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A sequence of transformations maps ∆ABC onto ∆A″B″C″. The type of transformation that maps ∆ABC onto ∆A′B′C′ is a__________
When ∆A′B′C′ is reflected across the line x = -2 to form ∆A″B″C″, vertex (note: please enter your response using apostrophes instead of quotations)_________________
of ∆A″B″C″ will have the same coordinates as B′.

A sequence of transformations maps ABC onto ABC The type of transformation that maps ABC onto ABC is a When ABC is reflected across the line x 2 to form ABC ver class=
A sequence of transformations maps ABC onto ABC The type of transformation that maps ABC onto ABC is a When ABC is reflected across the line x 2 to form ABC ver class=

Respuesta :

Refer to the figure shown below.

The transformation that maps ΔABC onto ΔA'B'C' is a reflection across the x-axis (or across the line y = 0).

When ΔA'B'C' is reflected across the line x = -2 (shown in the figure) to form ΔA"B"C", the vertex of ΔA"B"C" will have the same coordinates as B', which is (-2,-6).
Ver imagen Аноним
raphealnwobi

To map triangle ABC onto triangle A'B'C', a reflection about the x axis is done.

Transformation

Transformation is the movement of a point from its initial location to a new location. Types of transformation are reflection, rotation, translation and dilation.

Reflection is the flipping of a figure.

To map triangle ABC onto triangle A'B'C', a reflection about the x axis is done.

The coordinates of ∆A″B″C″ is A″(4, -2)B″(-2, -6)C″(2, -2)

Find out more on transformation at: https://brainly.com/question/1462871

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