Let `A(1, 2, 3), B(0, 0, 1) and C(-1, 1, 1)` are the vertices of `triangleABC`.
Q. The equation of internal angle bisector through A to side BC is

Let A(1, 2, 3), B(0, 0, 1), C(-1, 1, 1) are the vertices of a DeltaABC .The equation of median through C to side AB is

A(1, 1, 2), B(4, 3, 1) and C(2, 3, 5) are vertices of a triangle ABC. The vector along the bisector angleA is …………..

A(1, 2, 3), B(0, 4, 1) and C(-1, -1, -3) are verticies of DeltaABC . Find point on bar(BC) at which bisector of angleBAC intersects.

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.

Show that A(-1,0), B(3,1), C(2,2) and D(-2,1) are the vertices of a parallelogram ABCD.

A (1, -1, -3), B(2, 1, -2) and C(-5, 2, -6) are the verticies of DeltaABC . Find co-ordinates of point D, if bisector of angleA intersects bar(BC) at point D.

A(0,-1,-2), B(3,1,4) and C(5,7,1) are vertices of DeltaABD then find the measure of angleA .

Let A(h, k), B(1, 1) and C(2, 1) be the vertices of a right angled triangle with AC as its hypotenuse. If the area of the triangle is 1, then the set of values which k can take is given by (1) {1,""3} (2) {0,""2} (3) {-1,""3} (4) {-3,-2}

A(1,-1,-3), B(2, 1,-2) & C(-5, 2,-6) are the position vectors of the vertices of a triangle ABC. The length of the bisector of its internal angle at A is :

The vertices of a triangle are A(10,4) ,B(-4,9) and C(-2,-1). Find the equation of the altitude through A.