[634
635]
17
635.
riTIONS.
NOTE ON THE DEMONSTRATION OF CLAIRAUT’S THEOREM.
p. 188.]
attended to; e.g.
series is
[From the Messenger of Mathematics, vol. V. (1876), pp. 166, 167.]
It seems worth while to indicate what the leading steps of the demonstration are.
The potential of the Earth’s mass upon an external or superficial point is taken
to be
T r Fo Fi Vo 0
F> - — + ~r + ^ + &c ->
where V x , V 2 , V 3 ,... are Laplace’s functions of the angular coordinates.
The surface is assumed to be a nearly spherical surface r = a (1 + u), where
u = u x + u 2 + &c., and u x , u 2 ,... are Laplace’s functions of the angular coordinates. To be
a surface of equilibrium, with an equation V+ ^&> 2 r 2 sin 2 6 = G, the latter must be
equivalent to the equation r = a{\ + w), and it follows that we have
V x = V 0 a u ly
V 2 = V 0 a?u 2 — ^co 2 a 5 (| — cos 2 6),
V 3 = V 0 a?u 3 ,
&c.,
which values are to be substituted in the expression for V.
The whole force of gravity (due to the attraction and the centrifugal force) is
taken to be g, — — (V + ^a> 2 r 2 sin 2 6), and it follows that
CLT
g = (1 + u 2 + 2u 3 + ...) - f ® 2 a — f co 2 a (£ - cos 2 6),
CL
