Answer:
Step-by-step explanation:
If GH has a midpoint M(x, y) then we have to determine whether midpoint M lies on the given line y = -x + 1
Since coordinates of G and H are (-8, 1) and (4, 5) so coordinates of the midpoint M will be
x = [tex]\frac{(-8+4)}{2}[/tex] = -2
and y coordinates of point M will be
y = [tex]\frac{(1+5)}{2}[/tex] = 3
Therefore point M is (-2, 3).
Now we plug in the values of x and y in the given equation.
3 = -(-2) + 1
3 = 3
Hence it is proved that the midpoint M of segment GH will lie on the line y = -x + 1
