Mathematics
In △ABC, AP : PB = 2 : 3. PO is parallel to BC and is extended to Q so that CQ is parallel to BA. Find :
(i) area △APO : area △ABC
(ii) area △APO : area △CQO.
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Answer
(i) Given,
Considering △APO and △ABC,
∠ A = ∠ A (Common angles)
∠ APO = ∠ ABC (Corresponding angles are equal)
Hence, by AA axiom △APO ~ △ABC.
We know that, the ratio of the areas of two similar triangles is equal to the ratio of the square of their corresponding sides.
Hence, the ratio of the area of △APO : area of △ABC = 4 : 25.
(ii) In parallelogram PBCQ opposite sides are equal,
so, PB = QC. Hence, .
Considering △APO and △CQO,
∠ AOP = ∠ QOC (Vertically opposite angles)
∠ OAP = ∠ OCQ (Alternate angles are equal)
Hence, by AA axiom △APO ~ △CQO.
We know that, the ratio of the areas of two similar triangles is equal to the ratio of the square of their corresponding sides.
Hence, the ratio of the area of △APO : area of △CQO = 4 : 9.
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