Two capillary tubes of same diameter are put vertically one each in two liquids whose relative densities are 0.8 and 0.6 and surface tensions are 60 dyne/cm and 50 dyne/cm respectively. Ratio of heights of liquids in the two tubes `(h_(1))/(h_(2))` is

When two capillary tubes of different diameters are dipped vertically, the rise of the liquids is

We have two different liquids A and B whose relative densities are 0.75 and 1.0 , respectively. If we dip solid objects P and Q having relative densities 0.6 and 0.9 in these liquids, then

Two capillary tubes of radii 0.2 cm and 0.4 cm are dipped in the same liquid.The ratio of heights through which liquid will rise in the tube is

A capillary tube of radius 0.6 mm is dipped vertically in a liquid of surface tension 0.04 Nm^(-1) and relative density 0.8 . Calculate the height of capillary rise if the angle of contact is 15^(@) .

A tube of 1 mm bore is dipped into a vessel containing a liquid of density 0.8 g//cm^(3) , surface tension 30 "dyne"//"cm" and angle of contact zero. Calcualte the length which the liquid will occupy in the tube when the tube is held (a) vertical (b) inclined to the vertical at an angle of 30^(@) .

Two immisible liquids are pured in a U-tube having densities rho_(1) = 1.0 xx 10^(2) kg//m^(2) and rho_(2)3.0 xx 10^(2) kg//m^(3) . Find the ratio of heights (of the liquids above their interface) (n_(1))/(h_(2))

A lead sphere of 1.0 mm diameter and relative density 11.20 attains a terminal velocity of 0.7 cm s^(-1) in a liquid of relative density 1.26 . Determine the coefficient of dynamic viscosity of the liquid.

A U- tube is made up of capillaries of bores 1 mm and 2 mm respectively. The tube is held vertically and partically filled with a liquid of surface tension 49 "dyne"//"cm" and zero contact angle. Calculate the density of the liquid of the difference in the levels of the meniscus is 1.25 cm .

A capillary tube with inner cross-section in the form of a square of side a is dipped vertically in a liquid of density rho and surface tension rho which wet the surface of capillary tube with angle of contact theta . The approximate height to which liquid will be raised in the tube is : (Neglect the effect of surface tension at the corners of capillary tube)

A container is partially filled with a liquid of density rho_2 A capillary tube of radius r is vertically inserted in this liquid. Now another liquid of density rho_1(rho_1ltrho_2) is slowly poured in the container to a height h as shown. There is only denser liquid in the capillary tube. The rise of denser liquid in the capillary tube is also h . Assuming zero contact angle, the surface tension of heavier liquid is