350]
ON THE CLASSIFICATION OF CUBIC CURVES.
381
81. The equation of the harmonic conic, making the foregoing transformation in
/X — V v —
the equation 1
X y
— + ——- = 0, becomes
z
that is
which is
or, what is the same thing,
X — v + /id X — v — /xi /xi _ Q
x + yi x — yi z ’
oft -f- xft
— 2 (A — v) yi + 2/xi x — /xi ——= 0,
y (X 2 + y 2 ) - 25 {fix -(x-v)y}= 0,
or developing,
/x (x 2 + y 2 — 2zx) + 2 (X — v) yz = 0,
which, putting for z its value = 1 — x, is
¡x (Sx 2 + y 2 — 2«) + 2 (A — v) y (1 — x) = 0,
3/xx 2 —2 — v) xy + fxy 2 — 2fix + 2 (A — v) y — 0,
either of which is the equation of the harmonic conic corresponding to the satellite
line (X — v) x + fxy + v = 0, or, since the direction is alone material, to the satellite line
— v) x + fxy = 0. The second form shows that the conic is
an ellipse for S/x 2 > (X — v) 2 ,
a parabola „ S/x 2 = (X — v) 2 ,
a hyperbola „ S/x 2 < (X — v) 2 .
82. The first form shows that the conic passes through the four points which
are the intersection of the ellipse Sx 2 + y 2 — 2x = 0, (or, as the equation may also be
written, 9 (x — ^) 2 + Sy 2 = 1), with the pair of lines (x— l)y = 0: this is right, for the
points in question are the three points (x=0, y = 0), (x = 1, y = i), (x=l, y = — i),
which are the vertices of the triangle formed by the asymptotes (x 2 + y 2 )(x — 1) = 0;
and the point x = f, y = 0, which is the harmonic point.
83. Putting for shortness \ — v = k, so that the equation of the satellite line is
kx + /xy + v = 0, and that of the corresponding harmonic conic is
/x (Sx 2 + y 2 — 2x) + 2/cy (1 — x) = 0,
the coordinates of the centre are found from the formulae
l (oc + yi) : | (x - yi) : z = (k + /ii) 2 : ( K -/xi) 2 : -4>/x 2 ,
whence, since x+z = 1, we have for the coordinates of the centre
/x 2 — A
x =
— 2 /x/c
and it is easy to verify that these belong to a point on the twofold centre conic
Sx 2 — — y 2 + 1 = 0.
