In the figure,l, m, and n are straight lines | vedclass

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(N/A) We are given that $AD \parallel n$. The triangles $	riangle APD$ and $	riangle AQD$ lie on the same base $AD$ and are between the same paralle

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(N/A) We are given that $AD \parallel n$. The triangles $\triangle APD$ and $\triangle AQD$ lie on the same base $AD$ and are between the same parallel lines $AD$ and $n$.
Therefore,$\operatorname{ar}(\triangle APD) = \operatorname{ar}(\triangle AQD) \dots(1)$
Now,adding $\operatorname{ar}(ABCD)$ to both sides of equation $(1)$,we get:
$\operatorname{ar}(\triangle APD) + \operatorname{ar}(ABCD) = \operatorname{ar}(\triangle AQD) + \operatorname{ar}(ABCD)$
From the figure,$\operatorname{ar}(\triangle APD) + \operatorname{ar}(ABCD) = \operatorname{ar}(ABCDP)$ and $\operatorname{ar}(\triangle AQD) + \operatorname{ar}(ABCD) = \operatorname{ar}(ABCQ)$.
Thus,$\operatorname{ar}(ABCDP) = \operatorname{ar}(ABCQ)$.

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