Take into account that a reflection over the line x=-3 results in a new point wich has the same distance to the line x=-3 as the original point.
the horizontal distance between (-7,4) and linex=-3 is:
-3-(-7) = -3+7 = 4
then, the new point is 4 units to the right of line x=-3. Then, the x cooridinate of the new point si:
-3 + 4 = 1
and the points is:
(1 , 4)
the y coordinate remains the same because the reflection is over a vertical line.
Nex, a reflection over the line y = x demands the following transformation:
(x , y) => (y , x)
Then, you obtain:
(1 , 4) => (4 , 1)
The point is located at (4,1) after both reflections.