there will be an even number of reflections or a rotation.

Rotation 90° clockwise about the point (-3, -3) would make the required transformation, but that is not an option. An equivalent is ...
   • reflection across the line x = -3
   • reflection across the line y = x
dhevannnyahhh

A sequence of transformations maps ∆ABC to ∆A′B′C′. The sequence of transformations that maps ∆ABC onto ∆A′B′C′ is a reflection across the line x = -3 followed by a reflection across the line y = x.

Explanation:

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