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ON THE ATTRACTION OF AN ELLIPSOID.
[7 5
Part II.—On a Formula for the Transformation of Certain Multiple Integrals.
Consider the integral
where the number of variables x, y,... is equal to n, and F (x, y, ...) is a homogeneous
function of the order fx.
Suppose that x, y, ... are connected by a homogeneous equation yfr (x, y, ...) = 0
containing a variable parameter m (so that « is a homogeneous function of the order
zero in the variables x, y, ...). Then, writing
F = X" + y° + ... , X — TOL, y = r/3,...
the quantities a, /3, ... are connected by the equations
a 2 + /3 2 + ... = 1, yjr(a, 0, ...) = 0,
and we may therefore consider them as functions of co and of (n — 2) independent
variables d, &c.; whence
dxdy ... = r w_1 V dr dcodd ... ,
where
V = a , ß , ...
da df3
dw ’ da> ’
da. dß
dd ’ Td’
F{x, y, ...) = r*F(a, ß...),
Also
and therefore
r n+n-1 F 7 (a, /3, ... ) V dr dw dd ... ,
or, integrating with respect to r,
which, taken between the proper limits, is a function of a, /3,..., equal /(a, /3, ...)
suppose; this gives
in which I shall assume that the limits of co are constant. If, in order to get rid
of the condition a 2 + /3 2 ... = l, we assume
a
p 2 =p 2 + q 2 + ...
