Page:A Treatise on Electricity and Magnetism - Volume 1.djvu/276

and the potential at the point ${\displaystyle (\rho ,\theta )}$ is

${\displaystyle {\begin{array}{l}\phi =E\log \left(e^{-2\rho _{0}}-2e^{-\rho _{0}}e^{\rho }\cos \theta +e^{2\rho }\right)\\\qquad -E\log \left(e^{2\rho _{0}}-2e^{-\rho _{0}}e^{\rho }\cos \theta +e^{2\rho }\right)+2E\rho _{0}\end{array}}}$

(11)

This is the potential at the point ${\displaystyle (\rho ,\theta )}$ due to a charge ${\displaystyle E}$, placed at the point ${\displaystyle (\rho _{0},0)}$, with the condition that when ${\displaystyle \rho =0,\ \phi =0}$0.

In this case ${\displaystyle \rho }$ and ${\displaystyle \theta }$ are the conjugate functions in equations (5): ${\displaystyle \rho }$ is the logarithm of the ratio of the radius vector of a point to the radius of the circle, and ${\displaystyle \theta }$ is an angle.

The centre is the only singular point in this system of coordinates, and the line-integral of ${\displaystyle \int {\tfrac {d\theta }{ds}}ds}$ round a closed curve is zero or ${\displaystyle 2\pi }$, according as the closed curve excludes or includes the centre.

190.] Now let ${\displaystyle \alpha }$ and ${\displaystyle \beta }$ be any conjugate functions of ${\displaystyle x}$ and ${\displaystyle y}$, such that the curves (${\displaystyle \alpha }$) are equipotential curves, and the curves (${\displaystyle \beta }$) are lines of force due to a system consisting of a charge of half a unit at the origin, and an electrified system disposed in any manner at a certain distance from the origin.

Let us suppose that the curve for which the potential is a is a closed curve, such that no part of the electrified system except the half-unit at the origin lies within this curve.

Then all the curves (${\displaystyle \alpha }$) between this curve and the origin will be closed curves surrounding the origin, and all the curves (${\displaystyle \beta }$) will meet in the origin, and will cut the curves (${\displaystyle \alpha }$) orthogonally.

The coordinates of any point within the curve (${\displaystyle \alpha _{0}}$) will be determined by the values of ${\displaystyle \alpha }$ and ${\displaystyle \beta }$ at that point, and if the point travels round one of the curves ${\displaystyle \alpha }$ in the positive direction, the value of ${\displaystyle \beta }$ will increase by ${\displaystyle 2\pi }$ for each complete circuit.

If we now suppose the curve (${\displaystyle \alpha _{0}}$) to be the section of the inner surface of a hollow cylinder of any form maintained at potential zero under the influence of a charge of linear density ${\displaystyle E}$ on a line of which the origin is the projection, then we may leave the external electrified system out of consideration, and we have for the potential at any point (${\displaystyle \alpha }$) within the curve

${\displaystyle \phi =2E\left(\alpha -\alpha _{0}\right)}$

(12)

and for the quantity of electricity on any part of the curve ${\displaystyle \alpha _{0}}$ between the points corresponding to ${\displaystyle \beta _{1}}$ and ${\displaystyle \beta _{2}}$,

${\displaystyle Q=2E\left(\beta _{1}-\beta _{2}\right)}$

(13)

1. ↑ See Crelle's Journal, 1861.