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Triangle ABC is rotated to create the image A'B'C'.

On a coordinate plane, 2 triangles are shown. The first triangle has points A (negative 1, negative 1), B (1, negative 1), and C (0, negative 4). The second triangle has points A prime (1, 1), B prime (negative 1, 1), and C prime (0, 4).
Which rule describes the transformation?

(x, y) β†’ (x, –y)
(x, y) β†’ (y, x)
(x, y) β†’ (–x, –y)
(x, y) β†’ (–y, –x)

Respuesta :

Answer:

The transformation used here is,

(x, y) β†’ (-x , -y)

Step-by-step explanation:

Triangle ABC is rotated to create the image of triangle A'B'C'

Co-ordinates of A, B, C are,

A = (-1 , -1) ; B = (1 , -1) ; C = (0, -4)

Co-ordinates of A' ,B' , C' are,

A'= (1 , 1) ; B' = (-1 , 1) ; C' = (0, 4)

Hence, the transformation used here is,

(x, y) β†’ (-x , -y)

Answer:

(x, y) β†’ (–x, –y)

Step-by-step explanation:

Coordinates of triangle ABC:

A (-1, -1)

B (1, -1)

C (0, -4)

If we apply the transformation (x, y) β†’ (–x, –y) we will get:

A (-1, -1) β†’ (1, 1) Β  which correspond to point A'

B (1, -1) β†’ (-1, 1) Β  which correspond to point B'

C (0, -4) β†’ (0, 4) Β  which correspond to point C'

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