Points E and F lie on diagonal AC of a parallelogram ABCD such that AE = CF. What type of quadrilateral is BFDE?

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Solution

$In the {II}^{gm} ABCD : AO = OC . . . . . . (i) (diagonals of a parallelogram bisect each other) AE = CF . . . . . . . (ii) (given) Subtracting (ii) from (i) : AO - AE = OC - CF EO = OF . . . . . . . . . (iii) In ∆ DOE and ∆ BOF : EO = OF (proved above) DO = OB (diagonals of a parallelogram bisect each other) ∠ DOE = ∠ BOF (vertically opposite angles) By SAS congruence : ∆ DOE ≅ ∆ BOF ∴ DE = BF (c . p . c . t) In ∆ BOE and ∆ DOF : EO = OF (proved above) DO = OB (diagonals of a parallelogram bisect each other) ∠ DOF = ∠ BOE (vertically opposite angles) By SAS congruence : ∆ DOE ≅ ∆ BOF ∴ DF = BE (c . p . c . t) Hence, the pair of opposite sides are equal . Thus, DEBF is a parallelogram .$

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