EXAMPLE 32
A very useful and important local linearization enables us to approximate (1 + x) k by 1 + kx for
k any real number and for x near 0. Equation (1) yieldsThen, near 0, for example,EXAMPLE 33
Estimate the value of at x = 0.05.
SOLUTION: Use the line tangent to at x = 0; f (0) = 3.
so f ′(0) = 6 ; hence, the line is y = 6x + 3.
Our tangent-line approximation, then, is
At x = 0.05, we have f (0.05) ≈ 6(0.05) + 3 = 3.3.
The true value, to three decimal places, of when x = 0.05 is 3.324; the tangent-line
approximation yields 3.3. This tells us that the curve is concave up, lying above the tangent line
to the curve near x = 0. Graph the curve and the tangent line on [−1, 1] × [−1, 6] to verify these
statements.Approximating the Change in a Function.
Equation (1) above for a local linear approximation also tells us by about how much f changes when
we move along the curve from a to x: it is the quantity f ′(a)(x − a). (See Figure N4–20.)
EXAMPLE 34
By approximately how much does the area of a circle change when the radius increases from 3 to
3.01 inches?
SOLUTION: We use the formula A = πr^2. Then Equation (1) tells us that the local linear
approximation for A(r), when A is near 3, is
A(3) + A ′(3)(r − 3).
Here we want only the change in area; that is,
A ′(3)(r − 3) when r = 3.01.
Since A ′(r) = 2πr, therefore A ′(3) = 6π; also, (r − 3) = 0.01, so the approximate change is (6π)
(0.01) 0.1885 in.^2 The true increase in area, to four decimal places, is 0.1888 in.^2