551]
551
551.
TWO SMITH’S PRIZE DISSERTATIONS.
[From the Messenger of Mathematics, vol. n. (1873), pp. 145—149.]
Write dissertations on the following subjects :
1. The theory of interpolation, with a determination of the limits of error in the
value of a function obtained by interpolation.
2. Determinants.
1. The general problem is to find y a function of x having given values for
given values of x. The problem thus stated is of course indeterminate; in practice, we
assume a certain form for the function y, the coefficients of which form are determined
by the given conditions, viz. either y is known to be of the form in question, the
actual value being then determined as above, or it is assumed that y is approximately
equal to a function of the form in question, and the value is then approximately
determined in such wise that, for the given values of x, the function y shall have its
given values.
The ordinary case is when we have the values of y corresponding to n given
values of x, and y is taken to be a function of the form A + Bx + ... + Kx n_1 .
Suppose to fix the ideas n= 4, and that y lt y 2 , y s , y i are the values of y corre
sponding to the values a, h, c, d of x. We may at once write down the expression
(x — h) (x — c) (x — d)
y * (a — b) (a — c) (a — d) ^
+
(x — c) (x — d) (x — a)
0b-c) (b-d) (b -a) 2/2
(x — d) (x — a) (x — b)
+ (c — d) (c — a) (c — b)
V3
(x — a) (x — b) (x — c)
+ (d-a) (d-b) (d-c)
2/4,
