A median is a line joining the a vertex to the mid-point of the opposite side.
If the median is also an altitude to side BC, then the median should be perpendicular to BC.
Let D be the mid-point of BC. The coordinates of D should be rather obvious, being the mid-point of points B and C.
Compare the slopes of lines AC and lines BC. If the product of the two slopes equal -1, the lines are perpendicular, hence AD is an altitude to side BC.
the vertices of triangle ABC are A(-2,3), B(0,-3), and C(4,1). prove, by means of coordinate geometry, that the median to side BC is also the altitude to side BC.
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