- Topics At a Glance
- Series: This is the Sum That Doesn't End
- Sigma Notation
- Alternating Series
**Convergence of Series****Finally, Meaning...and Food**- Relationship Between Sequences
- Math-e-magics?
- When Limits of Summation Don't Matter
- Properties of Series
- Special Cases
- Arithmetic Series
- Geometric Series
- Finite Geometric Series
- Infinite Geometric Series
- Decimal Expansion
- Word Problems
- Visualization of Series
- When Limits of Summation Don't Matter
- Tests for Convergence
- The Divergence Test
- The Alternating Series Test
- The Ratio Test
- The Integral Test
- The Comparison Test
- Absolute Convergence vs. Conditional Convergence
- Summary of Tests
- Taylor and Maclaurin Series
- In the Real World
- I Like Abstract Stuff; Why Should I Care?
- How to Solve a Math Problem

We can use the idea of partial sums to (finally) describe what it means to add infinitely many numbers together. We can taste our infinite brownie, too. In symbols, we want to know what

means, and just how much chocolaty goodness we are going to get.

Think about what happens when you put laundry detergent into a washing machine. As you add more suds, there's enough to wash the laundry and all goes well. You can also add so much that a detergent monster oozes from the washer, soaping your dry socks and cat Binx.

The same happens with series. As we add numbers, if the sum gets closer and closer to some particular value *L*, this means the partial sums

*S*_{1}, *S*_{2}, *S*_{3}, ...

get closer and closer to *L*. In this case, it makes sense to say that when you add those infinitely many numbers together, you get *L*.

If the sum doesn't get closer and closer to any particular number as you keep adding and adding, there's no reasonable way to say what the sum of those infinitely many numbers is. The series is an untamable detergent beast.

Since we promised food, we can put this in terms of a brownie, or a brownie and limits. Specifically, we're talking about the limit of the sequence of partial sums.

Start with a series and look at the associated sequence of partial sums

*S*_{1}, *S*_{2}, *S*_{3}, ....

As with any sequence, this sequence may converge or diverge.

If the sequence of partial sums converges to a finite number *L*, then we say *the series converges to L*. In symbols, the series converges to

In this case we say that *L* is the *sum of the series*.

If the sequence of partial sums doesn't converge, then the series doesn't converge either, and we say *the series diverges*.

In terms of a brownie, our brownie continues to grow large that it won't fit inside any box, then the brownie is infinite. But if there is a box it will fit inside of, the brownie is finite in size.

**Be Careful:** From here on, *we're using the word converge to mean three or four different things*.

The word converge means different things depending on whether we're talking about sequences, series, functions, or improper integrals.

- When talking about sequences, we use the word "converge" to mean the terms of the sequence
*a*_{1},*a*_{2},*a*_{3}, ...

approach a limit.

- When talking about series, we use the word "converge" to mean the terms
*of the sequence of partial sums**S*_{1},*S*_{2},*S*_{3}, ...

approach a limit.

Finding the sum of a series can be difficult, because not every series has a nice formula for the partial sum *S _{n}*. Fortunately, we often only care if a series converges or diverges. That is much easier than finding the exact sum. We will see later that we have a number of tools in a handy, leather tool belt to help us figure these things out.

The finite series

3 + 4

can be rewritten as the infinite series

3 + 4 + 0 + 0 + 0 + 0 + ...

The partial sums of this series are

*S*_{1} = 3

*S*_{2} = 7

*S*_{3} = 7

and *S _{n}* = 7 for all larger

3, 7, 7, 7, 7, 7,...

Since the sequence of partial sums converges to 7, it makes sense to say that the series

3 + 4

converges to 7.

Example 1

Determine if the series from Zeno's Paradox diverges or converges. If it converges, what is the sum of the series? |

Example 2

Determine if the series converges or diverges. If it converges, find its sum. |

Exercise 1

If *a* is a constant and the series

converges, what is the value of *a*?

Exercise 2

Determine if the series

converges or diverges.