Question:easy

If the surface tension at the soap bubble-air interface is 0.09 N/m; then what is the internal pressure in a soap bubble of 24 mm diameter?

Show Hint

Remember the "Double Surface" rule for soap bubbles.

Droplet/Jet: Use $4\sigma/d$.

Soap Bubble: Use $8\sigma/d$.
Always double the pressure for a bubble because it has two sides of film!
Updated On: Jul 1, 2026
  • $7.5 \frac{N}{m^2}$
  • $15 \frac{N}{m^2}$
  • $20 \frac{N}{m^2}$
  • $30 \frac{N}{m^2}$
Show Solution

The Correct Option is D

Solution and Explanation

1. Given Parameters:

• Surface Tension ($\sigma$) = 0.09 N/m

• Diameter ($d$) = 24 mm = $0.024$ m

• Radius ($r$) = 12 mm = $0.012$ m

2. Formula for Soap Bubble: The gauge pressure ($P$) inside a soap bubble is given by: $$P = \frac{8\sigma}{d} \quad \text{or} \quad P = \frac{4\sigma}{r}$$

3. Calculation: Using the diameter formula: $$P = \frac{8 \times 0.09}{0.024}$$ $$P = \frac{0.72}{0.024}$$ $$P = 30 \text{ N/m}^2$$
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