Berechne zuerst die Vektoren   $\overrightarrow{\mathrm{A}\mathrm{B}}\backslash overrightarrow\{\backslash mathrm\{AB\}\}$  und  $\overrightarrow{\mathrm{A}\mathrm{C}}\backslash overrightarrow\{\backslash mathrm\{AC\}\}$  .

Der Punkt  $\mathrm{D}\backslash mathrm\; D$  wird zur Berechnung des Flächeninhalts nicht benötigt und ist nur der Vollständigkeit halber angegeben.

$\overrightarrow{\mathrm{A}\mathrm{B}}=\overrightarrow{\mathrm{B}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}0\\ 6\\ 2\end{array}\right)-\left(\begin{array}{c}0\\ 0\\ 0\end{array}\right)=\left(\begin{array}{c}0\\ 6\\ 2\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AB\}\}=\backslash overrightarrow\{\backslash mathrm\; B\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}0\backslash \backslash 6\backslash \backslash 2\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}0\backslash \backslash 0\backslash \backslash 0\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}0\backslash \backslash 6\backslash \backslash 2\backslash end\{pmatrix\}$

$\overrightarrow{\mathrm{A}\mathrm{C}}=\overrightarrow{\mathrm{C}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}0\\ 2\\ 6\end{array}\right)-\left(\begin{array}{c}0\\ 0\\ 0\end{array}\right)=\left(\begin{array}{c}0\\ 2\\ 6\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AC\}\}=\backslash overrightarrow\{\backslash mathrm\; C\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}0\backslash \backslash 2\backslash \backslash 6\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}0\backslash \backslash 0\backslash \backslash 0\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}0\backslash \backslash 2\backslash \backslash 6\backslash end\{pmatrix\}$

Setze in die Formel für die Fläche eines Parallelogramms im Zweidimensionalen ein:   ${\mathrm{A}}_{\mathrm{P}\mathrm{a}\mathrm{r}\mathrm{a}\mathrm{l}\mathrm{l}\mathrm{e}\mathrm{l}\mathrm{o}\mathrm{g}\mathrm{r}\mathrm{a}\mathrm{m}\mathrm{m}}=\mid \overrightarrow{\mathrm{A}\mathrm{B}}\times \overrightarrow{\mathrm{A}\mathrm{C}}\mid \{\backslash mathrm\; A\}\_\backslash mathrm\{Parallelogramm\}=\backslash left|\backslash overrightarrow\{\backslash mathrm\{AB\}\}\backslash times\backslash overrightarrow\{\backslash mathrm\{AC\}\}\backslash right|$  .

$\mathrm{A}=\mid \left(\begin{array}{c}0\\ 6\\ 2\end{array}\right)\times \left(\begin{array}{c}0\\ 2\\ 6\end{array}\right)\mid \backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}0\backslash \backslash 6\backslash \backslash 2\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}0\backslash \backslash 2\backslash \backslash 6\backslash end\{pmatrix\}\backslash right|$

Berechne nun das Kreuzprodukt und danach den Betrag des Vektors.

$\mathrm{A}=\mid \left(\begin{array}{c}0\\ 6\\ 2\end{array}\right)\times \left(\begin{array}{c}0\\ 2\\ 6\end{array}\right)\mid \phantom{A}=\mid \left(\begin{array}{c}32\\ 0\\ 0\end{array}\right)\mid \phantom{A}=\sqrt{{32}^2+0^2+0^2}\phantom{A}=32\backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}0\backslash \backslash 6\backslash \backslash 2\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}0\backslash \backslash 2\backslash \backslash 6\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash left|\backslash begin\{pmatrix\}32\backslash \backslash 0\backslash \backslash 0\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{32^2+0^2+0^2\}\backslash \backslash \backslash phantom\{A\}=32$

Berechne zuerst die Vektoren   $\overrightarrow{\mathrm{A}\mathrm{B}}\backslash overrightarrow\{\backslash mathrm\{AB\}\}$  und  $\overrightarrow{\mathrm{A}\mathrm{C}}\backslash overrightarrow\{\backslash mathrm\{AC\}\}$  .

Der Punkt  $\mathrm{D}\backslash mathrm\; D$  wird zur Berechnung des Flächeninhalts nicht benötigt und ist nur der Vollständigkeit halber angegeben.

$\overrightarrow{\mathrm{A}\mathrm{B}}=\overrightarrow{\mathrm{B}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}1\\ -3\\ 0\end{array}\right)-\left(\begin{array}{c}4\\ -3\\ 3\end{array}\right)=\left(\begin{array}{c}-3\\ 0\\ -3\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AB\}\}=\backslash overrightarrow\{\backslash mathrm\; B\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}1\backslash \backslash -3\backslash \backslash 0\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}4\backslash \backslash -3\backslash \backslash 3\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}-3\backslash \backslash 0\backslash \backslash -3\backslash end\{pmatrix\}$

$\overrightarrow{\mathrm{A}\mathrm{C}}=\overrightarrow{\mathrm{C}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}5\\ -1\\ 5\end{array}\right)-\left(\begin{array}{c}4\\ -3\\ 3\end{array}\right)=\left(\begin{array}{c}1\\ 2\\ 2\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AC\}\}=\backslash overrightarrow\{\backslash mathrm\; C\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}5\backslash \backslash -1\backslash \backslash 5\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}4\backslash \backslash -3\backslash \backslash 3\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}1\backslash \backslash 2\backslash \backslash 2\backslash end\{pmatrix\}$

Setze in die Formel für die Fläche eines Parallelogramms im Zweidimensionalen ein:   ${\mathrm{A}}_{\mathrm{P}\mathrm{a}\mathrm{r}\mathrm{a}\mathrm{l}\mathrm{l}\mathrm{e}\mathrm{l}\mathrm{o}\mathrm{g}\mathrm{r}\mathrm{a}\mathrm{m}\mathrm{m}}=\mid \overrightarrow{\mathrm{A}\mathrm{B}}\times \overrightarrow{\mathrm{A}\mathrm{C}}\mid \{\backslash mathrm\; A\}\_\backslash mathrm\{Parallelogramm\}=\backslash left|\backslash overrightarrow\{\backslash mathrm\{AB\}\}\backslash times\backslash overrightarrow\{\backslash mathrm\{AC\}\}\backslash right|$ .

$\mathrm{A}=\mid \left(\begin{array}{c}-3\\ 0\\ -3\end{array}\right)\times \left(\begin{array}{c}1\\ 2\\ 2\end{array}\right)\mid \backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}-3\backslash \backslash 0\backslash \backslash -3\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}1\backslash \backslash 2\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|$

Berechne nun das Kreuzprodukt und danach den Betrag des Vektors.

$\mathrm{A}=\mid \left(\begin{array}{c}-3\\ 0\\ -3\end{array}\right)\times \left(\begin{array}{c}1\\ 2\\ 2\end{array}\right)\mid \phantom{A}=\mid \left(\begin{array}{c}-6\\ -3\\ 6\end{array}\right)\mid \phantom{A}=\sqrt{{(-6)}^2+{(-3)}^2+6^2}\phantom{A}=\sqrt{36+9+36}\phantom{A}=\sqrt{81}\phantom{A}=9\backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}-3\backslash \backslash 0\backslash \backslash -3\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}1\backslash \backslash 2\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash left|\backslash begin\{pmatrix\}-6\backslash \backslash -3\backslash \backslash 6\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{\backslash left(-6\backslash right)^2+\backslash left(-3\backslash right)^2+6^2\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{36+9+36\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{81\}\backslash \backslash \backslash phantom\{A\}=9$

Berechne zuerst die Vektoren   $\overrightarrow{\mathrm{A}\mathrm{B}}\backslash overrightarrow\{\backslash mathrm\{AB\}\}$  und  $\overrightarrow{\mathrm{A}\mathrm{C}}\backslash overrightarrow\{\backslash mathrm\{AC\}\}$  .

Der Punkt  $\mathrm{D}\backslash mathrm\; D$  wird zur Berechnung des Flächeninhalts nicht benötigt und ist nur der Vollständigkeit halber angegeben.

$\overrightarrow{\mathrm{A}\mathrm{B}}=\overrightarrow{\mathrm{B}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}0\\ 1\\ 1\end{array}\right)-\left(\begin{array}{c}2\\ -1\\ 2\end{array}\right)=\left(\begin{array}{c}-2\\ 2\\ -1\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AB\}\}=\backslash overrightarrow\{\backslash mathrm\; B\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}0\backslash \backslash 1\backslash \backslash 1\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}2\backslash \backslash -1\backslash \backslash 2\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}-2\backslash \backslash 2\backslash \backslash -1\backslash end\{pmatrix\}$

$\overrightarrow{\mathrm{A}\mathrm{C}}=\overrightarrow{\mathrm{C}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}2\\ 2\\ 4\end{array}\right)-\left(\begin{array}{c}2\\ -1\\ 2\end{array}\right)=\left(\begin{array}{c}0\\ 3\\ 2\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AC\}\}=\backslash overrightarrow\{\backslash mathrm\; C\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}2\backslash \backslash 2\backslash \backslash 4\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}2\backslash \backslash -1\backslash \backslash 2\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}0\backslash \backslash 3\backslash \backslash 2\backslash end\{pmatrix\}$

Setze in die Formel für die Fläche eines Parallelogramms im Zweidimensionalen ein:   ${\mathrm{A}}_{\mathrm{P}\mathrm{a}\mathrm{r}\mathrm{a}\mathrm{l}\mathrm{l}\mathrm{e}\mathrm{l}\mathrm{o}\mathrm{g}\mathrm{r}\mathrm{a}\mathrm{m}\mathrm{m}}=\mid \overrightarrow{\mathrm{A}\mathrm{B}}\times \overrightarrow{\mathrm{A}\mathrm{C}}\mid \{\backslash mathrm\; A\}\_\backslash mathrm\{Parallelogramm\}=\backslash left|\backslash overrightarrow\{\backslash mathrm\{AB\}\}\backslash times\backslash overrightarrow\{\backslash mathrm\{AC\}\}\backslash right|$  .

$\mathrm{A}=\mid \left(\begin{array}{c}-2\\ 2\\ -1\end{array}\right)\times \left(\begin{array}{c}0\\ 3\\ 2\end{array}\right)\mid \backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}-2\backslash \backslash 2\backslash \backslash -1\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}0\backslash \backslash 3\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|$

Berechne nun das Kreuzprodukt und danach den Betrag des Vektors.

$\mathrm{A}=\mid \left(\begin{array}{c}-2\\ 2\\ -1\end{array}\right)\times \left(\begin{array}{c}0\\ 3\\ 2\end{array}\right)\mid \phantom{A}=\mid \left(\begin{array}{c}7\\ 4\\ -6\end{array}\right)\mid \phantom{A}=\sqrt{7^2+4^2+{(-6)}^2}\phantom{A}=\sqrt{49+16+36}\phantom{A}=\sqrt{101}\phantom{A}\approx \mathrm{10,05}\backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}-2\backslash \backslash 2\backslash \backslash -1\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}0\backslash \backslash 3\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash left|\backslash begin\{pmatrix\}7\backslash \backslash 4\backslash \backslash -6\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{7^2+4^2+\backslash left(-6\backslash right)^2\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{49+16+36\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{101\}\backslash \backslash \backslash phantom\{A\}\backslash approx\; 10\{,\}05$

Berechne zuerst die Vektoren   $\overrightarrow{\mathrm{A}\mathrm{B}}\backslash overrightarrow\{\backslash mathrm\{AB\}\}$  und  $\overrightarrow{\mathrm{A}\mathrm{C}}\backslash overrightarrow\{\backslash mathrm\{AC\}\}$  .

Der Punkt  $\mathrm{D}\backslash mathrm\; D$  wird zur Berechnung des Flächeninhalts nicht benötigt und ist nur der Vollständigkeit halber angegeben.

$\overrightarrow{\mathrm{A}\mathrm{B}}=\overrightarrow{\mathrm{B}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}-1\\ 2\\ 6\end{array}\right)-\left(\begin{array}{c}-4\\ -2\\ 1\end{array}\right)=\left(\begin{array}{c}3\\ 4\\ 5\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AB\}\}=\backslash overrightarrow\{\backslash mathrm\; B\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}-1\backslash \backslash 2\backslash \backslash 6\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}-4\backslash \backslash -2\backslash \backslash 1\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}3\backslash \backslash 4\backslash \backslash 5\backslash end\{pmatrix\}$

$\overrightarrow{\mathrm{A}\mathrm{C}}=\overrightarrow{\mathrm{C}}-\overrightarrow{\mathrm{A}}=\left(\begin{array}{c}-6\\ -3\\ 3\end{array}\right)-\left(\begin{array}{c}-4\\ -2\\ 1\end{array}\right)=\left(\begin{array}{c}-2\\ -1\\ 2\end{array}\right)\backslash overrightarrow\{\backslash mathrm\{AC\}\}=\backslash overrightarrow\{\backslash mathrm\; C\}-\backslash overrightarrow\{\backslash mathrm\; A\}=\backslash begin\{pmatrix\}-6\backslash \backslash -3\backslash \backslash 3\backslash end\{pmatrix\}-\backslash begin\{pmatrix\}-4\backslash \backslash -2\backslash \backslash 1\backslash end\{pmatrix\}=\backslash begin\{pmatrix\}-2\backslash \backslash -1\backslash \backslash 2\backslash end\{pmatrix\}$

Setze in die Formel für die Fläche eines Parallelogramms im Zweidimensionalen ein:   ${\mathrm{A}}_{\mathrm{P}\mathrm{a}\mathrm{r}\mathrm{a}\mathrm{l}\mathrm{l}\mathrm{e}\mathrm{l}\mathrm{o}\mathrm{g}\mathrm{r}\mathrm{a}\mathrm{m}\mathrm{m}}=\mid \overrightarrow{\mathrm{A}\mathrm{B}}\times \overrightarrow{\mathrm{A}\mathrm{C}}\mid \{\backslash mathrm\; A\}\_\backslash mathrm\{Parallelogramm\}=\backslash left|\backslash overrightarrow\{\backslash mathrm\{AB\}\}\backslash times\backslash overrightarrow\{\backslash mathrm\{AC\}\}\backslash right|$  .

$\mathrm{A}=\mid \left(\begin{array}{c}3\\ 4\\ 5\end{array}\right)\times \left(\begin{array}{c}-2\\ -1\\ 2\end{array}\right)\mid \backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}3\backslash \backslash 4\backslash \backslash 5\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-2\backslash \backslash -1\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|$

Berechne nun das Kreuzprodukt und danach den Betrag des Vektors.

$\mathrm{A}=\mid \left(\begin{array}{c}3\\ 4\\ 5\end{array}\right)\times \left(\begin{array}{c}-2\\ -1\\ 2\end{array}\right)\mid \phantom{A}=\mid \left(\begin{array}{c}13\\ -16\\ 5\end{array}\right)\mid \phantom{A}=\sqrt{{13}^2+{(-16)}^2+5^2}\phantom{A}=\sqrt{169+256+25}\phantom{A}=\sqrt{450}\phantom{A}=15\sqrt{2}\phantom{A}=\mathrm{21,21}\backslash mathrm\; A=\backslash left|\backslash begin\{pmatrix\}3\backslash \backslash 4\backslash \backslash 5\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-2\backslash \backslash -1\backslash \backslash 2\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash left|\backslash begin\{pmatrix\}13\backslash \backslash -16\backslash \backslash 5\backslash end\{pmatrix\}\backslash right|\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{13^2+\backslash left(-16\backslash right)^2+5^2\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{169+256+25\}\backslash \backslash \backslash phantom\{A\}=\backslash sqrt\{450\}\backslash \backslash \backslash phantom\{A\}=15\backslash sqrt\{2\}\backslash \backslash \backslash phantom\{A\}=21\{,\}21$