The radii of a right circular cone and a right circular cylinder are in the ratio 2:3. If the ratio of heights of the cone and the cylinder is 3:4, then what is the ratio of the volumes of the cone and the cylinder?

If the radius and the perpendicular height of a cone and cylinder is equal then write the ratio of their volumes.

The ratio of the heights of a right circular cone and a right circular cylinder is 8:9 and the ratio of the radii of their bases is 3:4. If the volume of the cylinder is 132 cubic cm , then the volume (in cubic cm) of the cone is:

The base radii of two right circular cones of the same height are in the ratio 3:5. Find the ratio of their volumes.

The Base radii of two Right circular cone of the same height are in the ratio 3:5. Find the ratio of the volumes.

The base radii of two right circular cones of the same height are in the ratio 5:5. Find the ratio of their volumes.

The ratio of diameter and higher of a right circular cylinder is 4 : 7. The ratio of heights of cylinders is 5 : 2. What is the ratio of the volume of cylinder?

A right circular cylinder and a right circular cone have the same radius and the same volume. The ratio of the height of the cylinder to that of the cone is

The heights of two right circular cones are in the ratio 1:2 and the perimeters of their bases are in the ratio 3:4. Find the ratio of their volumes.

The radii of two right circular cylinders are in the ratio 2:3 and their heights are in the ratio 5:4. Calculate the ratio of their curved surface areas.

A right circular cone and a right circular cylinder have the same base and their heights are in the ratio 2:3. The ratio of their volumes will be