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Question

ABCD is a parallelogram. E and F are the mid-Points of BC and AD respectively. Show that the segments BF and DE trisect the diagonal AC. [4 MARKS]


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Solution

Concept: 1 Mark
Application: 1 Mark
Proof: 2 Marks

Since DF=12AD and BE=12BC DF=BE

Also, since ADBC, we can say that DFBE.

Thus, we can conclude that DFBE is a parallelogram and that it’s opposite sides FB and DE are parallel.

Now consider ΔCPB

E is the midpoint of BC and QEPB.

Q is the midpoint of CP or CQ=QP……..(1)
[Converse of midpoint theorem]

Now consider ΔADQ

F is the midpoint of AD and DQFP.

P is the midpoint of AQ or AP=QP……..(2) [Converse of midpoint theorem]

Combining (1) and (2), we get,
CQ=QP
AP=QP
AP=PQ=QC

The line segments BF and DE trisect the diagonal AC.

Hence proved.


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