Difference between revisions of "Surjection"
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(Created page with "Surjective is onto - for <math>f:A\rightarrow B</math> every element of <math>B</math> is mapped onto from at least one thing in <math>A</math>") |
m (Linking to surjection's problem, making note to apply to bijection - finishing proof that really should be in its own page.) |
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− | Surjective is onto - for <math>f:A\rightarrow B</math> every element of <math>B</math> is mapped onto from at least one thing in <math>A</math> | + | {{Requires work|grade=A*|msg=See [[Injection]]'s requires-work box [https://wiki.unifiedmathematics.com/index.php?title=Injection&oldid=9337 permalink] [[User:Alec|Alec]] ([[User talk:Alec|talk]]) 21:56, 8 May 2018 (UTC) |
+ | |||
+ | Also: | ||
+ | * Factor out composition theorem into own page. [[User:Alec|Alec]] ([[User talk:Alec|talk]]) 21:56, 8 May 2018 (UTC) | ||
+ | * Apply this to the [[Bijection]] page too [[User:Alec|Alec]] ([[User talk:Alec|talk]]) 21:56, 8 May 2018 (UTC)}} | ||
+ | |||
+ | :: Surjective is onto - for <math>f:A\rightarrow B</math> every element of <math>B</math> is mapped onto from at least one thing in <math>A</math> | ||
+ | __TOC__ | ||
+ | ==Definition== | ||
+ | {{:Surjection/Definition}} | ||
+ | |||
+ | ==Theorems== | ||
+ | {{Begin Inline Theorem}}<!-- TODO: MOVE TO OWN SUBPAGE ! --> | ||
+ | The composition of surjective functions is surjective | ||
+ | {{Begin Inline Proof}} | ||
+ | Let {{M|f:X\rightarrow Y}} and {{M|g:Y\rightarrow Z}} be surjective maps, then their composition, {{M|1=g\circ f=h:X\rightarrow Z}} is surjective. | ||
+ | |||
+ | : We wish to show that <math>\forall z\in Z\exists x\in X[h(x)=z]</math> | ||
+ | |||
+ | |||
+ | : Let {{M|z\in Z}} be given | ||
+ | :: Then {{M|\exists y\in Y}} such that {{M|1=g(y)=z}} | ||
+ | :: Of course also {{M|\exists x\in X}} such that {{M|1=f(x)=y}} | ||
+ | :: We now know {{M|\exists x\in X}} with {{M|1=f(x)=y}} and {{M|1=g(y)=g(f(x))=h(x)=z}} | ||
+ | |||
+ | : Thus it is shown that: | ||
+ | :* {{M|1=\forall z\in Z\exists x\in X[h(x)=z]}} | ||
+ | : as required.<ref>[[User:Alec|Alec's]] work - the proof speaks for itself</ref> | ||
+ | {{End Proof}} | ||
+ | {{End Theorem}} | ||
+ | |||
+ | ==See also== | ||
+ | * [[Injection]] | ||
+ | * [[Bijection]] | ||
+ | * [[Function]] | ||
+ | |||
+ | ==References== | ||
+ | <references/> | ||
+ | |||
+ | {{Definition|Set Theory}} |
Latest revision as of 21:56, 8 May 2018
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- Surjective is onto - for [math]f:A\rightarrow B[/math] every element of [math]B[/math] is mapped onto from at least one thing in [math]A[/math]
Contents
Definition
Given a function [ilmath]f:X\rightarrow Y[/ilmath], we say [ilmath]f[/ilmath] is surjective if:
- [math]\forall y\in Y\exists x\in X[f(x)=y][/math]
- Equivalently [math]\forall y\in Y[/math] the set [math]f^{-1}(y)[/math] is non-empty. That is [math]f^{-1}(y)\ne\emptyset[/math]
Theorems
The composition of surjective functions is surjective
Let [ilmath]f:X\rightarrow Y[/ilmath] and [ilmath]g:Y\rightarrow Z[/ilmath] be surjective maps, then their composition, [ilmath]g\circ f=h:X\rightarrow Z[/ilmath] is surjective.
- We wish to show that [math]\forall z\in Z\exists x\in X[h(x)=z][/math]
- Let [ilmath]z\in Z[/ilmath] be given
- Then [ilmath]\exists y\in Y[/ilmath] such that [ilmath]g(y)=z[/ilmath]
- Of course also [ilmath]\exists x\in X[/ilmath] such that [ilmath]f(x)=y[/ilmath]
- We now know [ilmath]\exists x\in X[/ilmath] with [ilmath]f(x)=y[/ilmath] and [ilmath]g(y)=g(f(x))=h(x)=z[/ilmath]
- Thus it is shown that:
- [ilmath]\forall z\in Z\exists x\in X[h(x)=z][/ilmath]
- as required.[1]