The areas of two similar triangles are `36\ c m^2` and `100\ c m^2` . If the length of a side of the smaller triangle in 3 cm, find the length of the corresponding side of the larger triangle.

The areas of two similar triangles are 36cm^(2) and 100cm^(2) .If the length of a side of the smaller triangle in 3cm, find the length of the corresponding side of the larger triangle.

Areas of two similar triangles are 36 cm^(2) and 100 cm^(2) . If the length of a side of the larger triangle is 20 cm find the length of the corresponding side of the smaller triangle.

The perimeter of two similar triangles are 20 cm and 16 cm respectively. If the length of one side of the first triangle is 9 cm, then find the length of the length corresponding side of second triangle.

The areas of two similar triangles are 169\ c m^2 and 121\ c m^2 respectively. If the longest side of the larger triangle is 26cm, what is the length of the longest side of the smaller triangle?

The areas of two similar triangles are 169\ c m^2 and 121\ c m^2 respectively. If the longest side of the larger triangle is 26cm, find the longest side of the smaller triangle.

The perimeters of two similar triangles are 30 cm and 20 cm respectively. If one side of the first triangle is 9 cm long, find the length of the corresponding side of the second triangle.

The areas of two similar triangles are 169cm^(2) and 121cm^(2) respectively.If the longest side of the larger triangle is 26cm, what is the length of the longest side of the smaller triangle?

The areas of two similar triangles are 100\ c m^2 and 49\ c m^2 respectively. If the altitude of the bigger triangle is 5 cm, find the corresponding altitude of the other.

The perimeters of two, similar triangles ABC and PQR are 75 cm and 50 cm respectively. If the length of one side of the triangle PQR is 20 cm, then what is the length of corresponding side of the triangle ABC?

The perimeters of two similar triangles are 25cm and 15cm respectively. If one side of the first triangle is 9cm, find the length of the corresponding side of the second triangle. OR In an equilateral triangle ABC, D is a point on side BC such that BD = 1/3 BC. Prove that 9 AD^(2)=7AB^(2)