Answer:
The possible thickness of the soap bubble = [tex]1.034\times 10^{-7}\ m.[/tex]
Explanation:
Given:
Let the thickness of the soap bubble be [tex]t[/tex].
It is given that the soap bubble appears very bright, it means, there is a constructive interference takes place.
For the constructive interference of light through a thin film ( soap bubble), the condition of constructive interference is given as:
[tex]2\mu t=\left ( m+\dfrac 12 \right )\lambda.[/tex]
where [tex]m[/tex] is the order of constructive interference.
Since the soap bubble is appearing very bright, the order should be 0, as [tex]0^{th}[/tex] order interference has maximum intensity.
Thus,
[tex]2\mu t=\left (0+\dfrac 12\right )\lambda\\t=\dfrac{\lambda}{4\mu}\\\ \ = \dfrac{550\times 10^{-9}}{4\times 1.33}\\\ \ = 1.034\times 10^{-7}\ m.[/tex]
It is the possible thickness of the soap bubble.
