If the areas of three adjacent faces of a cuboid are `x ,\ y ,\ z` respectively, then the volume of the cuboid is `x y z` (b) `2x y z` (c) `sqrt(x y z)` (d) `3sqrt(x y z)`

If the area of three adjacent faces of a cuboid are X, Y and Z respectively, then find the volume of the cuboid.

If the area of three adjacent faces of a cuboid are X, Y and Z respectively, then find the volume of cuboid.

If the areas of three adjacent faces of a cuboid are x,|y,backslash z respectively,then the volume of the cuboid is xyz(b)2xyz(c)sqrt(xyz)(d)3sqrt(xyz)

The diagonals of the three faces of a cuboid are x, y, z respectively. What is the volume of the cuboid?

The areas of three adjacent faces of a cuboid are x, y and z. If the volume is V, prove that V^2 = xyz .

Assertion : If the areas of three adjacent faces of a cuboid are x, y, z respectively then the volume of the cuboid is sqrt(xyz). Reason : Volume of a cuboid whose edges are l, b and h is lbh units.