In the given figure `/_ ABC - /_ AYX`, then the ratio of the corresponding sides is :

In the given Delta ABC =~ Delta PQC . The ratio of their corresponding sides is :

If two triangles are similar such that the ratio of their areas is 25 : 16 , then is the ratio of their corresponding medians ?

Two isosceles triangles are having equal vertical angles and their areas are in the ratio 9 : 16 . Find the ratio of their corresponding altitudes.

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

To construct a triangle similar to a given triangle ABC with its sides (8)/(5) th the corresponding sides of triangle A, B, C draw a ray BX such that CBX is an acute angle and X is on the opposite side of A with respect to BC. The minimum number of points to be located at equal distances on the ray BX

To construct a triangle similar to a given triangle ABC with its sides (3^(th) )/(7) the corresponding sides of triangle ABC, first draw a ray BX such that CBX is an acute angle and X lies on the opposite side of A with respect to BC. Them, locate points B_1, B_2, B_3, ... on BX at equal distance and the next step is to join

If the given triangles are similar, then the ratio between their sides is :

Two similar triangles have areas 120 sq. cm and 480 sq. cm respectively. Then the ratio of any pair of corresponding sides is :