4.6 Differentiation by rule 103
EXAMPLES 4.9Differentiating powers
(i) y 1 = 1 x
5(ii)f(x) 1 = 1 x
− 122(iii)f(x) 1 = 1 x
0.30 Exercises 23–26
EXAMPLE 4.10For the ideal gas example discussed in Section 4.1,
sincenRTis constant at constant Tand n. We note that whereas Vis inversely
proportional to p, it is directly proportional to 12 p; that is,Vis a linear function of
12 p, and the graph ofVagainst 12 pis a straight line with slope
.
The rules for differentiating combinations of elementary functions are summarized
in Table 4.3; in these rules, xis the independent variable, y, uand vare functions of x,
and ais a constant.
dV
dp
nRT
()1
=
V
nRT
p
dV
dp
nRT
d
dp p
nRT
p
=, =
=−
=
11
2−−nRT
p
2d
dx
fx x()=.
−.03
07′ =−
−fx() x
1
2
32dy
dx
= 5 x
4Table 4.3 Differentiation of combinations of functions
Type Rule
- multiple of a function
- sum of functions
- product rule
- quotient rule
- chain rule
- inverse rule or
dx
dy
dy
dx
×= 1
dx
dy
dy
dx
=
1
d
dx
fu
df
du
du
dx
()=×
d
dx
udu
dx
u
d
v dx
v
v
v
=−
2
d
dx
uu
d
dx
du
dx
()v
v
=+v
d
dx
u
du
dx
d
dx
()+= +v
v
d
dx
au a
du
dx
()=