$E$ and $F$ are points on diagonal $A C$ of a parallelogram $A B C D$ such that $A E = C F$ . Show that $B F D E$ is a parallelogram.

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Solution

Step 1: Construction.
Join $B D$ , meeting $A C$ at $O$ .
$E$ and $F$ are points on diagonal $A C$ of a parallelogram $A B C D$ such that $A E = C F$

Step 2: Prove that $B F D E$ is a parallelogram.
Since diagonals of a parallelogram bisect each other,
We note that $O A = O C & O D = O B .$
And, $O A = O C a n d A E = C F,$
$\Rightarrow$ $O A - A E = O C - C F$
$\Rightarrow$ $O E = O F$
So, $B F D E$ is a quadrilateral whose diagonals bisect each other.
Hence, $B F D E$ is a parallelogram.

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