If the ratio of the sides of two similar triangles be `4:9`, then ratio of areas will be

If the ratio of the sides of two similar triangle is 3:5 , then ratio of the areas is :

If the ratio of sides of two similar triangles is 2:5, then the ratio of their areas will be :

If the ratio of the sides of two similar triangles is 3 : 5, then the ratio of their areas is :

Ratio of areas of two similar triangles are

The side of two similar triangles are 4:9. What is the ratio of their area?

The ratio of the sides of two similar triangles is 3:7, ratio of areas of these two triangles is :

Ratio of the area of two similar triangles is 9:25. The ratio of their base is

If the ratio of the perimeter of two similar triangles is 4:25, then find the ratio of the areas of the similar triangles.

If the ratio of the perimeter of two similar triangles is 4:25, then find the ratio of the areas of the similar triangles

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