An iceberg is floating on sea water. What part of it remains above water? The densities of ice and sea water are `0.918g*cm^(-3)and1.03g*cm^(-3)` respectively.

A cubical steel block floats on mercury erectly. If each side of the cube is 10 cm, (i) how much of the body is above the mercury surface? (ii) If water is poured over mercury and it just covers the upper surface of the cube, then what will be the depth of the water column? Densities of steel and mercury are 7.8g*cm^(-3)and13.6g*cm^(-3) respectively.

Thermal capacities of mercury and glass of the same volume are equal. Densities of mercury and glass are "13.6 g.cm"^(-3) and "2.5 g.cm"^(-3) respectively. If the specific heat capacity of mercury is "0.03 cal.g"^(-1).^(@)C^(-1) . Find that of glass.

What fraction of floating ice remains below the surface of water?

At 100^(@)C and 1 atm pressure, the densities of water and water and water vapour are 1.0 g*mL^(-1) and 0.0006 g*mL^(-1) respectively. What is the total volume of water molecules in 1 litre of steam at 100^(@)C ?

A piece of iron is floating in mercury. If 5/9 part of the piece remains below mercury, then what will be its density? The density of mercury = 13.59g*cm^(-3)

A body of mass 300 g is floating in saline water with half of the body outside. What are the volume and density of the material of that body? [Density of saline water = 1.03g*cm^(-3) ]

The apparent weights of two bodies suspended from the two ends of a balance beam and immersed in water are the same. The mass and density of one body are 32g and 8g*cm^(-3) respectively. If the density of the other body is 5g*cm^(-3) , then find its mass.

A piece of ice of density 900kg*m^(-3) floats on water. The part of the piece of ice that remains outside the water surface is

Each side of an iron cube is 5 cm. This cube floats on mercury. What height of the cube remains above the surface of mercury? To cover the cube, if water is poured over mercury, then what will be the height of the water column? The density of iron is 7.2g*cm^(-3) and the density of mercury is 13.6g*cm^(-3) .