Answer:
Bradley is not correct
see the explanation
Step-by-step explanation:
The picture of the question in the attached figure
step 1
Reflection across the y-axis
we know that
The rule of the reflection of a point across the y-axis is given by
(x,y) ----> (-x,y)
The x-coordinate changes sign, and the y-coordinate remains the same
so
The coordinates of point B are (4,-4)
Applying the rule of the reflection across the y-axis
B(4,-4) -----> B'(-4,-4)
step 2
Reflection across the x-axis
we know that
The rule of the reflection of a point across the x-axis is given by
(x,y) ----> (x,-y)
The y-coordinate changes sign, and the x-coordinate remains the same
so
The coordinates of point B' are (-4,-4)
Applying the rule of the reflection across the y-axis
B'(-4,-4) -----> B''(-4,4)
step 3
Compare the coordiantes of point B'' with the coordinates of point D
B''(-4,4)
D(-2,4)
therefore
Bradley is not correct
Point B'' is not the same that point D
