In Fig., $ ABCD$ is a parallelogram and $ BC$ is produced to a point $ Q$ such that $ AD=CQ$. If $ AQ$ intersect $ DC$ at $ P$, show that $ ar.\left(BPC\right)$$ =$$ ar.\left(DPQ\right)$. [Hint : Join $ AC$.]

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Solution

Step 1: Simplify the given information by construction
Given diagram $A B C D$ is a parallelogram, where $A D = C Q$
Join $A C$
Step 2: Prove the area of given triangles equal
We need to prove, $a r . (B P C)$ $=$ $a r . (D P Q)$
$A C Q D$ will be parallelogram ( $∴ A D = C Q, A D ∥ C Q$ )
In $∆ A P C$ and $∆ Q P D$
$A C = Q D$ [opposite side of parallelogram]
$∠ P C A = ∠ P A C$ [Altitude interior angles]
$∴ ∆ A P C ≅ ∆ Q P D$ [From A.S.A congruence]
$a r . (A P C) = a r . (B P C)$ [because both lie on the same base $P C$ and between same $∥$ lines $P C$ and $A B$ ]
From above equations
$a r . (B P C)$ $=$ $a r . (D P Q)$ .
Hence proved.

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[Hint: Join AC.]

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