A reflection over the point (0,0) is given by:
[tex](x,y)\rightarrow(-x,-y)[/tex]Nevertheless, the reflection is being made over the point (0,-3). We can first make a traslation of the point (0,-3) to the origin. Then, reflect the new coordinates of the point A through the origin and then bring back the new origin to (0,-3).
First, make a traslation such that the new coordinates of (0,-3) are (0,0):
[tex](x,y)\rightarrow(x,y+3)[/tex]Then, apply a reflection through the origin:
[tex](x,y+3)\rightarrow(-x,-y-3)[/tex]Finally, make a traslation reciprocal to the first one:
[tex](-x,-y-3)\rightarrow(-x,-y-3-3)=(-x,-y-6)[/tex]Therefore, the reflection over the point (0,-3) can be written as:
[tex](x,y)\rightarrow(-x,-y-6)[/tex]Substitute (x,y)=(4,1) to find out the new coordinates of A after the reflection:
[tex]\begin{gathered} A\rightarrow B \\ \Rightarrow(4,1)\rightarrow(-4,-1-6)=(-4,-7) \end{gathered}[/tex]Therefore, the coordinates of the point B are (-4,-7).
