Page:Scientific Memoirs, Vol. 2 (1841).djvu/217

${\displaystyle {\begin{aligned}&Y=-{\frac {1}{\sin u}}\left({\frac {d\,P'}{d\,\lambda }}+{\frac {d\,P''}{d\,\lambda }}+{\frac {d\,P'''}{d\,\lambda }}+{},{\&}{\mbox{c.}}\right)\\&Z=2P'+3P''+4P'''+{},{\&}{\mbox{c.}}\end{aligned}}}$

20.

If we combine, then, with these propositions, the known theorem, that every function of ${\displaystyle \lambda }$ and ${\displaystyle u}$, which, for all values of ${\displaystyle \lambda }$, from 0 to 360°, and of ${\displaystyle u}$, from to 180°, has a determinate finite value, may be developed into a series of the form

${\displaystyle P^{0}+P'+P''+P'''+{},{\&}{\mbox{c.}}}$

the general member of which, ${\displaystyle P^{n,}}$ satisfies the above partial differential equation,—that such a developement is only possible in one determinate manner,—and that this series always converges,—we obtain the following remarkable propositions.

I. The knowledge of the value of ${\displaystyle V}$ at all points of the earth's surface is sufficient to enable us to deduce the general expression of ${\displaystyle V}$ for all external space, and thus to determine the forces ${\displaystyle X}$, ${\displaystyle Y}$, ${\displaystyle Z}$, not only on the surface of the earth, but also for all external space.

It is clearly only necessary for this purpose to develope ${\displaystyle {\frac {V}{R}}}$into a series according to the above-mentioned theorem.

In the sequel, therefore, unless it is expressly stated otherwise, the symbol ${\displaystyle V}$ is always to be taken as limited to the surface of the earth, or as that function of ${\displaystyle \lambda }$, and ${\displaystyle u}$ which follows from the general expression, when ${\displaystyle r}$ is made ${\displaystyle =R}$: thus

${\displaystyle V=R(P'+P''+P'''+{},{\&}{\mbox{c.}})}$

II. The knowledge of the value of ${\displaystyle X}$ at all points of the earth's surface is sufficient to obtain all that has been referred to in Prop. I. In fact, according to Art. 15, the integral ${\displaystyle \int _{0}^{u}X\,d\,u={\frac {V^{0}-V}{R}}}$ signifying the value of ${\displaystyle V}$ at the north pole, and the developement of ${\displaystyle \int _{0}^{u}X\,d\,u}$ into a series of the form referred to must necessarily be identical with

${\displaystyle V^{0}-P'-P''-P''',{\&}{\mbox{c.}}}$

III. In like manner, and under the considerations in Art. 16, it is clear that the knowledge of ${\displaystyle Y}$ on the whole earth, combined with the knowledge of ${\displaystyle X}$ at all points of a line run-