120 Chapter 4Differentiation
Consider the cubic
Let ∆ybe the change in yaccompanying the change ∆xin x:
∆y 1 = 1 f(x 1 + 1 ∆x) 1 − 1 f(x) 1 = 1 (x 1 + 1 ∆x)
31 − 1 x
3= 13 x
21 ∆x 1 + 13 x(∆x)
21 + 1 (∆x)
3The derivativedy 2 dxis obtained by dividing this expression by∆xand letting∆x 1 → 10.
Another way of looking at the limit is to consider ∆xas a ‘very small’ change. If∆xis
made small enough then the term in(∆x)
3becomes much smaller than the term in
(∆x)
2which in turn becomes much smaller than the term in ∆x,
(∆x)
31 << 1 (∆x)
21 << 1 ∆x
For example,∆x 1 = 110
− 3,(∆x)
21 = 110
− 6, and(∆x)
31 = 110
− 9. An approximate expression
for the change in yis then
∆y 1 ≈ 13 x
21 ∆x 1 = 1 f′(x) 1 ∆x
and this is often a useful way of approximating small changes. The quantityf′(x)∆x
would be the change in yif∆xwere small enough. It is usefulto consider an arbitrary
small change dx, an ‘infinitesimal change’, such that terms in (dx)
2and higher can be
set to zero. The corresponding change in y
dy 1 = 1 f′(x) 1 dx (4.30)
is called the differentialof y.
7The use of the differential will become clear in later chapters. It is important in the
physical sciences because fundamental theorems are sometimes expressed in differ-
ential form; in particular, the laws of thermodynamics are nearly always expressed in
terms of differentials.
0 Exercises 89 – 91
EXAMPLE 4.26The differential area of a circle
The area of a circle as a function of the radius is
A(r) 1 = 1 πr
2yfx x
dy
dx
==,( ) =fx x′( )=
323
7Leibniz’s formulation of the calculus was in terms of differentials. His 1684 paper contains the formulas
dx
n1 = 1 nx
n− 1dx, for the infinitesimal change or differential ofx
n, anddxy 1 = 1 xdy 1 + 1 ydxfor the product rule (see
Example 4.27).