The ratio of the radii of a right circular cylinder cone is 3: 4 and the ratio of their heights is 2:3 Then find the ratio of the volumes of them

The ratio of the lengths of the radii of the bases of a right circular cylinder and of a right circular cone is 3:4 and the ratio of their heights is 2:3 , Find the ratio of the volumes of the cylinder and the cone.

The ratio of the length of base radii of a right circular cylinder and a right circular cone is 3:4 and the ratio of their height is 2:3. Find the ratio of their volume.

If the ratio of the volumes of two right circular cones is 16 : 27 and the ratio of their height is 4 : 3, then the ratio of their radii is

The ratio of the radii of two cylinders is 2:3 and the ratio of their heights is 5:3.Find the ratios of their volumes and their curved surfaces.

The ratio of the volumes of two right circular cylinders A and B (x)/(y) is and the ratio of their heights is a : b. What is the ratio of the radii of A and B?

The volumes of two right circular cylinders are same. The ratio of their height is 1 : 2. Find the ratio of their radii.

The ratio of height of two cylinders is 5:3, as well as the ratio of their radii is 2:3. find the ratio of the volumes of the cylinders.

If the radii of two cylinders are in the ratio 2:3 and their heights are in the ratio 5:3, then find the ratio of their volumes.

If the radii of two cylinders are in the ratio 2:3 and their heights are in the ratio 5:3, then find the ratio of their volumes.

If the radii of two cylinders are in the ratio 2:3 and their heights are in the ratio 5:3, then find the ratio of their volumes.