## Classical theory of electricity and magnetism: a course of lectures |

### From inside the book

Results 1-3 of 60

Page 27

The

These functions are known as associated Legendre polynomials. There is

another constraint on / and m, namely / > bit I, otherwise the functions P,m vanish

...

The

**solutions**of (7) thus involve two integers / and m and are written PJ* (x).These functions are known as associated Legendre polynomials. There is

another constraint on / and m, namely / > bit I, otherwise the functions P,m vanish

...

Page 37

a course of lectures A. K. Raychaudhuri. to guess a

by some trick and then argue that because of the uniqueness of the

a course of lectures A. K. Raychaudhuri. to guess a

**solution**or obtain a**solution**by some trick and then argue that because of the uniqueness of the

**solution**, our**solution**is the actual**solution**of the problem. We give below an enunciation of ...Page 171

V Obviously in an exactly similar manner we can obtain from (8) A(r,o4jj(r'.rą^-)F7

^7Tdu (19) Equations (18) and (19) are the desired

V Obviously in an exactly similar manner we can obtain from (8) A(r,o4jj(r'.rą^-)F7

^7Tdu (19) Equations (18) and (19) are the desired

**solutions**in integral form. The**solutions**involve an alternative choice of sign before I r - r I /c and hence there ...### What people are saying - Write a review

We haven't found any reviews in the usual places.

### Contents

The empirical basis of electrostatics | 1 |

Direct calculation of fields | 7 |

dipoles9 The Dirac 5function13 | 13 |

Copyright | |

23 other sections not shown

### Other editions - View all

### Common terms and phrases

acceleration angle angular axis boundary conditions calculate called centre charge density charge distribution charged particle coefficient coil components conducting conductor consider coordinates dielectric constant differential dipole direction distance divergence electric and magnetic electric field electromagnetic field electromotive force electron electrostatic energy flux equation 16 expression field due field point finite fluid formula Fourier frame frequency function given gives Hence incident infinite interaction isotropic Laplace's equation linear Lorentz transformation magnetic field magnitude Maxwell's equations medium molecule momentum motion number density obtain orthogonal oscillations permanent magnets perpendicular photon plane plasma point charge polarization potential due Poynting vector radiation field radiation reaction radius refractive index region relation result satisfied scalar shows sin2 solution special theory sphere at infinity spherical surface integral symmetry tensor term theorem theory of relativity transverse uniform vanishes vector potential velocity volume wave length write zero