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Propagation of waves. Friday October 18, 2002. Propagation of waves in 3D. Imagine a disturbane that results in waves propagating equally in all directions E.g. sound wave source in air or water, light source in a dielectric medium etc..
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Propagation of waves Friday October 18, 2002
Propagation of waves in 3D • Imagine a disturbane that results in waves propagating equally in all directions • E.g. sound wave source in air or water, light source in a dielectric medium etc.. • The generalization of the wave equation to 3-dimensions is straight forward if the medium is homogeneous • Let = amplitude of disturbance (could be amplitude of E-field also)
Propagation of waves in 3D depends on x, y and z such that it satisfies the wave equation or, where in cartesian co-ordinates,
1. Special Case: Plane Waves along x • Suppose (x, y, z, t)=(x, t) (depends only on x) • Then = f(kx-ωt) + g(kx+ωt) • Then for a given position xo, has the same value for all y, z at any time to. • i.e. the disturbance has the same value in the y-z plane that intersects the x-axis at xo. • This is a surface of constant phase
Plane waves along x Planes perpendicular to the x-axis are wave fronts – by definition
z O y x 2. Plane waves along an arbitrary direction (n) of propagation • Now will be constant in plane perpendicular to n – if wave is plane • For all points P’ in plane P P’ d
2. Plane waves along an arbitrary direction (n) of propagation For all points P’ in plane or, for the disturbance at P
z O y x 2. Plane waves along an arbitrary direction (n) of propagation If wave is plane, must be the same everywhere in plane to n This plane is defined by P P’ d is equation of a plane to n, a distance d from the origin
2. Plane waves along an arbitrary direction (n) of propagation is the equation of a plane wave propagating in k-direction
3. Spherical Waves • Assume has spherical symmetry about origin (where source is located) • In spherical polar co-ordinates z θ r y φ x
3. Spherical Waves • Given spherical symmetry, depends only on r, not φ or θ • Consequently, the wave equation can be written,
3. Spherical Waves Now note that,
3. Spherical Waves But, is just the wave equation, whose solution is, i.e. amplitude decreases as 1/ r !! Wave fronts are spheres
4. Cylindrical Waves (e.g. line source) The corresponding expression is, for a cylindrical wave traveling along positive
Electromagnetic waves • Consider propagation in a homogeneous medium (no absorption) characterized by a dielectric constant o = permittivity of free space
Electromagnetic waves Maxwell’s equations are, in a region of no free charges, Gauss’ law – electric field from a charge distribution No magnetic monopoles Electromagnetic induction (time varying magnetic field producing an electric field) Magnetic fields being induced By currents and a time-varying electric fields µo = permeability of free space (medium is diamagnetic)
Electromagnetic waves For the electric field E, or, i.e. wave equation with v2 = 1/µo
Electromagnetic waves Similarly for the magnetic field i.e. wave equation with v2 = 1/µo In free space, = o = o ( = 1) c = 3.0 X 108 m/s
Electromagnetic waves In a dielectric medium, = n2 and = o = n2 o
Electromagnetic waves: Phase relations The solutions to the wave equations, can be plane waves,