In `triangleABC`, in the usual notation, the area is `(1)/(2)` bc sq. units AD is the median to BC. Prove that `/_ABC= (1)/(2) /_ADC`.

AM is median of triangleABC , prove that (AB+BC+CA) gt2AM .

In DeltaABC , with the usual notations, if sinB sinC=(bc)/(a^(2)) , then the triangle is

In Delta ABC with usual notation (r_(1))/(bc)+(r_(2))/(ac)+(r_(3))/(ab) is:

In Delta ABC with usual notation (r_(1))/(bc)+(r_(2))/(ca)+(r_(3))/(ab) is

In Delta ABC if r_(1)=2r_(2)=3r_(3) and D is the mid point of BC then cos/_ADC=

In a Delta ABC line DE is parallel to BC.Prove that (AD)/(AB)=(DE)/(BC)=(AD)/(AC)

In equilateral triangleABC, ADbotBC. Prove that 3BC^2= 4AD^2.

The vertex A of triangle ABC is joined to a point D on the side BC. The midpoint of AD is E. Prove that ar(triangleBEC)=(1)/(2)ar(triangleABC) .

In a triangle ABC, AD is the median drawn on the side BC is produced to E such that AD= ED. prove that ABEC is a parallelograms.

ABC is a triangle in which D is the midpoint of BC and E is the midpoint of AD. Prove that ar(triangleBED)=(1)/(4)ar(triangleABC) .