Calculate the energy released when 1000 small water drops each of same radius `10^(-7)m` coalesce to form one large drop. The surface tension of water is `7.0xx10^(-2)N//m`.A. `7 xx 10^(-12) J`B. `7.5 xx 10^(-12) J`C. `7.9 xx 10^(-12) J`D. `8.5 xx 10^(-12) J`

Calculate the energy released when 1000 small water drops each of same

1.	Calculate the energy released when 1000 small water drops each of same radius `10^(-7)m` coalesce to form one large drop. The surface tension of water is `7.0xx10^(-2)N//m`.A. `7 xx 10^(-12) J`B. `7.5 xx 10^(-12) J`C. `7.9 xx 10^(-12) J`D. `8.5 xx 10^(-12) J`
Answer» Correct Answer - C Let r be the radius of smaller drops and R of bigger one. Equating the initial and final volumes, we have `(4)/(3) piR^(3) = (1000) ((4)/(3) pi r^(3))` `rArr R = 10 r = (10) (10^(-7)) m rArr R = 10^(-6) m` Further, the water drops have only one free surface. Therefore, `Delta A = 4 piR^(2) - (1000) (4 pir^(2))` `= 4 pi [(10^(-6))^(2) - (10^(3)) (10^(-7))^(2)] = - 36 pi (1)^(-12) m^(2)` Here, negative sign implies that surface area is decreasing. Hence, energy released in the process, `U = S \|DeltaA\| = (7 xx 10^(-2)) (36 pi xx 10^(-12)) J` `= 7.9 xx 10^(-12) J`

Discussion

No Comment Found

Related InterviewSolutions

Pressure inside two soap bubbles are `1.01` and `1.02` atmospheres. Ratio between their volumes isA. `2:1`B. `1:2`C. `8:1`D. `1:8`
Pressure inside two soap bubble are 1.02 and 1.03 atm . Then ratio of their volumes isA. `8 :27`B. `27:8`C. `(1.02)^(3) :(1.03)^(2)`D. `(1.03)^(3):(1.02)^(2)`
If the surface tension of water is ` 7.3 xx 10^(-2)` N/m then the excess pressure inside a spherical drop of water of radius ` 1 xx 10^(-3)` m formed will beA. `14.6 N//m^(2)`B. `146 N//m^(2)`C. `1460 N//m^(2)`D. ` 14600 N//m^(2)`
A capillary of internal radius `4 mm`, is dipped in water. To how much height, will the water rise in the capillary. (`T_(water) = 70 xx 10^(-3) N//m, g = 10 m//sec^(2), rho_(water) 10^(3) kg//m^(3)`, contact angle `theta rarr 0`)
Internal pressure inside a liquid drop of radius r and surface tension T isA. `(2T)/r-P_(0)`B. `(4T)/r + P_(0)`C. `P_(0)+(2T)/r`D. `T/(4r)-P_(0)`
Let `T_(1)` be surface tension between solid and air, `T_(2)` be the surface tension between solid and liquid and T be the surface tension between liquid and air. Then in equilibrium, for a drop of liquid on a clean glass plate, the correct relation is (`theta` is angle of contact) A. ` cos theta = T/(T_(1)+T_(2))`B. ` cos theta = T /(T_(1)-T_(2))`C. ` cos theta = (T_(1)+T_(2))/T`D. ` cos theta = (t_(1) - T_(2))/T`
Surface tension of a liquid is found to be influenced byA. It increases with the increase of temperatureB. Nature of the liquid in contactC. Presence of soap that increases itD. Its variation with the concentration of the liquid
Water does not wet an oily glass becauseA. cohesive force of oil `gt ` adhesive force between oil and glassB. cohesive force of oil `lt` cohesive force of waterC. oil repels waterD. cohesive force of water `gt` adhesive force between water and oil molecules
Mercury does not wet glass, wood or iron becauseA. Cohesive force is less than adhesive forceB. Cohesive force is greater than adhesive forceC. Angle of contact is less than `90^(@)C`D. Cohesive force is equal to adhesive force
Mercury does not wet wood . It indicates that its cohesive force isA. greater than its adhesive forceB. equal to its adhesive forceC. less than its adhesive forceD. none of these

Calculate the energy released when 1000 small water drops each of same radius `10^(-7)m` coalesce to form one large drop. The surface tension of water is `7.0xx10^(-2)N//m`.A. `7 xx 10^(-12) J`B. `7.5 xx 10^(-12) J`C. `7.9 xx 10^(-12) J`D. `8.5 xx 10^(-12) J`

Discussion

No Comment Found

Related InterviewSolutions

Reply to Comment