A tank 5 m high is half filled with water and then is filled to top with oil of density `0.85 g//cm^3` The pressure at the bottom of the tank, due to these liquids is

A tank 5 m high is hall filled with water and then is filled to the top with oil of density 0.85 g//cm^(3) The pressure at the bottom of the tank, due to these liquids is

A tank having a base area of 20m^(2) and a height of 5 m is half-filled with water and the remaining half is filled with a liquid of density 0.86g*cm^(-3) . Calculate the total thrust exerted at the bottom of the tank. [ g=10m*s^(-2) ]

A rectangular tank is 10 m long 5 m broad and 3m high. It is filled to the rim with water of density 10^(3)kgm^(-3). Calculate the thrust at the bottom and walls of the tank due to hydrostatic pressure. Take g=9.8"ms"^(-2).

A hole is made at the bottom of the tank filled with water (density =1000 kgm^(-3)) . If the total pressure at the bottom of the tank is three atmospheres (1 atmosphere =10^(5) Nm^(-2)) , then the velocity of efflux is nearest to

A hole is made at the bottom of the tank filled with water (density =1000 kgm^(-3)) . If the total pressure at the bottom of the tank is three atmospheres (1 atmosphere =10^(5) Nm^(-2)) , then the velocity of efflux is nearest to

A cylinder of 4 m height is half filled with oil of density 0.72 g cm ""^(-3) . If the Becond half of cylinder is filled with water, then find the pressure at the bottom of cylinder due to these liquids.

One third of a cylinder of 3 m height is filled with oil of density 0.62 g cm ""^(-3) . and the rest of it is filled with mercury of density 13.6 g cm ""^(-3) . Calculate the total pressure at the bottom of cylinder due to both oil and mercury.

A water tank is 20 m deep . If the water barometer reads 10 m at the surface , then what is the pressure at the bottom of the tank in atmosphere ?

A water tank is 20 m deep . If the water barometer reads 10 m at the surface , then what is the pressure at the bottom of the tank in atmosphere ?