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Theorem 2: Opposite Sides in a Parallelogram Are Equal

If BDEF and F...

Question

If BDEF and FDCE are parallelograms, then
___ lies equidistant to points B and C. (Fill in one among A/F/E/D).

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Solution

Since BDEF and FDCE are parallelograms,
BD = FE and DC = FE
Hence, we can see that BD is equal to DC and so, D is the mid-point of BC.

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