Question

The ratio of corresponding sides of two similar triangles is 3:5,
then Find the ratio of their areas.​

Answer 1

Given:-

The ratio of the corresponding sides of two similar triangles is 3:5.

Solution:-

Let the ratio of corresponding sides of two similar triangles be side 1 : Side 2 = 3 : 5 .

And let the ratio of areas of two similar triangles is Area 1 : Area 2.

Now as we know that if two triangles similar, then the ratio of areas is equal to the ratio of squares of corresponding sides.

so,

➟Area 1 / Area 2 = ( Side 1 /side 2 )²

➟Area 1 / Area 2 = (3/5)²

➟Area 1 / Area 2 =9/25

•°•➩9/25

Answer 2

Answer:

Area of traingle 1/ Area of triangle 2= (3/5)^2

= 9/25