A cubical block of steel of each side equal to 1 is floating on mercury in vessel. The densities of steel and mercury are `rho_(s) " and " rho_(m)`. The height of the block above the mercury level is given by

A cubical block of iron 5 cm on each side is floating on mercury in a vessel. (i) what is the height of the block above mercury level ? (ii) Water is poured in the vessel unitl it just covers the iron block. What is the height of water column . density of mercur 13.6 gm//cm^(3) . Density of iron 7.2 gm//cm^(3)

A cubical block of iron of side 5 cm is floating in mercury taken in a vessel. What is the height of the block above mercuery level. (rho_(Hg)=13.6g//cm^(3),rho_(Fe)=7.2g//cm^(3))

A cube of iron whose sides are of length L, is put into mercury. The weight of iron cube is W. The density of irons is rho_(1) , that of mercury is rho_(M) . The depth to which the cube sinks is given by the expression

A cubical block of iron of side 13.6 cm is floating in mercury in a vessel .Water is poured in the vessel until it just covers the iron block. What is the height of water column? ( rho_Hg=13.6gm/cm^3 , rho_Fe=7.2 gm/cm^3 , rho_H_2O=1 gm/cm^3 )

A cubical block of copper of side 10cm is floating in a vessel containing mercury. Water is poured into the vessel so that the copper block just gets submerged. The height of water column is ( rho_(Hg) = 13.6 g//c c , rho_(Cu) = 7.3 g//c c , rho_(water) = 1gm//c c)

A cubical metal block of edge 12 cm floats in mercry with one fifth of the height inside the mercury. Water poured till the surface of the block is just immersed in it. Find the height of the block is just immersed in it. Find the height of the water column to be poured. Specific gravity of mercury =13.6.