Series (mathematics): Difference between revisions
imported>Aleksander Stos (let's get rid of finite series) |
imported>Aleksander Stos m (→Formal definition: another formulation) |
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:<math> S_n=a_1+a_2+\ldots+a_n,\qquad n\in\mathbb{N}.</math> | :<math> S_n=a_1+a_2+\ldots+a_n,\qquad n\in\mathbb{N}.</math> | ||
Then the series is defined as the sequence <math>\{S_n\}_{n=1}^\infty</math> | Then the series is defined as the sequence <math>\{S_n\}_{n=1}^\infty</math> | ||
and denoted by <math>\Sigma_{n=1}^\infty a_n.</math> For a single ''n'', the sum <math>S_n</math> is called the '''partial sum''' of the series. | and denoted by <math>\Sigma_{n=1}^\infty a_n.</math><ref> Other popular (equivalent) definition describes the series as a formal (ordered) list of terms combined by the addition operator</ref> For a single ''n'', the sum <math>S_n</math> is called the '''partial sum''' of the series. | ||
[[Category:Mathematics Workgroup]] | [[Category:Mathematics Workgroup]] |
Revision as of 12:16, 7 March 2007
Informally, series refers to the cumulative sum of a given sequence of terms. Typically, these terms are real or complex numbers, but much more generality is possible.
For example, given the sequence of the natural numbers 1,2,3,..., the series is 1,1+2,1+2+3,...
According to the number of terms, the series may be finite or infinite. The former is relatively easy to deal with. In fact, the finite series is identified with the sum of all terms and --apart of the elementary algebra-- there is no particular theory that applies. It turns out, however, that much care is required when manipulating infinite series. For example, some simple operations borrowed from elementary algebra -- as a change of order of the terms -- often lead to unexpected results. So it is sometimes tacitly understood, especially in the analysis, that the term "series" refers to the infinite series. In what follows we adopt this convention and concentrate on the theory of the infinite case.
Formal definition
Given a sequence of elements that can be added, let
Then the series is defined as the sequence and denoted by [1] For a single n, the sum is called the partial sum of the series.
- ↑ Other popular (equivalent) definition describes the series as a formal (ordered) list of terms combined by the addition operator