1. Power Series as Functions

2. Defining our Function In general, we can say that That is, if the series converges at x = a, then is a number and we can define The power series is a function on its interval of convergence.

3. Graphical Example To see this idea “in action,” Consider the power series What is the interval of convergence? The ratio test shows that the radius of convergence is ? So the series converges on (?,?) What about the endpoints? I = ???

4. Graphical Example To see this idea “in action,” Consider the power series What is the interval of convergence? The ratio test shows that the radius of convergence is 2 So the series converges on (?,?) What about the endpoints? I = ???

5. Graphical Example To see this idea “in action,” Consider the power series What is the interval of convergence? The ratio test shows that the radius of convergence is 2 So the series converges on (1,5) What about the endpoints? I = ???

6. Graphical Example To see this idea “in action,” Consider the power series What is the interval of convergence? The ratio test shows that the radius of convergence is 2 So the series converges on (1,5) What about the endpoints? I = [1,5] The domain of the function

7. Graphical Example Now use Maple to graph the 30 th, 35 th, 40 th, and 45 th partial sums of the power series Remember that each partial sum is a polynomial. So we can plot it!

8. Graphical Example This graph shows the 30 th, 35 th, 40 th, and 45 th partial sums of the power series Do you see the interval of convergence emerging in the graph?

9. Some Questions Arise The main goal of our lesson for today is to consider the sorts of functions that are sums of Power Series: What are these functions like? Can we find formulas for them? Are power series functions continuous? Are they differentiable? If so, what do their derivatives and antiderivatives look like?

10. Consider an (already familiar) Example Our old friend the geometric series! We know it converges to whenever |x| < 1 and diverges elsewhere. That is,

11. Our first formula! Near x = 1, the partial sums “blow up” giving us the asymptote we expect to see there. Near x = -1the even and odd partial sums go opposite directions, preventing any convergence to the left of x = -1. We see the expected convergence on a “balanced” interval about x = 0. This plot shows the 10 th, 12 th, 13 th, and 15 th partial sums of this series.

12. Clearly this function is both continuous and differentiable on its interval of convergence. It is very tempting to say that the derivative for f (x) = 1 + x + x 2 + x 3 +... should be But is it? For that matter, does this series even converge? And if it does converge, what does it converge to? Our first formula! What else can we observe?

13. It does converge, as the ratio test easily shows: So the ratio test limit is: So the “derivative” series also converges on (-1,1). What about the endpoints? Does it converge at x = 1? x = -1? The general form of the series is

14. Differentiating Power Series 6 th partial sum10 th partial sum The green graph is the partial sum, the red graph is Does it converge to

15. This graph suggests a general principle: Let be a power series with radius of convergence r > 0. And let And then Both D and A converge with radius of convergence r. On the interval (x 0 - r,x 0 +r) S’(x) = D(x). On the interval (x 0 - r,x 0 +r) A’(x) = S(x). Theorem: (Derivatives and Antiderivatives of Power Series)

16. Is this true of all Series Functions? No. Power Series are very special in this regard! If, instead of adding up powers of x with coefficients, we add up trig functions, we get very different behavior. Consider, for example

17. The partial sums of the series look like this. 1 st partial sum2 nd partial sum8 th partial sum

18. 3 rd partial sum 10 th partial sum 5 th partial sum -2 1 2 The partial sums of the series look like this.