To describe a sequence of transformations that maps triangle ABC onto triangle A"B"C, a student starts with a reflection over the x-axis. How should the student complete the sequence of transformations to map triangle ABC onto triangle A"B:C?
You will get brainiest if you answer.

If you draw the libe y = 3, you would notice that triangle A''B''C'' is a reflection of the original triangle across y = 3, because the figure has the same shape and size, but reflected as a mirror, where the mirror is at y = 3.

Then, we move the triangle 2 units rightwards to map ABC onto A''B''C''.

Therefore, the sequence of transformations are

Reflection across y = 3.
Translation rightwards, 2 units

To describe a sequence of transformations that maps triangle ABC onto triangle A"B"C, a student starts with a reflection over the x-axis. How should the student complete the sequence of transformations to map triangle ABC onto triangle A"B:C? You will get brainiest if you answer.

Respuesta :

Reflection across y = 3.

Translation rightwards, 2 units

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To describe a sequence of transformations that maps triangle ABC onto triangle A"B"C, a student starts with a reflection over the x-axis. How should the student complete the sequence of transformations to map triangle ABC onto triangle A"B:C?
You will get brainiest if you answer.