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lehrkraefte:blc:linalg20:start [2020/11/17 08:57] Ivo Blöchliger |
lehrkraefte:blc:linalg20:start [2020/11/17 08:58] (current) Ivo Blöchliger |
==== Matrix-Matrix Multiplikation ==== | ==== Matrix-Matrix Multiplikation ==== |
Berechnen Sie:<JS>miniAufgabe("#exomatrixmatrixmultiplikation3D","#solmatrixmatrixmultiplikation3D", | Berechnen Sie:<JS>miniAufgabe("#exomatrixmatrixmultiplikation3D","#solmatrixmatrixmultiplikation3D", |
[["$\\begin{pmatrix}-4 & -1\\\\\n-3 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n-6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-4 & -1\\\\\n-3 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n-6\\\\\n\\end{pmatrix} = \\begin{pmatrix}-18\\\\\n-18\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-2 & 1\\\\\n-6 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-2 & 1\\\\\n-6 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n2\\\\\n\\end{pmatrix} = \\begin{pmatrix}0\\\\\n-4\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}0 & 0\\\\\n-1 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}5\\\\\n-2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}0 & 0\\\\\n-1 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}5\\\\\n-2\\\\\n\\end{pmatrix} = \\begin{pmatrix}0\\\\\n-7\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & 5\\\\\n-3 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-4\\\\\n-4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & 5\\\\\n-3 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-4\\\\\n-4\\\\\n\\end{pmatrix} = \\begin{pmatrix}-28\\\\\n32\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}3 & 5\\\\\n0 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}3 & 5\\\\\n0 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n6\\\\\n\\end{pmatrix} = \\begin{pmatrix}33\\\\\n0\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}3 & 2\\\\\n-1 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}3 & 2\\\\\n-1 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n6\\\\\n\\end{pmatrix} = \\begin{pmatrix}6\\\\\n26\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}3 & -2\\\\\n4 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}3 & -2\\\\\n4 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n4\\\\\n\\end{pmatrix} = \\begin{pmatrix}10\\\\\n0\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}5 & -4\\\\\n-5 & 2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}5 & -4\\\\\n-5 & 2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n2\\\\\n\\end{pmatrix} = \\begin{pmatrix}-18\\\\\n14\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-1 & -4\\\\\n5 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n-4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-1 & -4\\\\\n5 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n-4\\\\\n\\end{pmatrix} = \\begin{pmatrix}18\\\\\n14\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}4 & 3\\\\\n5 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-5\\\\\n-3\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}4 & 3\\\\\n5 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-5\\\\\n-3\\\\\n\\end{pmatrix} = \\begin{pmatrix}-29\\\\\n-37\\\\\n\\end{pmatrix}$"]], | [["$\\begin{pmatrix}-2 & -4\\\\\n-6 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & -5\\\\\n1 & 3\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-2 & -4\\\\\n-6 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & -5\\\\\n1 & 3\\\\\n\\end{pmatrix} = \\begin{pmatrix}-8 & -2\\\\\n-12 & 30\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & -4\\\\\n0 & 2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-1 & 1\\\\\n-1 & -6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & -4\\\\\n0 & 2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-1 & 1\\\\\n-1 & -6\\\\\n\\end{pmatrix} = \\begin{pmatrix}2 & 26\\\\\n-2 & -12\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}6 & 3\\\\\n4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & 4\\\\\n-2 & -4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}6 & 3\\\\\n4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & 4\\\\\n-2 & -4\\\\\n\\end{pmatrix} = \\begin{pmatrix}6 & 12\\\\\n12 & 24\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}3 & 3\\\\\n5 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-1 & -6\\\\\n3 & -4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}3 & 3\\\\\n5 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-1 & -6\\\\\n3 & -4\\\\\n\\end{pmatrix} = \\begin{pmatrix}6 & -30\\\\\n-8 & -26\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-1 & -1\\\\\n4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & -4\\\\\n-3 & 1\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-1 & -1\\\\\n4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & -4\\\\\n-3 & 1\\\\\n\\end{pmatrix} = \\begin{pmatrix}-3 & 3\\\\\n30 & -18\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}0 & -1\\\\\n5 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-6 & 2\\\\\n-2 & 4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}0 & -1\\\\\n5 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-6 & 2\\\\\n-2 & 4\\\\\n\\end{pmatrix} = \\begin{pmatrix}2 & -4\\\\\n-20 & -10\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & 0\\\\\n2 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}4 & 3\\\\\n4 & 6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & 0\\\\\n2 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}4 & 3\\\\\n4 & 6\\\\\n\\end{pmatrix} = \\begin{pmatrix}8 & 6\\\\\n-16 & -30\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-1 & 5\\\\\n0 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & -4\\\\\n4 & 0\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-1 & 5\\\\\n0 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & -4\\\\\n4 & 0\\\\\n\\end{pmatrix} = \\begin{pmatrix}14 & 4\\\\\n-12 & 0\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-5 & 6\\\\\n-4 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & 5\\\\\n1 & -5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-5 & 6\\\\\n-4 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6 & 5\\\\\n1 & -5\\\\\n\\end{pmatrix} = \\begin{pmatrix}-24 & -55\\\\\n-30 & 10\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}4 & -6\\\\\n1 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-6 & 3\\\\\n0 & 4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}4 & -6\\\\\n1 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-6 & 3\\\\\n0 & 4\\\\\n\\end{pmatrix} = \\begin{pmatrix}-24 & -12\\\\\n-6 & -5\\\\\n\\end{pmatrix}$"]], |
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Berechnen Sie:<JS>miniAufgabe("#exomatrixmatrixmultiplikation4D","#solmatrixmatrixmultiplikation4D", | Berechnen Sie:<JS>miniAufgabe("#exomatrixmatrixmultiplikation4D","#solmatrixmatrixmultiplikation4D", |
[["$\\begin{pmatrix}1 & 0 & -4\\\\\n4 & 3 & 5\\\\\n3 & 0 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-4\\\\\n-3\\\\\n-6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}1 & 0 & -4\\\\\n4 & 3 & 5\\\\\n3 & 0 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-4\\\\\n-3\\\\\n-6\\\\\n\\end{pmatrix} = \\begin{pmatrix}20\\\\\n-55\\\\\n-18\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-3 & -5 & -3\\\\\n0 & -5 & 0\\\\\n2 & 5 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-3\\\\\n1\\\\\n4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-3 & -5 & -3\\\\\n0 & -5 & 0\\\\\n2 & 5 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-3\\\\\n1\\\\\n4\\\\\n\\end{pmatrix} = \\begin{pmatrix}-8\\\\\n-5\\\\\n-9\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & -6 & 1\\\\\n-3 & -1 & 4\\\\\n6 & -5 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0\\\\\n2\\\\\n-5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & -6 & 1\\\\\n-3 & -1 & 4\\\\\n6 & -5 & -6\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0\\\\\n2\\\\\n-5\\\\\n\\end{pmatrix} = \\begin{pmatrix}-17\\\\\n-22\\\\\n20\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}6 & 4 & 2\\\\\n-5 & -4 & 1\\\\\n0 & -6 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n4\\\\\n2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}6 & 4 & 2\\\\\n-5 & -4 & 1\\\\\n0 & -6 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2\\\\\n4\\\\\n2\\\\\n\\end{pmatrix} = \\begin{pmatrix}8\\\\\n-4\\\\\n-28\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-3 & -2 & 4\\\\\n-1 & 6 & -1\\\\\n6 & -4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-3\\\\\n5\\\\\n-2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-3 & -2 & 4\\\\\n-1 & 6 & -1\\\\\n6 & -4 & -2\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-3\\\\\n5\\\\\n-2\\\\\n\\end{pmatrix} = \\begin{pmatrix}-9\\\\\n35\\\\\n-34\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-3 & 2 & 3\\\\\n-2 & 3 & 6\\\\\n-2 & 3 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n2\\\\\n6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-3 & 2 & 3\\\\\n-2 & 3 & 6\\\\\n-2 & 3 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n2\\\\\n6\\\\\n\\end{pmatrix} = \\begin{pmatrix}4\\\\\n30\\\\\n-6\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-6 & -1 & 6\\\\\n-2 & 1 & 4\\\\\n2 & -6 & -4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n-2\\\\\n-5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-6 & -1 & 6\\\\\n-2 & 1 & 4\\\\\n2 & -6 & -4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n-2\\\\\n-5\\\\\n\\end{pmatrix} = \\begin{pmatrix}-34\\\\\n-24\\\\\n34\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & 6 & -3\\\\\n4 & 2 & -6\\\\\n-3 & -1 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2\\\\\n-3\\\\\n0\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & 6 & -3\\\\\n4 & 2 & -6\\\\\n-3 & -1 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2\\\\\n-3\\\\\n0\\\\\n\\end{pmatrix} = \\begin{pmatrix}-14\\\\\n2\\\\\n-3\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-1 & 6 & -6\\\\\n0 & -3 & 5\\\\\n6 & -6 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n6\\\\\n2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-1 & 6 & -6\\\\\n0 & -3 & 5\\\\\n6 & -6 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}6\\\\\n6\\\\\n2\\\\\n\\end{pmatrix} = \\begin{pmatrix}18\\\\\n-8\\\\\n-2\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-3 & -5 & 2\\\\\n-3 & -2 & -5\\\\\n-2 & -4 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n5\\\\\n4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-3 & -5 & 2\\\\\n-3 & -2 & -5\\\\\n-2 & -4 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1\\\\\n5\\\\\n4\\\\\n\\end{pmatrix} = \\begin{pmatrix}-20\\\\\n-33\\\\\n-34\\\\\n\\end{pmatrix}$"]], | [["$\\begin{pmatrix}2 & 3 & -4\\\\\n2 & 4 & 0\\\\\n0 & 0 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-5 & -4 & -5\\\\\n3 & -5 & 3\\\\\n-6 & 1 & -6\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & 3 & -4\\\\\n2 & 4 & 0\\\\\n0 & 0 & -1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-5 & -4 & -5\\\\\n3 & -5 & 3\\\\\n-6 & 1 & -6\\\\\n\\end{pmatrix} = \\begin{pmatrix}23 & -27 & 23\\\\\n2 & -28 & 2\\\\\n6 & -1 & 6\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-4 & 4 & -4\\\\\n-6 & 4 & 2\\\\\n2 & -1 & -4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0 & 6 & -2\\\\\n-3 & -1 & 2\\\\\n2 & 4 & -5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-4 & 4 & -4\\\\\n-6 & 4 & 2\\\\\n2 & -1 & -4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0 & 6 & -2\\\\\n-3 & -1 & 2\\\\\n2 & 4 & -5\\\\\n\\end{pmatrix} = \\begin{pmatrix}-20 & -44 & 36\\\\\n-8 & -32 & 10\\\\\n-5 & -3 & 14\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}3 & -6 & 6\\\\\n-6 & -1 & 0\\\\\n-5 & 6 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1 & 4 & -4\\\\\n-4 & 6 & -4\\\\\n-2 & 6 & -1\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}3 & -6 & 6\\\\\n-6 & -1 & 0\\\\\n-5 & 6 & 0\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1 & 4 & -4\\\\\n-4 & 6 & -4\\\\\n-2 & 6 & -1\\\\\n\\end{pmatrix} = \\begin{pmatrix}15 & 12 & 6\\\\\n-2 & -30 & 28\\\\\n-29 & 16 & -4\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}2 & -1 & -4\\\\\n-6 & 0 & 0\\\\\n-3 & 1 & 3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}5 & -5 & 4\\\\\n3 & -3 & 4\\\\\n2 & -4 & -2\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}2 & -1 & -4\\\\\n-6 & 0 & 0\\\\\n-3 & 1 & 3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}5 & -5 & 4\\\\\n3 & -3 & 4\\\\\n2 & -4 & -2\\\\\n\\end{pmatrix} = \\begin{pmatrix}-1 & 9 & 12\\\\\n-30 & 30 & -24\\\\\n-6 & 0 & -14\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}4 & 0 & 2\\\\\n2 & -4 & -1\\\\\n-1 & -2 & 5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}3 & 5 & 2\\\\\n5 & 3 & -3\\\\\n4 & 5 & 5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}4 & 0 & 2\\\\\n2 & -4 & -1\\\\\n-1 & -2 & 5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}3 & 5 & 2\\\\\n5 & 3 & -3\\\\\n4 & 5 & 5\\\\\n\\end{pmatrix} = \\begin{pmatrix}20 & 30 & 18\\\\\n-18 & -7 & 11\\\\\n7 & 14 & 29\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-4 & -3 & 5\\\\\n-4 & 5 & -2\\\\\n6 & 0 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1 & -1 & 3\\\\\n-4 & -3 & 4\\\\\n1 & -5 & 3\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-4 & -3 & 5\\\\\n-4 & 5 & -2\\\\\n6 & 0 & -5\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}1 & -1 & 3\\\\\n-4 & -3 & 4\\\\\n1 & -5 & 3\\\\\n\\end{pmatrix} = \\begin{pmatrix}13 & -12 & -9\\\\\n-26 & -1 & 2\\\\\n1 & 19 & 3\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-3 & 5 & -4\\\\\n0 & -3 & 4\\\\\n0 & -1 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0 & 2 & 3\\\\\n-2 & -4 & -2\\\\\n5 & 6 & -4\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-3 & 5 & -4\\\\\n0 & -3 & 4\\\\\n0 & -1 & -3\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}0 & 2 & 3\\\\\n-2 & -4 & -2\\\\\n5 & 6 & -4\\\\\n\\end{pmatrix} = \\begin{pmatrix}-30 & -50 & -3\\\\\n26 & 36 & -10\\\\\n-13 & -14 & 14\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-2 & 3 & 6\\\\\n4 & 2 & -6\\\\\n-1 & 2 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}3 & 6 & -6\\\\\n-4 & -6 & -2\\\\\n1 & -4 & -5\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-2 & 3 & 6\\\\\n4 & 2 & -6\\\\\n-1 & 2 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}3 & 6 & -6\\\\\n-4 & -6 & -2\\\\\n1 & -4 & -5\\\\\n\\end{pmatrix} = \\begin{pmatrix}-12 & -54 & -24\\\\\n-2 & 36 & 2\\\\\n-10 & -22 & -3\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}-6 & 5 & -1\\\\\n-1 & -4 & 4\\\\\n2 & -5 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2 & 1 & -3\\\\\n2 & 6 & 3\\\\\n5 & -3 & 1\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}-6 & 5 & -1\\\\\n-1 & -4 & 4\\\\\n2 & -5 & 4\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}-2 & 1 & -3\\\\\n2 & 6 & 3\\\\\n5 & -3 & 1\\\\\n\\end{pmatrix} = \\begin{pmatrix}17 & 27 & 32\\\\\n14 & -37 & -5\\\\\n6 & -40 & -17\\\\\n\\end{pmatrix}$"], ["$\\begin{pmatrix}4 & 5 & -4\\\\\n-3 & -3 & 2\\\\\n-5 & -3 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & 3 & -5\\\\\n-6 & -1 & -4\\\\\n6 & 5 & 3\\\\\n\\end{pmatrix}$", "$\\begin{pmatrix}4 & 5 & -4\\\\\n-3 & -3 & 2\\\\\n-5 & -3 & 1\\\\\n\\end{pmatrix} \\cdot \\begin{pmatrix}2 & 3 & -5\\\\\n-6 & -1 & -4\\\\\n6 & 5 & 3\\\\\n\\end{pmatrix} = \\begin{pmatrix}-46 & -13 & -52\\\\\n24 & 4 & 33\\\\\n14 & -7 & 40\\\\\n\\end{pmatrix}$"]], |
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