Mengdeliar

Vorlage:Öömrang

At mengdeliar as en grünjleien fääk faan't matematiik. Hat befaadet ham diarmä, hü mengden mäenööder tuuphinge an faanenööder ufhinge. Det spriak faan't mengdeliar woort brükt uun a algebra, analysis, geometrii, topologii an ööder matemaatisk feeg.

Det eegenskap ${\displaystyle \in }$ (as element faan) as det wichtagst ferbinjang tesken mengden. Ales, wat diarütj fulagt, san loogisk slütjer.

Aptäälang

At mengde mä a elementen ${\displaystyle x_1}$ bit ${\displaystyle x_n}$ häält det element ${\displaystyle a}$ genau do, wan ${\displaystyle a}$ mä ian element ${\displaystyle x_k}$ auerianstemet:

${\displaystyle a\in \{x_1,\dots ,x_n\}:⟺a=x_1\vee a=x_2\vee \cdots \vee a=x_n}$

Det ütjsaag

${\displaystyle a\in \{1,2,3,4\}}$

as likwäärdag (ekwiwalent) mä:

${\displaystyle a=1\vee a=2\vee a=3\vee a=4.}$

Beskriiwang

At mengde faan ${\displaystyle x}$, huarför det eegenskap ${\displaystyle P(x)}$ tudraapt, häält en element ${\displaystyle a}$ genau do, wan det eegenskap üüb ${\displaystyle a}$ tudraapt:

${\displaystyle a\in \{x\mid P(x)\}:⟺P(a)}$

Uun a ütjsaagenloogik het det:

${\displaystyle \mathrm{\forall }x(x\in A\leftrightarrow P(x))}$

Dialmengde

En mengde ${\displaystyle A}$ as en dialmengde faan ${\displaystyle B}$, wan arke element faan ${\displaystyle A}$ uk element faan ${\displaystyle B}$ as:

${\displaystyle A\subseteq B:⟺\mathrm{\forall }x(x\in A\to x\in B)}$

Leesag mengde

En mengde saner elementen as det leesag mengde. Hat woort mä ${\displaystyle \mathrm{\varnothing }}$ of uk ${\displaystyle \{\}}$ betiakent.

${\displaystyle A=\mathrm{\varnothing }:⟺\mathrm{\forall }x(\mathrm{\neg }x\in A)}$

För det jindial ${\displaystyle \mathrm{\neg }x\in A}$ täält uk: ${\displaystyle x\notin A}$.

Gemiansoom mengde

Diar san ${\displaystyle U}$ mengden. Det gemiansoom mengde faan ${\displaystyle U}$ as det mengde faan objekten, diar uun arke elementmengde faan ${\displaystyle U}$ banen san:

${\displaystyle \bigcap U:=\{x\mid \mathrm{\forall }a\in U:x\in a\}}$

Ferianagt mengde

Det ferianagt mengde faan ${\displaystyle U}$ mengden as det mengde faan objekten, diar uun tumanst ian elemntmengde faan ${\displaystyle U}$ banen san:

${\displaystyle \bigcup U:=\{x\mid \mathrm{\exists }a\in U:x\in a\}}$

Likedenang mengden

Tau mengden san likdenang, wan diar josalew elementen banen san:

${\displaystyle A=B:⟺\mathrm{\forall }x(x\in A\leftrightarrow x\in B)}$

Diferens an komplement

At diferens of uk restmengde faan ${\displaystyle A}$ an ${\displaystyle B}$ ("A saner B") as det mengde faan elementen, diar uun ${\displaystyle A}$, oober ei uun ${\displaystyle B}$ banen san:

${\displaystyle A\setminus B:=\{x\mid (x\in A)\wedge (x\in ̸B)\}}$

Det diferens as uk det komplement faan B uun A:

${\displaystyle B^{\complement }:=\{x\mid x\in ̸B\}}$

Sümeetrisk diferens

Det as det jindial faan't 'gemiansoom mengde':

${\displaystyle A\mathrm{△}B:=\{x\mid (x\in A\wedge x\in ̸B)\vee (x\in B\wedge x\in ̸A)\}=(A\cup B)\setminus (A\cap B)=(A\setminus B)\cup (B\setminus A)}$

Potensmengde

At potensmengde ${\displaystyle 𝒫(A)}$ faan en mengde ${\displaystyle A}$ as det mengde faan aal a 'dialmengden' faan ${\displaystyle A}$.

${\displaystyle 𝒫(A):=\{X\mid X\subseteq A\}}$

Karteesisk produkt

At produktmengde faan ${\displaystyle A}$ an ${\displaystyle B}$ as det mengde faan aal a paaren mä det iarst element ütj ${\displaystyle A}$ an det ööder ütj ${\displaystyle B}$:.

${\displaystyle A\times B:=\{(a,b)\mid a\in A,b\in B\}}$

(1) För dialmengden ${\displaystyle A,B,C\subseteq X}$ täält: Jo san

• refleksiif: ${\displaystyle A\subseteq A}$
• antisümeetrisk: Ütj ${\displaystyle A\subseteq B}$ an ${\displaystyle B\subseteq A}$ fulegt ${\displaystyle A=B}$
• transitiif: Ütj ${\displaystyle A\subseteq B}$ an ${\displaystyle B\subseteq C}$ fulegt ${\displaystyle A\subseteq C}$

(2) A mengdenoperatsioonen ${\displaystyle \cap }$ an ${\displaystyle \cup }$ san komutatiif, asotsiatiif an distributiif:

• Asotsiatiifgesets:
  • ${\displaystyle (A\cup B)\cup C=A\cup (B\cup C)}$ an
  • ${\displaystyle (A\cap B)\cap C=A\cap (B\cap C)}$
• Komutatiifgesets:
  • ${\displaystyle A\cup B=B\cup A}$ an
  • ${\displaystyle A\cap B=B\cap A}$
• Distributiifgesets:
  • ${\displaystyle A\cup (B\cap C)=(A\cup B)\cap (A\cup C)}$ an
  • ${\displaystyle A\cap (B\cup C)=(A\cap B)\cup (A\cap C)}$
• De Morgan sin gesetsen:
  • ${\displaystyle {(A\cup B)}^{\complement }=A^{\complement }\cap B^{\complement }}$ an
  • ${\displaystyle {(A\cap B)}^{\complement }=A^{\complement }\cup B^{\complement }}$
• Absorptionsgesets:
  • ${\displaystyle A\cup (A\cap B)=A}$ an
  • ${\displaystyle A\cap (A\cup B)=A}$

(3) Gesetsen för diferensmengden:

• Asotsiatiifgesetsen:
  • ${\displaystyle (A\setminus B)\setminus C=A\setminus (B\cup C)}$ an
  • ${\displaystyle A\setminus (B\setminus C)=(A\setminus B)\cup (A\cap C)}$
• Distributiifgesetsen:
  • ${\displaystyle (A\cap B)\setminus C=(A\setminus C)\cap (B\setminus C)}$ an
  • ${\displaystyle (A\cup B)\setminus C=(A\setminus C)\cup (B\setminus C)}$ an
  • ${\displaystyle A\setminus (B\cap C)=(A\setminus B)\cup (A\setminus C)}$ an
  • ${\displaystyle A\setminus (B\cup C)=(A\setminus B)\cap (A\setminus C)}$

(4) Gesetsen för sümeetrisk diferensen:

• Asotsiatiifgesets: ${\displaystyle (A\mathrm{△}B)\mathrm{△}C=A\mathrm{△}(B\mathrm{△}C)}$
• Komutatiifgesets: ${\displaystyle A\mathrm{△}B=B\mathrm{△}A}$
• Distributiifgesets: ${\displaystyle (A\mathrm{△}B)\cap C=(A\cap C)\mathrm{△}(B\cap C)}$
• ${\displaystyle A\mathrm{△}\mathrm{\varnothing }=A}$an ${\displaystyle A\mathrm{△}A=\mathrm{\varnothing }}$

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