(D) The rise of a liquid in a capillary tube is given by the formula: $h = \frac{2 T \cos \theta}{r \rho g}$.Rearranging for the angle of contact,we g

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$\theta_{1} < \theta_{2} < \theta_{3}$

(D) The rise of a liquid in a capillary tube is given by the formula: $h = \frac{2 T \cos \theta}{r \rho g}$.Rearranging for the angle of contact,we get: $\cos \theta = \frac{h r \rho g}{2 T}$.Here,$h$ (rise),$r$ (radius),and $T$ (surface tension) are constants for all three liquids.Thus,$\cos \theta \propto \rho$.Given the densities are $\varrho_{1} > \varrho_{2} > \varrho_{3}$,it follows that $\cos \theta_{1} > \cos \theta_{2} > \cos \theta_{3}$.Since the cosine function is a decreasing function for angles between $0$ and $\frac{\pi}{2}$,a larger cosine value corresponds to a smaller angle.Therefore,$\theta_{1} < \theta_{2} < \theta_{3}$.

Class 11 Physics Fluid Mechanics and Surface Tension Capillary Tube and Capillarity

Medium

Three liquids have the same surface tension and densities $\varrho_{1}, \varrho_{2}$,and $\varrho_{3}$ $(\varrho_{1} > \varrho_{2} > \varrho_{3})$. In three identical capillaries,the rise of liquid is the same. The corresponding angles of contact $\theta_{1}, \theta_{2}$,and $\theta_{3}$ are related as:

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A
$\theta_{1} > \theta_{2} > \theta_{3}$
B
$\theta_{1} < \theta_{2} > \theta_{3}$
C
$\theta_{1} > \theta_{2} < \theta_{3}$
D
$\theta_{1} < \theta_{2} < \theta_{3}$

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Fluid Mechanics and Surface Tension

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Capillary Tube and Capillarity

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Water rises up to a height of $4 \,cm$ in a capillary tube. The lower end of the capillary tube is at a depth of $8 \,cm$ below the water level. The mouth pressure required to blow an air bubble at the lower end of the capillary will be '$X$' $cm$ of water,where $X$ is equal to

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Water rises to a height of $10 \,cm$ in a capillary tube. In which of the following conditions will it rise to a height much greater than $10 \,cm$ in a very long capillary tube?

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If the liquid level falls in a capillary tube,then the radius of the capillary will:

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Water rises in a capillary tube of radius $r$ up to a height $h$. The mass of water in the capillary is $m$. The mass of water that will rise in a capillary tube of radius $\frac{r}{3}$ will be:

Water rises up to a height of $4 \,cm$ in a capillary tube. The lower end of the capillary tube is at a depth of $8 \,cm$ below the water level. The mouth pressure required to blow an air bubble at the lower end of the capillary will be '$X$' $cm$ of water,where $X$ is equal to

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