So it is destructive interference, but you need to us the formula 2nd=m*lambda. (d is the layer thickness and n is the refractive index.)
You see the soap bubble when light waves, reflected from it, reach your eyes. The light wave is reflected from the wall of the bubble, but partly from the front surface of the wall and partly from the back surface. The reflected waves interfere, and the resultant wave is either stronger (constructive interference) or weaker (destructive interference) than the original one. The intensity of the resultant wave depends on the phase difference between the constituent waves. The phase of the wave changes by Δφ=(2π/λ) n d when it travels a distance d in a medium of refractive index n.
The wave reflected from the back surface of the wall travels through the wall twice, so its phase changes by (4π/λ) n d. But the phase can change upon reflection, too. If the wave reflects from an optically denser medium, (with higher reflective index than the one of he medium the wave arrived from) the phase changes by pi.
The soap bubble has higher refractive index than air.
So the part of the incident wave that is reflected from the front surface of the wall changes its phase by pi. The other part of the wave enters into the soap layer, traverses through it, and reflects from the back surface. No phase change at that surface, as the wave reflects from a lower refractive index material. After reflection, the wave travels through the layer back and joins to the other part.
So the phase of the first wave changes by pi, the phase of the other one changes by 4π/λ nd and the phase difference between them is Δφ=4π/λ nd-π.
Destructive interference means that the phase difference of odd number of pi. (4π/λ)nd-π=(2m-1)π, that is 4/λ nd=2m, 2nd=mλ.
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