664]
ON THE 16-NODAL QUARTIC SURFACE.
183
Writing successively 9 — b and 9 = c, we obtain
(a-d) (e -/)
1, e + f ef
1, b + c, be
1, a + d, ad
= (a —f) (b — d)(b — e) [ac] - (a — b) (b — f) (d — e) [ab\
+ (a — b)(b — e) (d —f) [ce?]
(a — d)(e—f)
1, e + f, ef
1, b + c, be
1, a + d, ad
( a —e)(b — d) (b —f) [bd];
= — (a — c) (c —f) (d — e) [ac] +{a—f)(c — d) (c — e) [ab]
- (a - e) (c - d) (c -f) [cd] + (a - c) (c - e) (d -/) [bd];
which values of [&] and [c], combined with the foregoing equation
(a - d) (e -/) f[b\ V[c] = - V[ac] Vp] + f[cd] \/[bd],
give the required quartic equation between '/[ac], '/[ab], '/[cd], V[6d].
Cambridge, 2 August, 1877.
