D and E are the mid-points of the sides AB and AC respectively of DABC. DE is produced to F. To prove that CF is equal and parallel to DA, we need an additional information which is


Let us assume that, DE = EF


AE = CE [ E is mid-point of AC]


DE = EF [assumed]


AED = FEC [vertically opposite angles]


By SAS, ∆AED FEC


By CPCT, AD = CF and ADE = CFE


alternate interior angles are equal


AD CF


That proves our assumption was correct


Hence, DE = EF

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