The coordinates of HG are (2.5,-1.5) , (1.5 , -1.5)
The first thing to do here is to note the points on the end-points of line SM
This is obtainable from the graph
The points are S and M
The coordinates of point S are (-2,-8) while the coordinates of point M are (-4,-6)
We now proceed from here to dilate these points so as to get HG with the dilation centered at point (7,5)
Mathematically, to dilate a point F (x,y) , using a scale factor k centered at point (a,b)
We get the coordinates of the new point after the dilation as;
F' = (k(a-x) + x , k(b-y) + y)
With respect to this question, scale factor K is 1/2 while (a,b) is (7,5)
Thus, the coordinates of point H obtainable from point S (-2,-8) will be;
H = (1/2(7-(-2) - 2, 1/2(5-(-8) -8)
H = (1/2(9) - 2 , 1/2(13) - 8)
H = (4.5-2 , 6.5-8)
The coordinates of point H is (2.5 , -1.5)
We now proceed to get the coordinates of point G
This is obtainable from point M (-4,-6)
Thus, we have
G = (1/2(7-(-4) - 4 , 1/2(5-(-6) - 6)
G = (1/2(11) - 4 , 1/2 (11) - 6)
G = (5.5-4 , 5.5-6)
G = (1.5 , -1.5)
So the coordinates of HG are (2.5,-1.5) , (1.5 , -1.5)
To sketch this on the graph, we simply locate the coordinates of the points H and G and join together