Answer:
The minimum thickness of the soap bubble for destructive interference to occur is 225.56 nm.
Explanation:
Given;
wavelength of light, λ = 600 nm
The minimum thickness of the soap bubble for destructive interference to occur is given by;
[tex]t = \frac{\lambda/n}{2}\\\\t = \frac{\lambda}{2n}[/tex]
where;
n is refractive index of soap film = 1.33
[tex]t = \frac{\lambda}{2n} \\\\t = \frac{600*10^{-9}}{2(1.33)}\\\\t = 2.2556 *10^{-7} \ m\\\\t = 225.56 *10^{-9} \ m\\\\t = 225.56 \ nm[/tex]
Therefore, the minimum thickness of the soap bubble for destructive interference to occur is 225.56 nm.
