Find Wavelength of Light Wave for Optimal Constructive Interference

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Addez123
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Homework Statement
A wave pass through a 3 layers, at the end they create fully constructive interference, find the wavelength.
Relevant Equations
n1 = 1.5
n2 = 1.29
n3 = 1.42
L = 380 nm

λn = λ/n
1571693490443.png

The green ray is moved upwards for clarity, they are all on same x-axis with no y component.

there's a phaseshift at both reflections of the green light because n1 and n3 are > n2.
This results in a complete wavelength phaseshift, aka no impact on the wave.

That means that only the extra travel length has an effect on the phaseshift.
2L = λn
λn = λ/n2 gives us
λ = 2L*n2 = 2 * 380 * 1.29 = 980.4 nm

The correct answer is 490 nm.

What am I doing wrong?
 

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Addez123 said:
That means that only the extra travel length has an effect on the phaseshift.
2L = λn
Why is it true that 2L = λn?

On edit: What counts is the path length difference between the rays. Also, there is only one reflection of the green ray at the n1-n2 interface.
 
Last edited:
Addez123 said:
λ = 2L*n2 = 2 * 380 * 1.29 = 980.4 nm

The correct answer is 490 nm.

What am I doing wrong?
There is constructive interference when the pathlength -difference is integer times the wavelength. 980 nm is infrared light. Find a visible wavelength.
 
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That was the correct answer, they were looking for visible light.
The equation should've been:
2L = mλ/n
Where m = 1,2,3..
Then the equation turns to λ = 980/m => 490nm