ascribe an origin different from that assigned by Dr. Young. In
order to obtain a more distinct view of these colours, Sir David
Brewster employed, instead of the substances used by Dr. Young,
the white of an egg, beat up into froth, and pressed into a thin film
between plates of glass. From observations of the colours exhibited
by plates so prepared, and also by the edge of a thin film of nacrite
in contact with copaivi balsam, the author deduces the conclusion,
that all these phenomena, as well as those often seen in certain
specimens of mica through which titanium is disseminated, and also
in sulphate of lime, are cases of diffraction, where the 1light is ob-
structed by the edges of very thin transparent plates placed in a
medium of different refractive power. If the plate were opake,
the fringes produced would be of the same kind as those often
noticed, and which are explained on the principle of interference;
but, owing to the transparency of the plate, fringes are produced
within its shadow; and, owing to the thinness of the plate, the
light transmitted through it is retarded, and, interfering with the
partial waves which pass through the plate, and with those which
pass beyond the diffracting edge with undiminished velocity, modify
the usual system of fringes in the manner described by the author
in the present paper.
"Of such Ellipsoids, consisting of homogeneous Matter, as are capable of having the Resultant of the Attraction of the Mass upon a Particle in the Surface, and a Centrifugal Force caused by re- volving about one of the Axes, made perpendicular to the Surface." By James Ivory, K.H., M.A., F.R.S. L. and Ed., Inst. Reg. So Paris, Corresp. et Reg. Sc. Gotting. Corresp.
Lagrange, who has considered the problem of the attractions of homogeneous ellipsoids in all its generality, and has given the true equations from which its solution must be derived, inferred from them that a homogeneous planet cannot be in equilibrium unless it has a figure of revolution. But M. Jacobi has proved that an equi- librium is possible in some ellipsoids of which the three axes are un- equal and have a certain relation to one another. His transcend- ental equations, however, although adapted to numerical computa- tion on particular suppositions, still leave the most interesting points of the problem unexplored.
The author of the present paper points out the following property as being characteristic of all spheroids with which an equilibrium is possible on the supposition of a centrifugal force. From any point in the surface of the ellipsoid draw a perpendicular to the least axis, and likewise a line at right angles to the surface: if the plane pass- ing through these two lines contain the resultant of the attractions of all the particles of the spheroid upon the point in the surface, the equilibrium will be possible, otherwise it will not. For the re- sultant of the centrifugal force and the attraction of the mass must be a force perpendicular to the surface of the ellipsoid, which re- quires that the directions of the three forces shall be contained in
