Advanced High-School Mathematics

(Tina Meador) #1

SECTION 5.4 Polynomial Approximations 291


=

∑n
k=0

f(k)(a)
n!

(x−a)k.

We expect, then, to have a pretty good approximation


f(x) ≈

∑n
k=0

f(k)(a)
n!
(x−a)k.

The polynomial Pn(x) =

∑n
k=0

f(k)(a)
n!

(x−a)k is called the Taylor

polynomial of degreenforf at x=a. Ifa= 0, the above polyno-
mial becomes


f(x) ≈

∑n
k=0

f(k)(a)
n!

xk

and is usually called theMaclaurin polynomial of degree nforf.


What if, instead of stopping at a degreenpolynomial, we continued
the process indefinitely to obtain a power series? This is possible and
we obtain


∑∞
k=0

f(k)(a)
n!
(x−a)k Taylor seriesforf atx=a, and

∑∞
k=0

f(k)(a)
n!

xk Maclaurin seriesforf.

Warning. It is very tempting to assume that the Taylor series for a
functionf will actually converge tof(x) on its interval of convergence,
that is,


f(x) =

∑∞
k=0

f(k)(a)
n!

(x−a)k.
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