ABCD is a parallelogram in which `angleDAB=80^(@)`. Bisector of `angleA and angleB` meets CD at P. Prove that :

(i) AD = DP
(ii) CP = CB
(iii) DC = 2AD

In a parallelogram ABCD, the bisectors of angleA and angleB intersect each other at point P. Prove that angleAPB=90^(@).

In parallelogram ABCD, the bisector of angle A meets DC at P and AB = 2AD. Prove that : (i) BP bisects angle B. (ii) Angle APB = 90^(@)

In parallelogram ABCD, the bisector of angle A meets DC at P and AB= 2AD. Prove that: Angle APB= 90^(@)

In parallelogram ABCD, the bisector of angle A meets DC at P and AB= 2AD. Prove that: BP bisects angle B

ABC is a right triangle with AB = AC .If bisector of angle A meet BC at D then prove that BC = 2 AD .

In a parallelogram ABCD, angleBCD=60^(@) If the bisectors AP and BP of angleA and angleB respectively, meet the side CD at point P, then prove that CP = PD.

In the adjoining figure ABCD is a parallelogram, ABM is a line segment and E is the mid-point of BC. Prove that : (i) DeltaDCE cong DeltaMBe (ii) AB = BM (iii) AM=2DC

ABCD is a quadrilateral in which AB||DC and AD = BC. Prove that angleA=angleB and angleC= angleD .

In the adjoining figure, DeltaABC is an isosceles triangles in which AB=AC and AD is the bisector of angleA . Prove that : (i) DeltaADB~=DeltaADC (ii) angleB=angleC (iii) BD=DC (iv) ADbotBC

In the given figure, ABCD is a parallelogram in which AN and CP are perpendiculars on diagonal BD. Prove that : (i) DeltaADN =DeltaCBP (ii) AN=CP