342
ON A CASE OF THE INVOLUTION OF CUBIC CURVES.
[349
57. If we take for (a, b, c) the coordinates of the point of intersection of the
line \x + /xy + vz = 0 with any one of the lines a? = 0, y = 0, z = 0, x + y + z = 0, then in
each case the cubic breaks up into the same line and a conic, viz. we have the conics
- _ £ _ 2 JT ~ _ o
y Z X + y + Z ’
A v 2 (A — v) _
2 x x+y+z ’
+ _ ^ _ 2 (> z29 - o
x y x+y+z ’
ix — v v — A A — it
+ +^-U = 0;
xyz
and it is to be noticed that in each case the critic centres all of them lie on the
conic. In fact, since the point (0, v, — fx) is an arbitrary point on the line x = 0, a
line \x + /xy + vz = 0 passing through the point in question is an absolutely arbitrary
line, and the corresponding critic centres therefore do not lie on the line x = 0; that
is, they lie on the conic
v _ P _ 2 0-/*) = q .
y z x+y+z ’
and it may also be remarked that the elimination of A, 6, from the system
6 + \ : 6 + fx : 6 + v : 0 = - : 2 ,
x y z x+y+z
or, what is the same thing, the elimination of 6 from the system
11 9
0 + fx : 0 + v : 0 = — ,
y z x+y+z
gives the last-mentioned equation, unencumbered by the factor x — 0.
We have thus four conics, each of them passing through the three critic centres
which correspond to the line \x + /xy + vz = 0; as to the signification of the first three
of these conics, I remark as follows.
58. The ‘ harmoconic ’ of a point A as to the line T in respect of the conic ®,
may be defined as follows; viz. considering the pencil of lines through A, the locus
of the fourth harmonic of the point in which a line of the pencil meets T, in
regard to the two points in which the same line meets the conic ©, is a conic
which is the harmoconic in question. (In particular, if the line T pass through the
point A the harmoconic breaks up into the line T and into the polar of A.) The
conic © may of course be a pair of lines.
