`A (5, -3), B (8, 2), C (0, 0)` are the vertices of a triangle. Show that the median from A is perpendicular to the side BC.

The point A(0, 0), B(1, 7), C(5, 1) are the vertices of a triangle. Find the length of the perpendicular from A to BC and hence the area of the DeltaABC .

A (5, 4), B (-3, -2) and C (1, -8) are the vertices of a triangle ABC. Find : the slope of the median AD .

A (1, -5), B (2, 2) and C (-2, 4) are the vertices of triangle ABC. find the equation of: the median of the triangle through A.

If A(-1, 6), B(-3, -9) and C(5, -8) are the vertices of a triangle ABC , find the equations of its medians.

If A(2,2),B(-4,-4)a n dC(5,-8) are the vertices of a triangle, then the lengthof the median through vertex C is.

A (4,2), B(6,8) and C (8,4) are the vertices of a triangle ABC. Write down the equation of the median of the triangle through A.

O (0, 0), A (3, 5) and B (-5, -3) are the vertices of triangle OAB. Find : the equation of median of triangle OAB through vertex O.

A(-8, O), B(0, 16) and C(0, 0) are the vertices of a triangle ABC. Point P lies on AB and Q lies on AC such that AP : PB = 3 : 5 and AQ: QC = 3:5. Show that : PQ = (3)/(8) BC.

Points A(7, -4), B(-5, 5) and C(-3, 8) are vertices of triangle ABC, Find the length of its median through vertex A.

The vertices of a triangle are A(a,0)B(0,b)and C(a,b)