In a triangle ABC, AB = AC. Show that the altitude AD is median also.

In triangle ABC, AB > AC. E is the mid-point of BC and AD is perpendicular to BC. Prove that : AB^2 +AC^2=2AE^2 +2BE^2

In a triangle ABC , AB = AC and angle A = 36^(@) If the internal bisector of angle C meets AB at D . Prove that AD = BC.

In a triangle ABC, AD is a medium and E is mid-point of median AD. A line through B and E meets AC at point F.

In a triangle ABC, AD is a median and E is mid-point of median AD. A line through B and E meets AC at point E. Prove that : AC = 3AF Draw DG parallel to BF, which meets AC at point G.

In right triangle, ABC, AB=10,BC=8,AC=6.

In a right-angled triangle ABC, right angled at B, an altitude BD is dropped on AC. If AB=8 and BC=6, what is the length of AD?

In a triangle ABC, AB = BC, AD is perpendicular to side BC and CE is perpendicular to side AB. Prove that : AD = CE.

If the radius of the circumcircle of the isosceles triangle ABC is equal to AB(=AC), then the angle A is equal to-

AD is an altitude of an isosceles DeltaABC in which AB = AC. Show that (i) AD bisects BC, (ii) AD bisects angleA .

In an isosceles triangle ABC, AB = AC and D is a point on BC produced. Prove that : AD^(2)=AC^(2)+BD.CD