A glass rod of diameter d1 =1.5 mm is ...

A glass rod of diameter ` d_1 =1.5 mm ` is inserted symmetrically into a glass capillary with inside diameter `d_2=2 mm` . Then the whole arrangement is vertically oriented and broght in contact with the surface of water . Surface tension and density of water are `0.075 N//m` and `10^3 kg//m^3` respectively . the height throgh which the water will rise in the capillary is `(g=10 m//s^2)`

Similar Questions

Explore conceptually related problems

A glass rod of diameter d_(1)=1.5 mm in inserted symmetrically into a glass capillary with inside diameter d_(2)=2.0 mm. Then the whole arrangement is vertically oriented and brought in contact with the surface of water. To what height will the liquid rise in the capillary? Surface tension of water =73xx10^(-3)N//m

A glass rod of diameter d_(1)=1.5 mm in inserted symmetricaly into a glas capillary with inside diameter d_(2)=2.0 mm. Then the whole arrangement is vertically oriented and bruoght in contact with the surface of water. To what height will the liquid rise in the capillary? Surface tension of water =73xx10^(-3)N//m

A glass rod of diameter d_1 = 1.5mm is inserted symmetrically into a glass capillary with inside diameter d_2 = 2.0 mm . Then the whole arrangement is vertically oriented and brought in contact with the surface of water. To what height in cm will be water rise in the capillary? (surface tension T = 75 xx 10^(-3) N/m))

A glass rod of radius 1 mm is inserted symmetrically into a glass capillary tube with inside radius 2 mm . Then the whole arrangement is brought in contact of the surface of water. Surface tension of water is 7 xx 10^(-2) N//m . To what height will the water rise in the capillary? ( theta = 0^@ )

Given that the surface tension of water is 75 dyne/cm , its density 1000kg/m^3 and angle of contact zero, the height to which water rises in a capillary tube of 1mm diameter (take g =10 m / s^2) is

A glass rod of diameter d=2mm is inserted symmetrically into a glass capillary tube of radius r=2mm . Then the whole arrangement is vertically dipped into liquid having surface tension 0.072 Nm. The height to which liquid will rise on capillary is (Take g=10(m)/(s^(2)) , "density"_("liq")=1000(kg)/(m^(3))) . Assume contact angle to be zero, capillary tube to be long enough

A glass rod of radius r_(1) is inserted symmetrically into a vertical capillary tube of radius r_(2) such that their lower ends are at the same level. The arrangement is now dipped in water. Find the height to which water will rise in to the tube. (S = surface tension of water, d= density of water).

Similar Questions

Recommended Questions