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Which rule describes the composition of
transformations that maps AABC to AA"B'C"?
B
C
C
В
O r.R8', 90°
C"
A
O Rg'900r
m
O r.Rg. 270°
O Rg. 2700 ºr

Which rule describes the composition of transformations that maps AABC to AABC B C C В O rR8 90 C A O Rg900r m O rRg 270 O Rg 2700 ºr class=

Respuesta :

Answer:

explain below

Step-by-step explanation:

1. reflection over "M"    then

2. rotation about B' counterclockwise 270° (+270°)

Composition of transformations that maps ΔABC to ΔA"B'C" is  [tex]R_{g}[/tex]= 270°.

What is transformation?

" Transformation is representing the change in geometrical shape using flip or rotation in the coordinate plane."

According to the question,

Given ΔABC is on the right side of the line M.

ΔA'B'C' is the reflection of ΔABC which is transformed with angle 90°.

ΔA'B'C' rotates B' to get ΔA''B"C"

Total transformation with angle equals to 270°.

Hence, composition of transformations that maps ΔABC to ΔA"B'C" is

 [tex]R_{g}[/tex]= 270°.

Learn more about transformation here

https://brainly.com/question/11709244

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