Answer:
Δλ = 13.16 nm
Step-by-step explanation:
Given:
- Diffraction grating d = 1 / 800 = 0.00125 mm
- Focal length of the lens f = 25.0 mm
- The difference of bright lines Δ x = 30 um
- wavelength of light λ = 600 nm
Find:
what is the wavelength difference Δλ between the two?
Solution:
- The separation between the bright lines is proportional to sin(Q) as follows:
x = f*sin(Q)
- Since the bright lines are very close we can use small angle approximations:
sin(Q) ≈ Q
- The relation above becomes:
x = f*Q
- The differential form can be written as:
Δx = f*ΔQ
ΔQ = Δx/f
- Compute ΔQ: ΔQ = 30*10^-6 / 25*10^-3 = 0.0012 rads
- We know from the Young's experiment that the primary maxima occurs at:
λ = d*sin(Q) / m
- Given the lights in first order of the spectrum, hence, m = 1:
λ = d*sin(Q)
- Differentiate the above expression with respect to angle Q
Δλ = d*cos(Q)*ΔQ
- replace cos(Q) = sqrt ( 1 - sin^2(Q)) and sin(Q) = λ / d:
Δλ = d*sqrt ( 1 - ( λ / d)^2)*ΔQ
- Plug in the values:
Δλ = (0.00125*10^-3)*sqrt ( 1 - ( 600*10^-9 / 0.00125*10^-3)^2)*0.012
Δλ = (0.00125*10^-3)*0.8773*0.012
Δλ = 13.16 nm