254 Chapter 9Functions of several variables
EXAMPLE 9.4Find the stationary points of the function
f(x, y) 1 = 1 x
31 + 16 xy
21 − 12 y
31 − 112 x
We have
and these are zero when
x
21 + 12 y
21 = 1 4, y(2x 1 − 1 y) 1 = 10
The second equation is satisfied when eithery 1 = 10 ory 1 = 12 x, and substitution of these
in the first equation gives the four stationary points
(2, 0), (−2, 0), (2 2 3, 4 2 3), (− 22 3, − 42 3)
0 Exercises 21–23
For a function of one variable, a stationary point atx 1 = 1 ais a local maximum if the
second derivative is negative,f′′(a) 1 < 10 , a local minimum iff′′(a) 1 > 10 , and may be a
point of inflection iff′′(a) 1 = 10. The corresponding conditions for a function of two
variables are
f
xx 1< 1 0andf
yy1 < 1 0 for a maximum (9.10a)
f
xx 1
1 0andf
yy 1
1 0 for a minimum (9.10b)
and
f
xxf
yy1 − 1 f
2xy1 > 1 0 for either a maximum or a minimum (9.10c)
If the quantity∆ 1 = 1 f
xxf
yy1 − 1 f
2xyis negative then the point is a saddle point; a maximum
in one direction and a minimum in another. If∆ 1 = 10 then further tests are required
to determine the nature of the point. The corresponding conditions are more
complicated for functions of more than two variables.
EXAMPLE 9.5The nature of the stationary points of Example 9.4.
The stationary points of the functionf(x, y) 1 = 1 x
31 + 16 xy
21 − 12 y
31 − 112 xare
(2, 0), (−2, 0), (2 2 3, 4 2 3), (− 22 3, − 42 3)
∂
∂
=+ −,
∂
∂
=−
f
x
xy
f
y
3 6 12 12 6xy y
22 2