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9.1 Power Series. Start with a square one unit by one unit:. 1. This is an example of an infinite series. 1. This series converges (approaches a limiting value.). Many series do not converge:. If S n has a limit as , then the series converges, otherwise it diverges.
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9.1 Power Series
Start with a square one unit by one unit: 1 This is an example of an infinite series. 1 This series converges (approaches a limiting value.) Many series do not converge:
If Sn has a limit as , then the series converges, otherwise it diverges. In an infinite series: a1, a2,… are terms of the series. an is the nth term. Partial sums: nth partial sum
This converges to if , and diverges if . is the interval of convergence. Geometric Series: In a geometric series, each term is found by multiplying the preceding term by the same number, r.
a r Example 1:
a r Example 2:
If then If and we let , then: The partial sum of a geometric series is: The more terms we use, the better our approximation (over the interval of convergence.)
A power series is in this form: or The coefficientsc0, c1, c2… are constants. The center “a” is also a constant. (The first series would be centered at the origin if you graphed it. The second series would be shifted left or right. “a” is the new center.)
Example 3: multiply both sides by x. To find a series for Once we have a series that we know, we can find a new series by doing the same thing to the left and right hand sides of the equation. This is a geometric series where r=-x.
So: Example 4: Given: find: We differentiated term by term.
hmm? Example 5: Given: find:
The previous examples of infinite series approximated simple functions such as or . This series would allow us to calculate a transcendental function to as much accuracy as we like using only pencil and paper! p