Question

In parallelogram ABCD,E is the mid-point of side AB and CE bisects angle BCD.Prove that:Angle DEC is a right angle.PLZ FASTWHOEVER WRITES IN 10 TO 15 MINS WOULD BE THE BEST ANSWERER.

Answer 1

Draw parallelogram ABCD.  Mark E at the midpoint of AB.  Join CE.  Let ∠BCE = ∠ECD.  Draw EF parallel to BC meeting CD at F.

As EBCF is a parallelogram,  ∠BEC = ∠ ECF = x.
Hence,  in ΔEBC,  EB = BC.

Hence,  EB = BC = CF = FD = EF = AE = AD

Now, quadrilaterals  AEFD and  EBCF are Rhombuses as opposite sides are parallel and the sides are equal.

Their diagonals are perpendicular.
Hence,   EC ⊥ BF.
 We know that  ED || BF  

hence,  EC ⊥ ED.   Hence,  ∠ DEC = 90°