Answer:
By the rotation rule of 270 of counter clock wise ( x ,y) →→ ( y , -x )
Step-by-step explanation:
Given : Triangle RST has vertices R(2, 0), S(4, 0), and T(1, –3). The image of triangle RST after a rotation has vertices R'(0, –2), S'(0, –4), and T'(–3, –1).
To find : Which rule describes the transformation.
Solution : We have given
Parent vertices R(2, 0), S(4, 0), and T(1, –3).
Transformed vertices R'(0, –2), S'(0, –4), and T'(–3, –1).
By the rotation rule of 270 of counter clock wise ( x ,y) →→ ( y , -x )
R(2, 0)→→ R'(0, –2)
S(4, 0)→→ S'(0, –4)
T(1, –3)→→ T'(–3, –1).
We can see y coordinate change in to x and x coordinate become - y.
Therefore ,By the rotation rule of 270 of counter clock wise ( x ,y) →→ ( y , -x )
