(B) The condition for terminal speed $v_{T}$ is that the net force on the ball is zero. At terminal velocity,the weight of the ball is balanced by the

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$\left[\frac{V g(\rho-\sigma)}{K}\right]^{\frac{1}{2}}$

(B) The condition for terminal speed $v_{T}$ is that the net force on the ball is zero. At terminal velocity,the weight of the ball is balanced by the buoyant force and the viscous drag force.Weight $(W) = \rho V g$Buoyant force $(f) = \sigma V g$Viscous force $(F) = K v_{T}^2$Equating the forces: $W = f + F$$\rho V g = \sigma V g + K v_{T}^2$$K v_{T}^2 = V g (\rho - \sigma)$$v_{T}^2 = \frac{V g (\rho - \sigma)}{K}$$v_{T} = \sqrt{\frac{V g (\rho - \sigma)}{K}}$

Class 11 Physics Fluid Mechanics and Surface Tension Viscosity and Stoke's Law and Terminal Velocity

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$A$ spherical solid ball of volume $V$ is made up of a material of density $\rho$. It is falling through a liquid of density $\sigma$ $(\sigma < \rho)$. Assume that the liquid applies a viscous force on the ball that is proportional to the square of the terminal speed $v_{T}$,$F = -K v_{T}^2$ $(K > 0)$. Then,the terminal speed of the ball is ($g =$ acceleration due to gravity).

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A
$\left[\frac{V g \rho}{K}\right]^{\frac{1}{2}}$
B
$\left[\frac{V g(\rho-\sigma)}{K}\right]^{\frac{1}{2}}$
C
$\frac{V g(\rho-\sigma)}{K}$
D
$\frac{V g \rho}{K}$

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Fluid Mechanics and Surface Tension

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Viscosity and Stoke's Law and Terminal Velocity

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$A$ metal sphere of radius $R$ and density $\varrho_{1}$ moves with terminal velocity $v_{1}$ through a liquid of density $\sigma$. Another sphere of the same radius but of density $\varrho_{2}$ moves through the same liquid. Its terminal velocity will be:

Eight spherical rain drops of the same mass and radius are falling down with a terminal speed of $6 \ cm \ s^{-1}$. If they coalesce to form one big drop,what will be the terminal speed of the bigger drop (in $cm \ s^{-1}$)? (Neglect the buoyancy of the air)

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