To find the coordinates of A'B'C', we need to apply both transformation rules, (x,y) -> (x+4,y-6) and (x,y) -> (x+5,y-3), to the original coordinates of A, B, and C.
For point A(-8,4):
First transformation: (-8+4, 4-6) = (-4, -2)
Second transformation: (-4+5, -2-3) = (1, -5)
So, point A will be transformed to A'(1, -5).
For point B(-5,8):
First transformation: (-5+4, 8-6) = (-1, 2)
Second transformation: (-1+5, 2-3) = (4, -1)
So, point B will be transformed to B'(4, -1).
For point C(-3,3):
First transformation: (-3+4, 3-6) = (1, -3)
Second transformation: (1+5, -3-3) = (6, -6)
So, point C will be transformed to C'(6, -6).
The composition transformation rule is obtained by performing the two individual transformations in sequence. So, the composition transformation rule is:
(x,y) -> ((x+4)+5, (y-6)-3) = (x+9, y-9)
For any point P(x,y) in the original coordinate system, after the composition transformation, P will be in the same quadrant as the original point.
Use the function rules to find the coordinates of A”B”C and predict the quandrwnt will be in after the transformation ABC with coordinates A(-8,4) B(-5,8) and C(-3,3) is transformed by(x,y)->(x+4,y-6) to produce A’B’C’ A’B’C’ is transformed by the rule (x,y)-> (x+5,y-3) creat the rule for the composition transformation and predict what wuandrant will be in
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