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19 votes
19 votes
A 0.15-mm-wide slit is illuminated by light of wavelength 462 nm. Consider a point P on a viewing screen on which the diffraction pattern of the slit is viewed; the point is at 26.9° from the central axis of the slit. What is the phase difference between the Huygens' wavelets arriving at P from the top and midpoint of the slit?

User Jchook
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1 Answer

27 votes
27 votes

Answer:


\triangle \phi=461.5rad

Step-by-step explanation:

From the question we are told that:

Silt width
w=0.15=>0.1510^(-3)

Wavelength
\lambda=462nm=462*10^(-9)

Angle
\theta=26.9

Generally the equation for Phase difference is mathematically given by


\triangle \phi=(2 \pi)/(\lambda)((wsin\theta )/(2))


\triangle \phi=(2 \pi)/(462*10^(-9))((0.1510^(-3)*sin 26.9 )/(2))


\triangle \phi=461.5rad


\triangle \phi=146.89\pi

User Abdul Qayyum
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3.0k points