ABC is a equilateral triangle and CD is internal bisector of `angleC`. If DC is extended to E in such a way that AC = CE then `angleCAE` is-

If in a triangle ABC,CD is the angular bisector of the angle ACB then CD is equal to

In a triangle ABC, D is a point on BC such that AD is the internal bisector of angle A . Let angle B = 2 angle C and CD = AB. Then angle A is

In a Delta ABC it is given AD is internal bisector of angleA . If BD=4 cm, DC=5 cm and AB=6 cm , then AC =?

In a Delta ABC, it is give ttha AD is the internal bisector of angleA . If AB=10 cm, AC=14 cm and BC=6 cm then CD=?

Prove that the internal bisector of the angle A of a triangle ABC divides BC in the ratio AB:AC

In a triangle ABC, internal bisector of angleABC and external bisector of angleACB meet in D. Which one of the following is true ?

ABCD is a parallelogram. Angle bisector of angleA and angle bisector of angleC cuts extended side DC and AB at Q and P respectively. If angleA=50^(@)," find "angleP+angleQ .