A solid cube is cut into two cuboids of equals volumes. Find the ratio of the total surface area of the given cube to one of the cuboids.

A solid cube is cut into two cuboids of equal volumes.Find the ratio of the total surface area of the given cube and that of one of the cuboids.

A solid metallic cuboid of dimensions 18cmxx36cmxx72cm is melted and recast into 8 cubes of the same volume. What is the ratio of the total surface area of the cuboid to the sum of the lateral surface areas of all 8 cubes?

A cube of edge 5 cm is cut into cubes each of edge of 1 cm. The ratio of the total surface area of one of the small cubes to that of the large cube is equal to :

A cube of edge 5 cm is cut into cubes each of edge of 1 cm. The ratio of the total surface area of one of the small cubes to that of the large cube is equal to :

If a cuboid of dimensions 32 cm xx 12 cm xx 9 cm is cut into two cubes of same size, what will be the ratio of the surface area of the cuboid to the total surface area of the two cubes?

The side of a cube is double the length of the cuboid. The breadth and height of the cuboid are half of its length. Find the ratio of the curved surface area of the cube to cuboid.

Three equal cubes are placed adjacently in a row. Find the ratio of the total surface area of the resulting cuboid to that of the sum of the total surface areas of the three cubes.