Difference between revisions of "Sequence"
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The numbers <math>f(n)</math> are often denoted as <math>a_n</math> and the set <math>f(\mathbb{N})</math> is denoted as the 'sequence' <math>\left\langle a_n\right\rangle</math> | The numbers <math>f(n)</math> are often denoted as <math>a_n</math> and the set <math>f(\mathbb{N})</math> is denoted as the 'sequence' <math>\left\langle a_n\right\rangle</math> |
Revision as of 04:42, 23 February 2008
A sequence is an ordered list of terms. Sequences may be either finite or infinite. In mathematics we are often interested in sequences with specific properties, the Fibonacci sequence is perhaps the most famous example.
Contents
Definition
A sequence of real numbers is simply a function
The numbers are often denoted as and the set is denoted as the 'sequence'
Convergence
The notion of 'converging sequences' is often useful in real analysis
Let be a real valued sequence
Let
We say that ''
or ' converges to ' if and only if
, $\exists\M\in\mathbb{N}$ (Error compiling LaTeX. Unknown error_msg) such that
Resources
- Online Encyclopedia of Integer Sequences -- A really cool math tool.
See Also
This article is a stub. Help us out by expanding it.