In the given figure, ABCD is a parallelogram. Prove that : AB = 2BC.

Given,

ABCD is a parallelogram.

∴ AB || CD (Opposite sides of parallelogram are parallel)

From figure,

AE is the transversal.

⇒ ∠BAE = ∠AED (Alternate angles are equal) ……..(1)

⇒ ∠DAE = ∠BAE (Since, AE is the bisector of angle A) ………(2)

From equations (1) and (2), we get :

⇒ ∠AED = ∠DAE.

In △ DAE,

⇒ ∠AED = ∠DAE

⇒ AD = DE (In a triangle, sides opposite to equal angles are equal) …….(3)

From figure,

BE is the transversal.

⇒ ∠CEB = ∠EBA (Alternate angles are equal) ……..(4)

⇒ ∠CBE = ∠EBA (Since, BE is the bisector of angle B) ………(5)

From equations (4) and (5), we get :

⇒ ∠CEB = ∠CBE.

In △ CBE,

⇒ ∠CEB = ∠CBE

⇒ BC = CE (In a triangle, sides opposite to equal angles are equal) …….(6)

In parallelogram ABCD,

⇒ AB = CD (Opposite sides of parallelogram are equal)

⇒ AB = DE + EC

⇒ AB = AD + BC [From equation (3) and (6)]

⇒ AB = BC + BC (AD = BC, as opposite sides of parallelogram are equal)

⇒ AB = 2 BC.

Hence, proved that AB = 2 BC.