Mathematics
In the adjoining figure, D is a point on BC such that ∠ABD = ∠CAD. If AB = 5 cm, AC = 3 cm and AD = 4 cm, find
(i) BC
(ii) DC
(iii) area of △ACD : area of △BCA
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Answer
(i) Considering △ABC and △ACD,
∠C = ∠C (Common angles)
∠ABC = ∠CAD (Given)
Hence by AA axiom △ABC ~ △ACD. Since triangles are similar hence the ratio of the corresponding sides will be equal
Hence, the length of BC = 3.75 cm.
(ii) Since triangles △ABC and △ACD are similar hence the ratio of the corresponding sides will be equal.
Hence, the length of DC = 2.4 cm.
(iii) 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 area of △ACD : area of △BCA is 16 : 25.
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