The surface areas of three faces of a cuboid sharing a vertex are `20 m^2, 32 m^2` and `40 m^2`. What is the volume of the cuboid?

The surface areas of the faces of a cuboid sharing a vertex are given as 25" m"^2, 32" m"^2 and 32" m"^2 . What is the volume of the cuboid?

The areas of three adjacent faces of a cuboid are 30 cm^(2), 20 cm^(2) and 24 cm^(2) . The volume of the cuboid is :

The areas of the three adjacent faces of a cuboidal box are x, 4x and 9x square unit. What is the volume of the box?

The areas of three consecutive faces of a cuboid are 12 cm^(2), 20 cm^(2) and 15 cm^(2) , then the volume (in cm^(3) ) of the cuboid is

The surface area of the three coterminus faces of a cuboid are 6, 15 and 10 cm^(2) respectively. The volume of the cuboid is

If the areas of three adjacent faces of a cuboid are 8cm^(2),18cm^(3) and 25cm^(3). Find the volume of the cuboid.

Surface areas of three adjacent faces of a cuboid are p, q, r. Its volume is

The area of three consecutive faces of a cuboid are 12 cm^(2) . 20 cm^(2) and 15 cm^(2) , then the volume ( in cm^(3) ) of the cuboid is