Sequences and Series

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Title: Sequences and Series

1
Sequences and Series

2
What is a sequence?

A sequence can be thought of as an infinite
list of numbers in order. More formally, as a
function from the set of positive integers to the
set of reals.
Examples
1) an 1, 2, 3, . or an n2) an 1,
or an 1/n3) an
or an 1/2n

3
Find the first 5 terms of the following sequences.

4
What can we do with sequences?

As sequences are functions, we can
- graph them,
- we can find their limit at infinity, (if the
limit exists and is a real number we say the
sequence is convergent, otherwise the sequence is
divergent)
- we can decide if they are increasing or
decreasing,
- we can decide if they are bounded

5
What is a series?

6
What does it mean to add up infinitely many terms?

Consider an infinite series
and let sn a1 a2 an
be the nth partial sum of the series,
then we say that
a) if the sequence s is convergent and the
limit as n approaches infinity exists as a real
number, say s, then the series converges and we
write
a1 a2 an s or
b) otherwise, the series diverges.

7
The Geometric Series

8
Examples

9
Power Series

10
Example

If we let the constants be all 1 in the power
series, then we get the geometric series
1 x x2 x3 1/(1-x)
if x lt 1, which is the radius of
convergence of this power series.

11
Note

We can use power series to represent certain
functions, with radius of convergence, which
allows us to both differentiate and integrate
functions using this form term by term.
Question becomes which functions are
representable?

12
Taylor Series

If a function f has a power series expansion
at some number a, then it has the form
f(x)
this is called the Taylor series of the
function f at a (or centered at a).