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Question
ABCD is a parallelogram and AF || DE. Prove that area (|| gm DEFH) = area (|| gm ABCD).
[Hint: Each || gm is equal in area to || gm ADEG]
Theorem
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Solution
We know that,
Parallelograms on the same base and between the same parallels are equal in area.
Since, || gm ADEG and || gm DEFH are on same base DE and between same parallels AF and DE.
∴ ar(|| gm ADEG) = ar(|| gm DEFH) ...(i)
Also, || gm ADEG and || gm ABCD are on same base AD and between same parallels AD and BE.
∴ ar(|| gm ADEG) = ar(|| gm ABCD) ...(ii)
From (i) and (ii),
Area(|| gm DEFH) = Area(|| gm ABCD)
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