Question

Twenty-seven droplets of water, each of radius 0.1 mm coalesce into a single drop. Find the change in surface energy. Surface tension of water is 0.072 N/m.

Answer 1

Given:

r = 0.1 mm = 0.1 × 10⁻³ m,

T = 0.072 N/m

To find:

The change in surface energy.

Solution:

Let R be the radius of the single drop formed due to the coalescence of 27 droplets of mercury. Volume of  27 droplets = volume of the single drop as the volume of the liquid remains constant.

∴ `27 xx 4/3pi"r"^3 = 4/3pi"R"^3` 

∴ `27"r"^3 = "R"^3`

∴ 3r = R

Surface area of 27 droplets = 27 × 4πr² Surface area of single drop = 4πR² 

∴ Decrease in surface area = `27 xx 4pi"r"^2 - 4pi"R"^2`

= `4pi (27"r"^2 - "R"^2)`

= `4pi[27"r"^2 - ("3r")^2]`

= `4pi xx 18"r"^2`

∴ The energy released = surface tension × decrease in surface area

= T × 4π × 18r²

= 0.072 × 4 × 3.142 × 18 × (1 × 10⁻⁴)²

= 1.628 × 10⁻⁷ J.

Answer 2

Given:

r = 0.1 mm = 10⁻⁴ m, 

n = 27,

T = 0.072 N/m

To find:

Change in surface energy (W)

Formula:

W = TdA

Calculation:

Volume of a single drop = `4/3piR^3` and

The volume of a single droplet = `4/3pir^3`

∴ We have, `4/3piR^3 = n xx 4/3pir^3` or R³ = nr³ 

∴ R =  `root3 n  r = root3 27 xx 10^-4 = 3 xx 10^-4`m² 

From formula,

W = T (n × 4πr² − 4πR²) 

= 4πT(nr² - R²)

= 4 × 3.142 × 0.072 × [27 × (10⁻⁴)² − (3 × 10⁻⁴)²]

= 3.142 × 0.288 × 18 × 10⁻⁸ 

= 1.629 × 10⁻⁷ J 

The change in the surface energy is 1.629 × 10⁻⁷ J.