Physics, asked by Ravimayank11, 11 months ago

Prove that the ratio of the areas of two similar triangles is equal to the ratio of the squares of their corresponding sides

Answers

Answered by Anonymous
1

Answer

Given: Δ ABC ~ Δ PQR

To Prove: ar(ΔABC) / ar(ΔPQR) = (AB/PQ)2 = (BC/QR)2 = (CA/RP)2

Construction: Draw AM ⊥ BC, PN ⊥ QR

 

ar(ΔABC) / ar(ΔPQR) = (½ × BC × AM) / (½ × QR × PN)

= BC/QR × AM/PN ... [i]

In Δ ABM and Δ PQN,

∠B = ∠Q (Δ ABC ~ Δ PQR)

∠M = ∠N (each 90°)

So, Δ ABM ~ Δ PQN (AA similarity criterion)

Therefore, AM/PN = AB/PQ ... [ii]

But, AB/PQ = BC/QR = CA/RP (Δ ABC ~ Δ PQR) ... [iii]

Hence, from (i)

ar(ΔABC) / ar(ΔPQR) = BC/QR × AM/PN

= AB/PQ × AB/PQ [From (ii) and (iii)]

= (AB/PQ)2

Using (iii)

ar(ΔABC) / ar(ΔPQR) = (AB/PQ)2 = (BC/QR)2 = (CA/RP)2

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