Length of the median through C of `Delta` ABC with A(4,9) B(2, 3), and C (6, 5) is

Find the length of the median AD of Delta ABC with A(5,1) , B(1,5), and C(-3,-1).

Find the equation of the median through vertex A of DeltaABC if A=(1,2), B=(-3, 4), C=(-1,6)

Find the area of the triangle Delta ABC with A(a,b+c), B(b,c+a), and C(c, a+ b).

The centroid of the triangle ABC where A= (2,3), B= (8,10) and C= (5,5) is

Find the lengths of the medians of the triangle with vertices A(0,06) ,B(0,4,0) and (6,0,0)

The length of altitude through A of the triangle ABC where A-= (-3,0), B -= (4,-1) C-= (5,2) is

Find the area of A ABC where A(-3/2, 3), B{6, -2), and C(-3,4 ).

You have studied in Class IX, (Chapter 9, Example 3), that a median of a triangle divides it into two triangles of equal areas. Verify this result for Delta ABC whose vertices are A(4, -6), B(3, -2) and C(5, 2).

The vertices of Delta ABC are A (1, 2), B (4 ,6), and C (6, 14). AD bisects angle A and meets BC at D. Find the coordinates of D.