Some pieces of impurity (density `=rho`) is embedded in ice. This ice is floating in water (density `rho_(w))`. When ice melts level of water will
(a). Fall if `rhogtrho_(w)`
(b). Remain unchanged if `rholtrho_(w)`
(c). fall if `rholtrho_(w)`
(d). rise if `rhogtrho_(w)`

Statement-1: An ice cube is floating in water in a vessel at 0^(@)C when ice cube melts level of water in the vessel remain same. Statement-2: Volume of melted ice is same as volume of water displaced by ice.

A body of weight W and density rho floats on liquid . What will its apparent weight ?

A piece of ice having a stone frozen in it floats in a glass vessel filled with water. How will the level of water in the vessel change when the ice melts?

Density of ice is rho and that of water is sigma .What will be from following decrease in volume when a mass M of ice melts ?

An open pan P filled with water of density (rho_w) is placed on a vertical rod, maintaining equilibrium. A block of density rho is placed on one side of the pan as shown. Water depth is more then height of the block.

An ice cube floats on the surface of water filled in glass tumbler (density of ice =0.9 g//cm^(3)). Will the water level in the glass rise? When the ice melts completely (AS_(1))

A U tube is rotated about one of it's limbs with an angular velocity omega . Find the difference in height H of the liquid (density rho ) level, where diameter of the tube dlt lt L .

A cylinderical container of length L is full to the brim with a liquid which has mass density rho . It is placed on a weight scale, the scale reading is w. A light wall ball which would float on the liquid if allowed to do so, of volume V and mass m is pushed gently down and held beneath the surface of the liquid with a rigid rod of negligible volume as shown on the left Q. What is the mass M of liquid which overflowed while the ball was being pushed into the liquid? (a). rhoV (b). m (c). m-rhoV (d). none of these

Iceberg floats in water with part of it submerged .What is the fraction of the volume of inceberg submerged if the density of ice is rho_(i)=0.917g//cm^(3) .

When an object moves through a fluid, as when a ball falls through air or a glass sphere falls through water te fluid exerts a viscous foce F on the object this force tends to slow the object for a small sphere of radius r moving is given by stoke's law, F_(w)=6pietarv . in this formula eta in the coefficient of viscosity of the fluid which is the proportionality constant that determines how much tangential force is required to move a fluid layer at a constant speed v, when the layer has an area A and is located a perpendicular distance z from and immobile surface. the magnitude of the force is given by F=etaAv//z . For a viscous fluid to move from location 2 to location 1 along 2 must exceed that at location 1, poiseuilles's law given the volumes flow rate Q that results from such a pressure difference P_(2)-P_(1) . The flow rate of expressed by the formula Q=(piR^(4)(P_(2)-P_(1)))/(8etaL) poiseuille's law remains valid as long as the fluid flow is laminar. For a sfficiently high speed however the flow becomes turbulent flow is laminar as long as the reynolds number is less than approximately 2000. This number is given by the formula R_(e)=(2overline(v)rhoR)/(eta) In which overline(v) is the average speed rho is the density eta is the coefficient of viscosity of the fluid and R is the radius of the pipe. Take the density of water to be rho=1000kg//m^(3) Q. What is the viscous force on a glass sphere of radius r=1mm falling through water (eta=1xx10^(-3)Pa-s) when the sphere has speed of 3m/s?