In a triangle ABC, the altitude AD and the median AE divide `angleA` into three equal parts. If BC=28, then the nearest integer to AB+ AC is

In a triangle ABC with the right angle C, side BC is divided by points D and E into three equal parts.Find the sum of angles AEC,ADC, and ABC if it is known that BC=3AC

ABC is a right angled triangle , right angled at angleB . If side AB is divided into three equal parts by points D and E such that D is nearest to A , then (AC^(2)-EC^(2))/(DC^(2)-BC^(2)) is equal to :

In a triangle ABC,if the median AD makes an angle theta with AC and AB=2AD then sin theta=

In right triangle ABC , AB=BC , then angleA is equal to

The sides AB and BC and the median AD of triangle ABC are equal to the sides PQ and QR and the median PM of triangle PQR respectively. Prove that the triangles ABC and PQR are congruent.

In triangle ABC, AD is a median. Prove that AB + AC gt 2AD

In triangle ABC, AB = 6, AC = 7 and BC = 8. If AD is bisector of angleA , then find the length of BD and CD.