Chapter 35 Serway & Jewett 6 th Ed.

Chapter 35 Serway & Jewett 6th Ed.

How to View Light As a Ray As aWave As a Particle

The limit of geometric (ray) optics, valid for lenses, mirrors, etc. What happens to a plane wave passing through an aperture? Point Source Generates spherical Waves

{ } Eo Bo cos (kx - t) y E x B Surface of constant phase For fixed t, when kx = constant z

Index of Refraction 1 n1 = 2 n2

When material absorbs light at a particular frequency,the index of refraction can become smaller than 1!

Reflection and Refraction

Oct. 18, 2004

Fundamental Rules forReflectionandRefractionin the limit of Ray Optics • Huygens’s Principle • Fermat’s Principle • Electromagnetic Wave Boundary Conditions

Huygens’s Principle

Huygens’s Principle k All points on a wave front act as new sources for the production of spherical secondary waves Fig 35-17a, p.1108

Incoming ray Outgoing ray Reflection According to Huygens • Side-Side-Side • AA’C   ADC 1 = 1’

Refraction

Fig 35-19, p.1109

Show via Huygens’s Principle Snell’s Law v1 = c in medium n1=1 and v2 = c/n2 in medium n2 > 1.

Fermat’s Principle and Reflection A light ray traveling from one fixed point to another will follow a path such that the time required is an extreme point – either a maximum or a minimum.

Fig 35-31, p.1115

n1 sin 1 = n2 sin 2 Snell’s Law Rules for Reflection and Refraction

L L P S Optical Path Length (OPL) n = 1 n > 1 For n = 1.5, OPL is 50% larger than L When n constant, OPL = n geometric length.

Fermat’s Principle, Revisited A ray of light in going from point S to point Pwill travel an optical path (OPL) that minimizes the OPL. That is, it is stationary with respect to variations in the OPL.

ki = (ki,x,ki,y) kr = (kr,x,kr,y) kt = (kt,x,kt,y)

Fig 35-22, p.1110

Fig 35-25, p.1111

Fig 35-24, p.1110

Fig 35-23, p.1110

Total Internal Reflection

p.1114

Fig 35-30, p.1114

Fig 35-29, p.1114

Chapter 35 Serway & Jewett 6 th Ed.