In `DeltaABC,"seg " BD" bisects "angleABC and"Ray " CE" bisects " angleACB. "if seg "AB~="seg "AC` then prove that ED||BC.

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

In DeltaABC,"seg " BD" bisects "angleABC,"if" AB=x,BC=x+5,AD=x-2,DC=x+2 .Then find the value of x.

In DeltaABC, ray BD bisects angleABC,A-D-C, Side DE|| Side BC. A-E-B. then prove that AB:BC=AE:EB

In DeltaABC ray BD bisects angleABC " "A-D-C,"side DE || side BC" A-E-B "then prove",(AB)/(BC)=(AE)/(EB)

In quadrilateral ABCD, AB=AD, AC bisects angleA . Prove DeltaABC~ADC .

In Delta ABC, "seg" AD bot "seg" BC, DB = 3CD . Prove that: 2 AB^(2) = 2AC^(2) + BC^(2)

Draw right angled traingle DeltaABC with angleA=40^@ and seg AB=5.5 cm.

ABCD is trapezium with AB || DC. The diagonal AC and BD intersect at E . If Delta AED ~ Delta BEC . Prove that AD = BC .

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) .