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Answer:
Given:
E,F,G and H are respectively the mid-points of the sides of a parallelogram ABCD.
To Prove:
ar(EFGH)=
2
1
ar(ABCD)
Construction:
H and F are joined.
Proof:
AD∥BC and AD=BC (Opposite sides of a parallelogram)
⇒
2
1
AD=
2
1
BC
Also,
AH∥BF and and DH∥CF
⇒AH=BF and DH=CF ∣ H and F are mid points
Thus,
ABFH and HFCD are parallelograms.
Now,
△EFH and ||gm ABFH lie on the same base FH and between the same parallel lines AB and HF.
∴ Area of EFH=
2
1
ar(ABFH) --- (i)
Also,
Area of GHF=
2
1
ar(HFCD) --- (ii)
Adding (i) and (ii),
Area of △EFH+ area of △GHF =
2
1
ar(ABFH)+
2
1
ar(HFCD)
⇒ Area of EFGH= Area of ABFH
⇒ar(EFGH)=
2
1
ar(ABCD)
solution
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