Question

the ratio of the areas of two similar triangles is equal to the square of the ratio of their coorsponding sides​

Answer 1

Step-by-step explanation:

Let the two triangles be:

ΔABC and ΔPQR

Area of ΔABC=

2

1

×BC×AM……………..(1)

Area of ΔPQR=

2

1

×QR×PN……………………..(2)

Dividing (1) by (2)

ar(PQR)

ar(ABC)

=

2

1

×QR×PN

2

1

×BC×AM

ar(PQR)

ar(ABC)

=

QR×PN

BC×AM

…………………..(1)

In ΔABM and ΔPQN

∠B=∠Q (Angles of similar triangles)

∠M=∠N (Both 90

∘

)

Therefore, ΔABM∼ΔPQN

So,

AM

AB

=

PN

PQ

…………………….(2)

From 1 and 2

ar(PQR)

ar(ABC)

=

QR

BC

×

PN

AM

⇒

ar(PQR)

ar(ABC)

=

QR

BC

×

PQ

AB

…………………..(3)

PQ

AB

=

QR

BC

=

PR

AC

………….(ΔABC∼ΔPQR)

Putting in ( 3 )

ar(PQR)

ar(ABC)

=

PQ

AB

×

PQ

AB

=(

PQ

AB

)

2

⇒

ar(PQR)

ar(ABC)

=(

PQ

AB

)

2

=(

QR

BC

)

2

=(

PR

AC

)

2

solution