The areas of two similar triangles are in respectively `9\ c m^2` and `16\ c m^2` . The ratio of their corresponding sides is `3:4` (b) `4:3` (c) `2:3` (d) `4:5`

The areas of two similar triangles are in respectively 16 cm^(2) and 9 cm^(2) . Then the ratio of their corresponding sides is

The areas of two similar triangles are in respectively 9cm^(2) and 16cm^(2) .The ratio of their corresponding sides is 3:4(b)4:3(c)2:3(d)4:5

The areas of two similar triangles are 9\ c m^2 and 16\ c m^2 respectively . The ratio of their corresponding sides is

The areas of two similar triangles are 9 cm^2 and 16 cm^2 respectively. The ratio of their corresponding sides is

The areas of two similar triangles are 18cm^2 and 32 cm^2 respectively. What is the ratio of their corresponding sides? a) 3:4 b) 4:3 c) 9:16 d) 16:9

The areas of two similar triangles are (7-4sqrt(3))"cm"^(2)and(7+4sqrt(3))"cm"^(2) respectively. The ratio of their corresponding sides is

Area of two similar triangles are in the ratio of 5:3 then the ratio of their corresponding sides is :

If two corresponding sides of two similar triangles are in the ratio 9:4 , then what is the ratio of their areas?

The areas of two similar triangles are 81\ c m^2 and 49\ c m^2 respectively. Find the ratio of their corresponding heights. What is the ratio of their corresponding medians?