$\left(\begin{array}{c}2\\ -1\\ 5\end{array}\right)\times \left(\begin{array}{c}6\\ 7\\ 2\end{array}\right)=\backslash begin\{pmatrix\}2\backslash \backslash -1\backslash \backslash 5\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}6\backslash \backslash 7\backslash \backslash 2\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}(-1)\cdot 2-5\cdot 7\\ 5\cdot 6-2\cdot 2\\ 2\cdot 7-(-1)\cdot 6\end{array}\right)==\backslash begin\{pmatrix\}\backslash left(-1\backslash right)\backslash cdot2\backslash ;-\backslash ;5\backslash cdot7\backslash \backslash 5\backslash cdot6\backslash ;-\backslash ;2\backslash cdot2\backslash \backslash 2\backslash cdot7\backslash ;-\backslash ;\backslash left(-1\backslash right)\backslash cdot6\backslash end\{pmatrix\}=$

Berechne das Kreuzprodukt der beiden Vektoren mit der Formel für das Kreuzprodukt.

$\left(\begin{array}{c}12\\ 3\\ 4\end{array}\right)\times \left(\begin{array}{c}6\\ 0\\ -8\end{array}\right)=\backslash begin\{pmatrix\}12\backslash \backslash 3\backslash \backslash 4\; \backslash end\{pmatrix\}\; \backslash times\; \backslash begin\{pmatrix\}6\backslash \backslash 0\backslash \backslash -8\; \backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}3\cdot (-8)-4\cdot 0\\ 4\cdot 6-12\cdot (-8)\\ 12\cdot 0-3\cdot 6\end{array}\right)==\backslash begin\{pmatrix\}3\backslash cdot\; (-8)-4\backslash cdot0\backslash \backslash 4\backslash cdot\; 6\; -\; 12\backslash cdot\; (-8)\backslash \backslash \; 12\backslash cdot\; 0\; -\; 3\backslash cdot\; 6\; \backslash end\{pmatrix\}=$

$\left(\begin{array}{c}4\\ 3\\ -2\end{array}\right)\times \left(\begin{array}{c}-8\\ -6\\ 4\end{array}\right)\backslash begin\{pmatrix\}4\backslash \backslash 3\backslash \backslash -2\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-8\backslash \backslash -6\backslash \backslash 4\backslash end\{pmatrix\}$

$=\left(\begin{array}{c}3\cdot 4-(-2)\cdot (-6)\\ (-2)\cdot (-8)-4\cdot 4\\ 4\cdot (-6)-3\cdot (-8)\end{array}\right)==\backslash begin\{pmatrix\}3\backslash cdot\; 4-(-2)\backslash cdot(-6)\backslash \backslash (-2)\backslash cdot(-8)-4\backslash cdot\; 4\backslash \backslash 4\backslash cdot\; (-6)-3\backslash cdot(-8)\backslash end\{pmatrix\}=$

$\left(\begin{array}{c}1\\ -2\\ -4\end{array}\right)\times \left(\begin{array}{c}-3\\ 3\\ -1\end{array}\right)=\backslash begin\{pmatrix\}1\backslash \backslash -2\backslash \backslash -4\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-3\backslash \backslash 3\backslash \backslash -1\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}(-2)\cdot (-1)-(-4)\cdot 3\\ (-4)\cdot (-3)-1\cdot (-1)\\ 1\cdot 3-(-2)\cdot (-3)\end{array}\right)==\backslash begin\{pmatrix\}(-2)\backslash cdot\; (-1)\; -\; (-4)\backslash cdot\; 3\backslash \backslash (-4)\backslash cdot(-3)\; -\; 1\backslash cdot\; (-1)\backslash \backslash 1\backslash cdot\; 3\; -\; (-2)\backslash cdot\; (-3)\backslash end\{pmatrix\}=$

Berechne das Kreuzprodukt mit der zugehörigen Formel.

$\left(\begin{array}{c}3\\ -4\\ 0\end{array}\right)\times \left(\begin{array}{c}8\\ 1\\ 12\end{array}\right)=\backslash begin\{pmatrix\}3\backslash \backslash -4\backslash \backslash 0\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}8\backslash \backslash 1\backslash \backslash 12\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}(-4)\cdot 12-0\cdot 1\\ 0\cdot 8-3\cdot 12\\ 3\cdot 1-(-4)\cdot 8\end{array}\right)==\backslash begin\{pmatrix\}(-4)\backslash cdot\; 12\; -\; 0\backslash cdot\; 1\backslash \backslash 0\; \backslash cdot\; 8\; -\; 3\; \backslash cdot\; 12\backslash \backslash 3\backslash cdot\; 1\; -\; (-4)\backslash cdot\; 8\; \backslash end\{pmatrix\}=$

Berechne das Kreuzprodukt mit der zugehörigen Formel.

$\left(\begin{array}{c}1\\ 0\\ -1\end{array}\right)\times \left(\begin{array}{c}0\\ 0\\ -3\end{array}\right)=\backslash begin\{pmatrix\}1\backslash \backslash 0\backslash \backslash -1\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}0\backslash \backslash 0\backslash \backslash -3\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}0\cdot (-3)-(-1)\cdot 0\\ (-1)\cdot 0-1\cdot (-3)\\ 1\cdot 0-0\cdot 0\end{array}\right)==\backslash begin\{pmatrix\}0\; \backslash cdot\; (-3)\; -\; (-1)\backslash cdot\; 0\; \backslash \backslash \; (-1)\backslash cdot\; 0\; -\; 1\; \backslash cdot\; (-3)\; \backslash \backslash \; 1\backslash cdot\; 0\; -\; 0\backslash cdot\; 0\; \backslash end\{pmatrix\}=$

Berechne das Kreuzprodukt mit der zugehörigen Formel.

$\left(\begin{array}{c}5\\ -1\\ 9\end{array}\right)\times \left(\begin{array}{c}-10\\ 2\\ -18\end{array}\right)=\backslash begin\{pmatrix\}5\backslash \backslash -1\backslash \backslash 9\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-10\backslash \backslash 2\backslash \backslash -18\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}(-1)\cdot (-18)-9\cdot 2\\ 9\cdot (-10)-5\cdot (-18)\\ 5\cdot 2-(-1)\cdot (-10)\end{array}\right)==\backslash begin\{pmatrix\}(-1)\backslash cdot(-18)-9\backslash cdot\; 2\backslash \backslash 9\backslash cdot\; (-10)\; -\; 5\; \backslash cdot\; (-18)\backslash \backslash 5\; \backslash cdot\; 2\; -\; (-1)\; \backslash cdot\; (-10)\; \backslash end\{pmatrix\}=$

$\left(\begin{array}{c}-5\\ 3\\ 9\end{array}\right)\times \left(\begin{array}{c}2\\ 8\\ -1\end{array}\right)=\backslash begin\{pmatrix\}-5\backslash \backslash 3\backslash \backslash 9\; \backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}2\backslash \backslash 8\backslash \backslash -1\; \backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}3\cdot (-1)-9\cdot 8\\ 9\cdot 2-(-5)\cdot (-1)\\ (-5)\cdot 8-3\cdot 2\end{array}\right)==\backslash begin\{pmatrix\}3\backslash cdot\; (-1)\; -\; 9\backslash cdot\; 8\; \backslash \backslash \; 9\; \backslash cdot\; 2\; -\; (-5)\backslash cdot\; (-1)\; \backslash \backslash \; (-5)\; \backslash cdot\; 8\; -\; 3\; \backslash cdot\; 2\; \backslash end\{pmatrix\}=$

Das Kreuzprodukt zweier Vektoren ist ein Vektor, der senkrecht zu den zwei Vektoren ist.Berechne also das Kreuzprodukt der gegebenen Vektoren mit der zugehörigen Formel.

$\left(\begin{array}{c}-2\\ 3\\ 1\end{array}\right)\times \left(\begin{array}{c}-1\\ 1\\ -2\end{array}\right)=\backslash begin\{pmatrix\}-2\backslash \backslash 3\backslash \backslash 1\backslash end\{pmatrix\}\backslash times\backslash begin\{pmatrix\}-1\backslash \backslash 1\backslash \backslash -2\backslash end\{pmatrix\}=$

$=\left(\begin{array}{c}3\cdot (-2)-1\cdot 1\\ 1\cdot (-1)-(-2)\cdot (-2)\\ (-2)\cdot 1-3\cdot (-1)\end{array}\right)==\backslash begin\{pmatrix\}3\backslash cdot\backslash left(-2\backslash right)\backslash ;-\backslash ;1\backslash cdot1\backslash \backslash 1\backslash cdot\backslash left(-1\backslash right)\backslash ;-\backslash ;\backslash left(-2\backslash right)\backslash cdot\backslash left(-2\backslash right)\backslash \backslash \backslash left(-2\backslash right)\backslash cdot1\backslash ;-\backslash ;3\backslash cdot\backslash left(-1\backslash right)\backslash end\{pmatrix\}=$