9.4 Stationary points 253
EXAMPLES 9.3More partial derivatives
(i) The nonzero partial derivatives ofu 1 = 1 x 1 + 1 y
21 + 12 y
3are
(ii) The first and second partial derivatives ofu 1 = 1 sin 1 x 1 cos 1 y 1 + 1 x 2 yare
andu
xy1 = 1 u
yx(iii) For the ideal gas,V 1 = 1 nRT 2 pand
0 Exercises 8–20
9.4 Stationary points
We saw in Section 4.10 that a functionf(x)of one variable has a stationary value
at pointx 1 = 1 aif its derivative at that point is zero; that is, iff′(a) 1 = 10. Geometrically,
the graph of the function has zero slope at the stationary point; its tangent line is
‘horizontal’. The corresponding condition for a function of two variables is that the
tangent planebe horizontal. A functionf(x, y)then has stationary point at(x, y) 1 = 1 (a, b)
if its partial first derivatives are zero:
(9.9)
orf
x(a, b) 1 = 1 f
y(a, b) 1 = 10. In view of equation (9.5), these are sufficient for all the first
derivatives of a continuous function to be zero at a point.
∂
∂
=
∂
∂
=,
f
x
f
y
0at ( )ab
Tn pn pT
V
p
nRT
p
V
T
nR
p
,,,
∂
∂
=− ,
∂
∂
=,
∂
2VV
n
RT
∂ p
=
u
u
xy
xy
y
u
u
yx
x
xy yx=
∂
∂∂
=− − =
∂
∂∂
=−
2221
cos sin , cos ssiny
y
−
1
2u
u
x
xy u
u
y
xy
xx yy=
∂
∂
=− , =
∂
∂
=− +
22222
sin cos sin cos
xx
y
3u
u
x
xy
y
u
u
y
xy
x
y
xy=
∂
∂
=+,=
∂
∂
cos cos =−sin sin −
1
2∂
∂
=,
∂
∂
=+ ,
∂
∂
=+ ,
∂
∂
=
u
x
u
y
yy
u
y
y
u
y
1 2 6 2 12 12
22233