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Question

Find the ratio of the areas of two similar triangles ΔABC and ΔPQR shown in the figure.

A
(ABPQ)2
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B
(BCQR)2
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C
(ACPR)2
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D
All of these
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Solution

The correct option is D All of these
We are given two triangles ABC and PQR such that ΔABCΔPQR.
For finding areas of the two triangles, we draw altitudes AM and PN of the triangles.

Ar(ΔABC)=12×BC×AM and
Ar(ΔPQR)=12×QR×PN

Ar(ΔABC)Ar(ΔPQR)=12×BC×AM12×QR×PN=BC×AMQR×PN

Now, in ΔABM and ΔPQN,
B=Q (As ΔABCΔPQR)
and M=N (Each is of 90)

So, ΔABMΔPQN (AA similarity)

AMPN=ABPQ

Also, ΔABCΔPQR

So, ABPQ=BCQR=CAPR

Ar(ΔABC)Ar(ΔPQR)
= ABPQ×AMPN
= ABPQ×ABPQ
= (ABPQ)2

Since the ratio of sides is the same,

Ar(ΔABC)Ar(ΔPQR)
= (ABPQ)2
= (BCQR)2
= (ACPR)2

If ΔABC and ΔPQR are similar, then the ratio of their areas will be equal to the square of the ratio of their corresponding sides.

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