A thread of mercury of 10.2 g is in a tube of uniform cross-section `0.1cm^2`. Calculate the length of the thread. The density of mercury is `13.6(g)/(cm^3)`.

The density of mercury is 13.6g//mc^(3) .Estimate the b value.

A vertical U-tube of uniform cross-section contains mercury in both arms A glycerine (relative density =1.3) column of length 10 cm is introduced into one of the arms. Oil of density 800 gm m^(-3) is poured into the other arm until the upper surface of the oil and hlycerine are at the same horizontal level, find the length of the column. Density of mercury is 13.6xx10^(3)kgm^(-3)

What volume will 250 g of mercury occupy ? (Density of mercury =13.6 g cm^(-3) )

A vertical U tube of uniform cross section contains mercury in both of its arms. A glycerine (d=1.3g//cm^(3)) column of length 10 cm is introduced into one of the arms. Oil of density 0.8g//cm^(3) is poured in the other arm until the upper surfaces of the oil and glycerine are in the same horizontal level. Find the length of oil column. Densit of mercury is 13.6g//cm^(3) .

The column of mercury in a barometer is 76 cm Hg. Calculate the atmosphere pressure I the density of mercury =13600kgm^(-3) (Take g=10ms^(-2) )

The hieght of a mercury barometer is 75.6 cm . the baromter tube has cross -section of 1cm ^(2) and the volume of the enclosed space above the mercury surface is 10 cc. one cc of air at atmospheric pressure is introduced into the tube. Find the change in the reading of the barometer.

A U-tube of uniform cross-section holds 1 kg of pure mercury and 0.2 kg of water in equilibrium. The diameter of cross-section is 1.2 cm. Relative density of mercury is 13.6. If the system in equilibrium is slightly disturbed, the period of oscillation of the liquid column in the tube will be (take g=10ms^(-2) )

A glass tube of length l_(0) and of uniform cross-section is to be filled with mercury so that the length of the tube unoccoupied by mercury remains same at all temperatures. If gamma_(g)=3alpha , calculate length of mercury column.

Water rises to a height of 10 cm in a capillary tube and mercury falls to a depth of 3.42 cm in the same capillary tube. If the density of mercury is 13.6 g//c.c. and the angles of contact for mercury and water n for water and are 135^(2) and 0^@ , respectively, the ratio of surface, tension for water and mercury is