Question

prove that diagonal of parallelogram bisect each other ​

Answer 1

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Let consider a parallelogram ABCD in which AB||CD and AD||BC.

In ∆AOB and ∆COD , we have

∠DCO=∠OAB (ALTERNATE ANGLE)

∠CDO= ∠OBA. (ALTERNATE ANGLE)

AB=CD. (OPPOSITE SIDES OF ||gram)

therefore , ∆ AOB ≅ ∆COD. (ASA congruency)

hence , AO=OC and BO= OD. (C.P.C.T)

Answer 2

Step-by-step explanation:

in parallelogram ABCD we have two triangle ABD

and BCD

IN TRIANGLE ABD AND BCD WE HAVE,

AD=CB(opposite sides of parallelogram)

AB =DC(opposite sides of parallelogram)