In the triangle ABC, vertices A, B, C are `(1, 2), (3, 1), (-1, 6)` respectively. If the internal angle bisector of `angleBAC` meets BC at D, then the coordinates of D are `((5)/(3),(8)/(3))`

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, 8, -10) are the vertices of a triangle ABC. If the bisector of angleABC meets BC atD, then coordinates of D are

The vertices f the triangle are A(5,4,6), B(1,-1,3)n a d C(4,3,2)dot The internal bisector of angle A meets BC at D. Find the coordinates of D and the length AD.

The vertices f the triangle are A(5,4,6),\ B(1,-1,3)n a d\ C(4,3,2)dot The internal bisector of angle A meets BC at D. Find the coordinates of D and the length AD.

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

The vertices of a triangle are A(-1,-7),B(5,1) and C(1,4) .If the internal angle bisector of /_B meets the side AC in D, then find the length AD.

Three vertices of triangle ABC are A (3 , 2 , -1) B ( - 1 , -1 , -1) and C ( 1, 5, 5) , if the internal bisector of angleBAC meets the opposite side overline(BC) at D , then find the coordinates of D .