Answer:
ΔABC was translated right 4 units and down 4 units.
Step-by-step explanation:
A' - A = (3, -2) -(-1, 2) = (3+1, -2-2) = (4, -4)
So, the transformation is (x, y) ⇒ (x +4, y -4).
Adding these values to a coordinate pair causes it to be translated to the right 4 units (x is increased by 4) and down 4 units (y is decreased by 4).
ΔABC was translated right 4 units and down 4 units.
We know that any transformation of the type:
(x,y) → (x+h,y+k)
is a shift of the figure
h units to the left if h<0
h units to the right if h>0
k units up if k>0
and k units down if k<0
Here,
The coordinates of the original triangle is:
A(-1, 2), B(3, 1), and C(-3, -2).
and that of the translated triangle is:
A'(3, -2), B(7, -3), and C'(1, -6).
i.e. we have:
(-1,2) → (3,-2)
i.e.
(-1+h,2+k)= (3,-2)
i.e.
-1+h= 3 and 2+k= -2
i.e.
h= 3+1 and k= -2-2
i.e.
h=4 and k= -4
This means that ΔABC was shifted 4 units to the right and 4 units down.
( Since, h>0 and k<0 )
