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Question
ABCD is a parallelogram. P and Q are points on diagonal DB such that DP = QB. Prove that ΔAPB ≅ ΔCQD.
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Solution
Given:
ABCD is a parallelogram.
DP = QB ...(As given)
AB || CD and AD || BC ...(Since ABCD is a parallelogram)
To Prove:
△APB ≅ △CQD.
Proof:
△APB and △CQD are congruent using the criteria of congruence.
Step 1: Show that AB = CD
Since ABCD is a parallelogram, opposite sides are equal.
Hence, AB = CD.
Step 2: Show that ∠APB = ∠CQD
In parallelogram ABCD, the angles at the opposite vertices are equal.
Therefore, ∠APB = ∠CQD.
Step 3: Show that DP = QB
This is given in the problem DP = QB.
Step 4: Conclusion (By SAS criterion)
We have:
AB = CD ...(Step 1)
∠APB = ∠CQD ...(Step 2)
DP = QB ...(Step 3)
Thus, by the Side-Angle-Side (SAS) criterion of congruence, we can conclude that △APB ≅ △CQD.
Hence, △APB ≅ △CQD is proved.
