A SUPPLEMENTARY MEMOIR ON CAUSTICS.
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or writing (x, y) in place of (X, F), that is taking now (x, y) as the current
coordinates of a point in the tangent, the equation of the tangent is
x cos 26 — y sin 20 — 2 cos 0 + m = 0;
whence observing that this equation may be expressed as a rational equation of the
fourth order in terms of the parameter tan \0 (or cos 0 + V - i sin 6), it appears that
the class of the secondary caustic is = 4.
8. The secondary caustic may be considered as the envelope of the tangent, and
the equation be obtained in this manner. Comparing with the general equation
we have
and thence
giving
if for a moment
A cos 20 + D sin 20 + G cos 0 + D sin 0 + E = 0,
A = x,
B = -y,
c =- 2,
I)= 0,
E = m,
S = 4 {3 (x 2 + y 2 ) + m 2 — 3},
T = 4 {18m {oc? + y 2 ) — 27x — 2m 3 + 9m},
£ 3 -T 2 = 16F,
V= 4 {3 (x 2 + y 2 ) + m 2 — 3} 3 — {18m (cc 2 + y 2 ) — 27x — 2m 3 + 9m} 2 .
The equation of the curve is thus obtained in the form V= 0; this should of
course be equivalent to the before-mentioned equation U = 0; and by developing V,
and comparing with the second of the two expressions of U, it appears that we in
fact have V = 27 U.
9. Taking as parameter tan \0, or if we please cos 0 + V — 1 sin 0, the foregoing
values of (x, y) in terms of 0 give (x, y, 1) proportional to rational and integral
functions of the degree 6 in the parameter; so that not only the curve is a sextic
curve, but it is a unicursal sextic, or curve of the order 6 with the maximum number,
= 10, of nodes and cusps; that is, if 8 be the number of nodes and k the number
of cusps, we have 8 + k = 10. Moreover, introducing the same parameter into the
equation of the tangent, this equation is seen to be of the degree 4 in the
parameter; that is, the class of the curve is = 4: this implies 23 + 3/c = 26, and we
have therefore 3 = 4, tc = 6. To verify these numbers, it is to be remarked that it
appears by the equation of the curve that there is at each of the circular points at
infinity a triple point in the nature of the point x = 0, y = 0 on the curve y 3 =x*;
