Taylor Series

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Review Concepts

  • Sequences
  • Convergence of infinite sequences
  • Infinite series
  • The sequence of partial sums of an infinite series
  • Power series

New Concept: Taylor Series

  • Think of Taylor series as a special kind of power series, where the sequence of partial sums are meant as better and better approximations of some function.
  • The Taylor Series is derived from the function.

Definition copied, verified, and adapted from Wikipedia, this page (permanent link). See license to copy, modify, distribute.

The Taylor series of a function ƒ(x) at a is the power series

f(a)+\frac {f'(a)}{1!} (x-a)+ \frac{f''(a)}{2!} (x-a)^2+\frac{f^{(3)}(a)}{3!}(x-a)^3+ \cdots.

which can be written in the more compact sigma notation as

 \sum_{n=0} ^ {\infin } \frac {f^{(n)}(a)}{n!} \, (x-a)^{n}
  • Note that for nth approximate partial sum, the only information used about the function  f , is its derivatives at  a up to order  n .
  • Convergence: A function whose Taylor series converges to the function is called analytic. But sometimes, as we have seen with power series generally, convergence can occur only within a radius of convergence.
  • Example: The Taylor series for cos(x), at a = 0. Partial sums for 4 and 6 terms.
cos(x) and Taylor series partial sums for cos(x), 4 and 6 terms

Try it yourself

Open Maxima and type (or copy and paste):

a:0;
n1:4;
n2:6;
M:4;
plot2d([taylor(cos(x),x,a,n1), taylor(cos(x),x,a,n2), cos(x)],[x,-M,M]);

After you have typed in the above you can change the parameters a, n1, n2, M by scrolling up and changing them, then pressing return.

  •  a is where the derivatives are taken
  • n1 and n2 are the orders for the two taylor series plots
  • [-M, M] is the range of the plot

Questions for Exploration and Discussion in Groups of Three (With Computer)

  • Does the series seem to converge in the range [-M,M] =[-8,8]? If so, how large should n1 or n2 be so that this convergence is apparent?
  • What is imprecise about the previous question? Why should it make a mathematician cringe?

Instead of cos(x) try the function

 f(x) = \frac{1}{x^2+1}

plot2d([taylor(1/(x^2+1),x,a,n1), taylor(1/(x^2+1),x,a,n2), 1/(x^2+1)],[x,-M,M]);
  • Is there a region where the Taylor series seems to converge.

Looking Ahead

  • Taylor's theorem -- a precise statement which relates the error in the Taylor approximation of f(x) to the next higher derivative evaluated at some point c between x and a.