Difference between revisions of "Infinity"

From Maths
Jump to: navigation, search
(Created page with "This article is about the symbol {{M|\infty}} ==Notation== '''Always qualify {{M|\infty}} with a {{M|+}} or {{M|-}}''' except where the meaning of {{M|\infty}} can be unambig...")
 
(No difference)

Latest revision as of 11:43, 28 April 2015

This article is about the symbol [ilmath]\infty[/ilmath]

Notation

Always qualify [ilmath]\infty[/ilmath] with a [ilmath]+[/ilmath] or [ilmath]-[/ilmath] except where the meaning of [ilmath]\infty[/ilmath] can be unambiguously resolved

Examples

Sequences

Consider a sequence of reals [ilmath](a_n)_{n=1}^\infty\subset\mathbb{R}[/ilmath] then the statement:

  • [math]\lim_{n\rightarrow\infty}(a_n)[/math] or [math]n\rightarrow\infty[/math]
    is not ambiguous as [ilmath]n[/ilmath] can only get bigger one way (as it's a natural number) we implicitly mean [ilmath]+\infty[/ilmath] here. This is fine.
  • [math]\lim_{n\rightarrow\infty}(a_n)=-\infty[/math]
    Clearly means the sequence gets more and more negative, tending towards [ilmath]-\infty[/ilmath]
  • [math]\lim_{n\rightarrow\infty}(a_n)=+\infty[/math]
    Clearly means the sequence gets more hugely positive, tending towards [ilmath]+\infty[/ilmath]
  • [math]\lim_{n\rightarrow\infty}(a_n)=\infty[/math] to mean [math]\lim_{n\rightarrow\infty}(a_n)=+\infty[/math]
    is wrong as this is a great notation for divergence, for example the sequence [ilmath]a_n=(-1)^nn[/ilmath] diverges

So we now have 4 behaviours:

Behaviour Writing Reading
Convergence [math]\lim_{n\rightarrow\infty}(a_n)=a[/math] The sequence [ilmath]a_n[/ilmath] (tends towards|converges) to [ilmath]a[/ilmath]
[math]\lim_{n\rightarrow\infty}(a_n)=+\infty[/math] The sequence [ilmath]a_n[/ilmath] (tends toward|converges) to [positive] [ilmath]\infty[/ilmath]
[math]\lim_{n\rightarrow\infty}(a_n)=-\infty[/math] The sequence [ilmath]a_n[/ilmath] (tends toward|converges) to negative [ilmath]\infty[/ilmath]
Divergence [math]\lim_{n\rightarrow\infty}(a_n)=\infty[/math] The sequence [ilmath]a_n[/ilmath] diverges