How does light reflection work on smooth surfaces?

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SUMMARY

The discussion focuses on the principles of light reflection on smooth surfaces, specifically addressing how the angle of incidence equals the angle of reflection. The mathematical representation involves the phase of incident and reflected plane waves, expressed as exp(ik.r) and exp(ik'.r) respectively. The boundary conditions necessitate that k'.r equals k.r, leading to the conclusion that the cosine of the angles of incidence and reflection are equal, confirming the law of reflection.

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ValenceE
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Hello to all,

while I’m waiting for my reservation of Richard Feynman’s QED book to be available at the local library, here’s a question about light reflection …

Could someone please explain the process by which an incident ray of light is reflected in exactly the same angle after its interaction with a smooth reflective surface ?


Regards,


VE
 
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The phase of the incident plane wave is given by exp(ik.r).
The phase of the reflected plane wave is given by exp(ik'.r).
In order for the boundary conditions at the interface to hold on the entire surface, k'.r must equal k.r, where r is in the plane of the surface.
The vector dot product k.r=kr\cos\theta, where \theta is the angle between k and r. k and the reflected wave number k' are equal in magnitude, so cos\theta=cos\theta'.
[Note: this angle \theta is (90 degrees - the "incident angle").]
 

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