428
A MEMOIR ON CUBIC SURFACES.
[412
and thence the equation is found to be
1[y 2 — (x — zf\
+ 16w 3 [(2« — bz) y 2 — 2(x — 2z) (x — zf\
4- 8w 2 [y 4 + (a? — xz + Qz 2 ) if — 2x 2 (x — zf]
+ 4w [fix 4- 3z) y 4 — 2x 2 (x 4- z) y 2 ]
+ y i (y 2 ~ x *) = 0,
where the section by the plane w = 0 (reciprocal of binode) is y i (y 2 — x 2 ) = 0, viz. this
is the line w = 0, y = 0 (reciprocal of the edge) four times, and the lines w = 0, y 2 - x 2 = 0
(reciprocals of the biplanar rays).
The section by the plane z = 0 is found to be (y 2 — x 2 )(y 2 +4xw + 4w 2 ) 2 = 0, viz. this
is the two lines z = 0, y 2 — x 2 = 0 (reciprocals of the nodal rays), and the conic 2 = 0,
y 2 + 4xw + 4nv 2 = 0 (reciprocal of the nodal cone WX + Y 2 — X 2 = 0) twice.
142. Nodal curve. The equation shows that the line y= 0, x—z = 0 (reciprocal of
the line W = 0, X + Z = 0) is a nodal line on the surface.
It also shows that the line y = 0, w = 0 (reciprocal of the edge) is a tacnodal line
(= 2 nodal lines) on the surface ; in fact attending only to the lowest terms in y, w,
we have
that is,
— x 2 [16 (x — z) 2 w 2 + 8 (x + z) wy 2 + if] = 0,
, , v , Va? +
4 (x — z)w+ ~ _ y 2 = 0,
WX -f VZ
two values, w = Ay 2 , w = By 2 , which indicates a tacnodal line.
The nodal curve is thus made up of the line y = 0, x — 2=0 once, and the line
y = 0, tu — 0 twice; b' = 3.
143. Cuspidal curve. The equations
j 12w 2 , 8w 2 + 4>wx, 4<w 2 + 4uvx + 4>tvz + y 2 jj = 0
'! 8w 2 + 4wx, 4>iu 2 4- 4wx + 4wz + y 2 , 12wz
give
(4w -f 2x) 2 — 3 (4w 2 + 4>wx + 4wz + y 2 ) = 0,
— 36w 2 2 + (2tv + x) (4w 2 + 4<ivx + 4wz + y 2 ) = 0,
or, as these are more simply written,
4nv 2 + 4 wx — 12 wz + 4x 2 — 3 y 2 = 0,
8w 3 + 12w 2 x — 28w 2 z + w (4a; 2 + 4xz + 2y 2 ) + xy 2 — 0,
so that the cuspidal curve is a complete intersection 2x3; c' = 6.
