THE APPLICATION OF ALGEBRA
therefore x —
3 a
± v 4
ban
But x, by the nature
2 — r 4
of the problem, being less than a, the upper sign (f)
gives x too great; so that x— —1/ ^^- — 38,19658,
2 v 4
&c. must be the true value required.
PROBLEM XLV.
The sum, and the sum of the squares, of two numbers
being given; to fnd the numbers.
Let half the sum of the two numbeus be denoted by a,
half the sum of their squares by b, and half the difference
of the numbers by x; then will the numbers themselves
be represented by a — x, and <z f x, and their squares
by a* — 2ax ¡- x\ and a 1 f 2ax f x*; and so we
have a z — Sax f x 7 4- a 2 4- 2ax \- x 1 — <2b, by the ques
tion. Which equation, contracted and divided by 2 gives
a 1 4- x 1 — b; whence x 1 — b — a\- and consequently
x — %/b — a 1 » Therefore the numbers sought are
a — \/b — a% and a + \/h — a\
PROBLEM XLVI.
•' • - •
The sum, and the sum of the cubes of two numbers
being given; to find the numbers.
Let the two numbers be expressed as in the preceding
problem, and let the sum of their cubes be denoted by
Therefore will a — x] 1 + a -f xV ~ c, that is, by
involution and reduction, 2a 3 -f- 6ax r — c; whence
c — 2 a 3 c a 1 ,
— , and x i=
3
