Difference between revisions of "Exponential distribution/Definition"

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(Created page with "<noinclude> {{Requires references|use Rice's {{M|\mathbb{P} }} book. Page 48|grade=B}} __TOC__ ==Definition== </noinclude>Let {{M|\lambda\in\mathbb{R}_{\ge 0} }} be given, and...")
 
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{{Requires references|use Rice's {{M|\mathbb{P} }} book. Page 48|grade=B}}
 
{{Requires references|use Rice's {{M|\mathbb{P} }} book. Page 48|grade=B}}
 
__TOC__
 
__TOC__
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==Using this page==
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Set {{c|home}} to something when using this page to change the "the proof of this is ''claim 1'' message"
 
==Definition==
 
==Definition==
 
</noinclude>Let {{M|\lambda\in\mathbb{R}_{\ge 0} }} be given, and let {{M|X\sim\text{Exp}(\lambda)}} be an ''exponentially distributed'' [[random variable]]. Then:
 
</noinclude>Let {{M|\lambda\in\mathbb{R}_{\ge 0} }} be given, and let {{M|X\sim\text{Exp}(\lambda)}} be an ''exponentially distributed'' [[random variable]]. Then:
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** {{M|f:x\mapsto \lambda e^{-\lambda x} }}, from this we can obtain:
 
** {{M|f:x\mapsto \lambda e^{-\lambda x} }}, from this we can obtain:
 
* the [[cumulative distribution function]], {{M|F:\mathbb{R}_{\ge 0}\rightarrow[0,1]\subseteq\mathbb{R} }}, which is:
 
* the [[cumulative distribution function]], {{M|F:\mathbb{R}_{\ge 0}\rightarrow[0,1]\subseteq\mathbb{R} }}, which is:
** {{M|F:x\mapsto 1-e^{\lambda x} }}
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** {{M|F:x\mapsto 1-e^{-\lambda x} }}
 
*** The proof of this is '''claim 1''' {{#if:{{{home|}}}|below|on the [[exponential distribution]] page}}
 
*** The proof of this is '''claim 1''' {{#if:{{{home|}}}|below|on the [[exponential distribution]] page}}
  

Latest revision as of 01:27, 16 March 2018

Grade: B
This page requires references, it is on a to-do list for being expanded with them.
Please note that this does not mean the content is unreliable, it just means that the author of the page doesn't have a book to hand, or remember the book to find it, which would have been a suitable reference.
The message provided is:
use Rice's [ilmath]\mathbb{P} [/ilmath] book. Page 48

Using this page

Set home to something when using this page to change the "the proof of this is claim 1 message"

Definition

Let [ilmath]\lambda\in\mathbb{R}_{\ge 0} [/ilmath] be given, and let [ilmath]X\sim\text{Exp}(\lambda)[/ilmath] be an exponentially distributed random variable. Then:

  • the probability density function, [ilmath]f:\mathbb{R}_{\ge 0}\rightarrow\mathbb{R}_{\ge 0} [/ilmath] is given as follows:
    • [ilmath]f:x\mapsto \lambda e^{-\lambda x} [/ilmath], from this we can obtain:
  • the cumulative distribution function, [ilmath]F:\mathbb{R}_{\ge 0}\rightarrow[0,1]\subseteq\mathbb{R} [/ilmath], which is:

The exponential distribution has the memoryless property[Note 1]

Notes

  1. Furthermore, the memoryless property characterises the exponential distribution, that is a distribution has the memoryless property if and only if it is a member of the exponential distribution family, i.e. an exponential distribution for some [ilmath]\lambda\in\mathbb{R}_{>0} [/ilmath]

References