For this case we have that by definition, the midpoint of a segment is given by:
[tex]XY = (\frac {x1 + x2} {2}, \frac {y1 + y2} {2})[/tex]
We have the following ordered pairs:
[tex](x1, y1) = (a, 3a)\\(x2, y2) = (- 5a, 0)[/tex]
Therefore, substituting values we have:
[tex]XY = (\frac {a-5a} {2}, \frac {3a + 0} {2})[/tex]
Rewriting we have:
[tex]XY = (\frac {-4a} {2}, \frac {3a} {2})\\[/tex]
[tex]XY = (- 2a, \frac {3a} {2})[/tex]
Answer:
the coordinates of the midpoint of XY
[tex]XY = (- 2a, \frac {3a} {2})[/tex]
