Two transformations take place, the resultant change is A(x,y) ---A''(x+4, y-6), This is a result of a reflection in the y axis followed by a _________ (translation, reflection, rotation).

if you need to fix a problem, don't repost the whole thing again. Just edit your original post. Wastes time checking all the redundant posts.

Since the question specifies that there was an initial reflection, the only way to wind up with no reflection is to have a second reflection to cancel it:

A(x,y) -> A'(-x,y) -> A"(-x+4,y-6)

or

A(x,y) -> A'(x,-y) -> (x+4,-y-6)

Thank you for answering, still I don't completely know how looking at A''(-x+4,y-6) you can determine there is a second reflection, I know first reflection over Y will be A' (-x,y), but do you get that the second is a reflection too and it is not a rotation.