If the median AD to the side BC of a `Delta ABC` is also an angle bisector of `angle A` then `(AB)/(AC)` is ………..

If AD is the bisector of angle A then AC is

In Delta ABC " and " Delta DEF, angle A = angle E and angle B = angle F . Then AB : AC is ……..

Let Delta ABC be equilateral. If D is a point on BC and AD is the internal bisector of angle A . Using Angle Bisector Theorem, (BD)/(DC) is ………….

If Delta ABC is an isosceles triangle with angle C=90^(@) and AC=5 cm, then AB is

Construct the bisector of a given angle ABC.

If a straight line intersects the sides AB and AC of a triangle ABC at D and E respectively and is parallel to BC , then (AE)/(AC) = . ………..

D is the midpoint of the side BC of Delta ABC . If P and Q are points o AB and on AC such that DP bisects angle BDA and DQ bisects angle ADC , then prove that PQ || BC

Let 'l' is the length of median from the vertex A to the side BC of a Delta ABC . Then

(Apollonius theorem): If D is the midpoint of the side BC of a triangle ABC, then show by vector method that |vec(AB)|^(2) + |vec(AC)|^(2) = 2(|vec(AD)|^(2)+ |vec(BD)|^(2)).

The internal bisector of angle A of Delta ABC meets BC at D and the external bisector of angle A meets BC produced at E. Prove that (BD)/(BE) = (CD)/(CE) .