Respuesta :
Given:
T (-3,4) ; O (-4,1) ; Y (-2,3)
T'(-1,1) ;
T
-3 move forward 2 points to reach -1
4 move forward 3 points to reach 1
O
-4 move forward 2 points to reach -2
1 move forward 3 points to reach -2
Y
-2 move forward 2 points to reach 0
3 move forward 3 points to reach 0.
O'(-2,-2) ; Y'(0,0) 1st option.
T (-3,4) ; O (-4,1) ; Y (-2,3)
T'(-1,1) ;
T
-3 move forward 2 points to reach -1
4 move forward 3 points to reach 1
O
-4 move forward 2 points to reach -2
1 move forward 3 points to reach -2
Y
-2 move forward 2 points to reach 0
3 move forward 3 points to reach 0.
O'(-2,-2) ; Y'(0,0) 1st option.
Answer: The correct option is (A) O' (−2, −2); Y' (0, 0).
Step-by-step explanation: Given that the co-ordinates of the vertices of ΔTOY are T(−3, 4), O (−4, 1), and Y (−2, 3). A translation maps point T to T' (−1, 1).
We are to find the co-ordinates of the points O' and Y'.
The given transformation from T to T' is
T(−3, 4) ⇒ T' (−1, 1).
Let, (−3 + x, 4 + y) = (-1, 1).
So,
[tex]-3+x=-1\\\\\Rightarrow x=2[/tex]
and
[tex]4+y=1\\\\\Rightarrow y=-3.[/tex]
That is, the transformation rule is
(a, b) ⇒ (a+2, b-3).
Therefore,
co-ordinates of O' are (-4+2, 1-3) = (-2, -2),
and
co-ordinates of Y' are (-2+2, 3-3) = (0, 0).
Thus, the required co-ordinates of O' and Y' are (-2, -2) and (0, 0) respectively.
Option (A) is correct.
