`A(3, 2, 0), B(5, 3, 2) and C(-9, 8, -10)` are the vertices of a triangle ABC. If the bisector of `angleABC` meets BC atD, then coordinates of D are

A(3,2,0),B(5,3,2) and C(-9,6,-3) are the vertices of a triangle ABC if bisector of angle BAC meets BC at D, then co- ordinates of D are

A(3,2,0),B(5,3,2) and C(-9,6,-3) are the vertices of triangle ABC. If the bisec-tor of angleBAC meets BC at D then D is

A (3, 2, 0), B(5, 3, 2), C(- 9, 6, -3) are three points forming a triangle. AD, the bisector of anlge BAC meets [BC] at D. Find the co-ordinates of D.

If A (1,0,-1), B (-2,4,-2) and C(1,5,10) be the vertices of a triangle and the bisector of the angle BAC, meets BC at D, then find the coordinates of the point D.

A(1,3,0),B(2,2,1) and C(5,-1,4) are the vertices of the triangle ABC, if the bisector of /_BAC meets its side bar(BC) at D, then find the coordinates of D.

If A(2, 2, -3), B(5, 6, 9) and C(2, 7, 9) be the vertices of a triangle. The internal bisector of the angle A meets BC at the point D. Find the coordinates of D.

If A = (3, 2, 5), B = (3, 3, 5) and C = (3, 4, 8) are the vertices of a triangle ABC, then its centroid is

A (3,2,0) , B (5,3,2)C (-9,6,-3) are three points forming a triangle. AD, the bisector of angle BAC meets BC in D. Find the coordinates of the point D.