Question

Type the correct answer in each box. Spell all words correctly. 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 of ∆A″B″C″ will have the same coordinates as B′.

Answer 1

Answer: A) Reflection

B) (-2,-6)

Explanation:

Answer 2

A) Reflection

B) (-2,-6)

Explanation:

Have a look at the attached picture:

The type of transformation that maps ∆ABC onto ∆A′B′C′ is a reflection across the x-axis. A reflection is an isometry, which means the original(pre-image) and image are congruent, that can be described as a "flip".

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