A : Equation ofcontinuity is `A_(1) v_(1) rho_(1) = A_(2) v_(2) rho_(2)` (symbols have their usual meanings).
R : Equation of continuity is valid only for incompressible liquids.

Using graphical method, derive the equations v = u + at and s = ut + (1)/(2)at^(2) where symbols have their usual meanings.

In the derivation of P_1-P_2=rhogz it was asumed that the liquid is incompressible. Whuy will tis equation not be stictly valid for a compressible liquid?

Find the dimensional formulae of following quantities: (a) The surface tension S, (b) The thermal conductivity k and (c) The coefficient of viscosity eta . Some equation involving these quantities are S=(rho g r h)/(2) " " Q=k(A(theta_(2)-theta_(1))t)/(d) and " " F=-etaA(v_(2)-v_(1))/(x_(2)-x_(1)) , where the symbols have their usual meanings. ( rho -density, g- acceleration due to gravity , r-radius,h-height, A-area, theta_(1)&theta_(2) - temperatures, t-time, d-thickness, v_(1)&v_(2) -velocities, x_(1)& x_(2) - positions.)

Three liquids of densities rho_(1), rho_(2) and rho_(3) (with rho_(1) gt rho_(2) gt rho_(3) ), having the same value of surface tension T, rise to the same height in three identical capillaries. The angles of contact theta_(1), theta_(2) and theta_(3) obey

A solid sphere having volume V and density rho floats at the interface of two immiscible liquids of densityes rho_(1) and rho_(2) respectively. If rho_(1) lt rho lt rho_(2) , then the ratio of volume of the parts of the sphere in upper and lower liquid is

From energy conservation principle prove the relations, A_r = ((v_2-v_1)/(v_1 +v_2))A_i and A_t = ((2v_2)/(v_1 +v_2))A_i Here, symbols have their usual meanings.

A uniform sphere of density rho floats at the interface of two liquids of densities rho_(1) and rho_(2)(>rho_(1)) The sphere has (2)/(3) rd of vertical diameter in denser liquid and remaining part in the other liquid.If a rho=b rho_(1)+c rho_(2) then b+c-a=_______.