The correct answer is:
A) (6, 2)
Explanation:
The coordinates of ABCD are as follows:
A(1, 6)
B(1, 2)
C(4, 2)
D(3, 5)
The coordinates of A'B'C'D' are as follows:
A'(9, 6)
B'(9, 2)
C' -- ??
D'(7, 5)
Comparing the pre-image points to the image points, we see that the y-coordinates do not change; only the x-coordinates change. This means we will be reflecting across a vertical line.
Vertical lines are of the form x=c, where c is some constant. To find this value, we average the x-coordinates of each point:
For A: (1+9)/2 = 10/2 = 5
For B: (1+9)/2 = 10/2 = 5
For D: (3+7)/2 = 10/2 = 5
Each time, the average is 5; this means the line x=5 is directly between the polygons, and is our line of reflection.
We know the y-coordinate of C' will be the same as C, which is 2. This gives us (x, 2) for the ordered pair.
Using the line of reflection, we will set up an equation to find the x-coordinate of C':
(4+x)/2 = 5
First, multiply each side by 2:
((4+x)/2)*2 = 5*2
4+x = 10
Subtract 4 from each side:
4+x-4 = 10-4
x = 6
The coordinates of C' are (6, 2).
