In the given figure, ABCD is a parallelogram and PD is parallel to QC.

S1 : $△$ APD $≅$ $△$ BQC

S2 : ar( $△$ APD) + ar(PBCD) = ar( $△$ BQC) + ar(CDPB)

S1 is true but S2 is false

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S1 is false but S2 is true

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S1 and S2 are both true and S2 is the explanation for S1

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S1 and S2 are are both true and S1 is the explanation for S2

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Solution

The correct option is D
S1 and S2 are are both true and S1 is the explanation for S2

In $△$ APD and $△$ BQC

$∠ P A D = ∠ Q B C$ (corresponding angles)

AD = BC ( opp. sides of parallelogram)

$∠ A P D = ∠ B Q C$ (corresponding angles)

$△ A P D ≅ △ B Q C$ by ASA criteria

And ar( $△$ APD) = ar( $△$ BQC) (congruent triangles have equal areas)

Adding ar(PBCD) on both sides of the equation

ar( $△$ APD) + ar(PBCD) = ar( $△$ BQC) + ar(PBCD)

Therefore, both S1 and S2 are true and S1 is the explanation of S2.

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In the given figure, ABCD is a parallelogram and PD is parallel to QC. S1 : △APD ≅ △BQC S2 : ar(△APD) + ar(PBCD) = ar(△BQC) + ar(CDPB)

In the given figure, ABCD is a parallelogram and PD is parallel to QC.

S1 : $△$ APD $≅$ $△$ BQC

S2 : ar( $△$ APD) + ar(PBCD) = ar( $△$ BQC) + ar(CDPB)