Die Addition und Subtraktion von Matrizen lässt sich durchführen, wenn die beiden Matrizen jeweils vom gleichen Typ sind. Etwas unmathematischer ausgedrückt müssen diese die selbe „Gestalt“ aufweisen. Man addiert oder subtrahiert jeweils die entsprechenden Komponenten der beiden Matrizen.[br][br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img]

Eine Matrix A wird mit einer reellen Zahl r (auch Skalar genannt) multipliziert, indem man jedes Element von A mit r multipliziert:[br][br][img]data:image/png;base64,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[/img][br]

Um zwei Matrizen miteinander multiplizieren zu können, muss die Spaltenzahl der ersten Matrix mit der Zeilenzahl der zweiten Matrix übereinstimmen. Wird eine Matrix mit einem Vektor multipliziert, muss folgerichtig die Spaltenzahl der Matrix mit der Zahl der Komponenten des Vektors übereinstimmen.[br][br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img][br]

Eine Matrix A wird mit einer reellen Zahl r (auch Skalar genannt) multipliziert, indem man jedes Element von A mit r multipliziert:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAU8AAAB9CAYAAAAiCOHgAAAabUlEQVR4Ae2djcsVxRfHf39Rb1CUGIRGESoWqfiCki8gIZFGihK9KZUmRqGWmZZkmZGpWVQmSqamFJaKlWZpamapvVrZ+/z4TJynufe5u3ffd3buGbjsvXt3d2a+58x3zpw5M/s/o0kRUAQUAUUgNQL/S32H3qAIKAKKgCJglDxVCRQBRUARyICAkmcG0PQWRUARUASUPFUHFAFFQBHIgICSZwbQ9BZFQBFQBJQ8VQcUAUVAEciAgJJnBtD0FkVAEVAElDxVBxQBRUARyICAkmcG0PQWRUARUASUPFUHFAFFQBHIgICSZwbQ9BZFQBFQBJQ8VQcUAUVAEciAgJJnBtD0FkVAEVAElDxVBxQBRUARyICAkmcG0PQWRUARUASUPFUHFAFFQBHIgICSZwbQ9BZFQBFQBJQ8VQcUAUVAEciAgJJnBtD0FkVAEVAElDxVBxQBRUARyICAkmcG0PQWRUARUASUPFUHFAFFQBHIgICSZwbQ9BZFQBFQBJQ8VQcUAUVAEciAgJJnBtD0FkVAEVAEepI8v//+ezNr1ixz1113mV9++SUILThw4IAZOXKkeeONN8w///wTRJ3SVuK3334zjzzyiJk0aZI5e/Zs2tv1+hoRkDY5f/78xrTJniNPEVJIxCk6v2fPHnP99df3JIEqcYoWNPdIh0fH1xQC7SnyxMqENKMsk19//dU8++yzZtiwYeaiiy4yl19+ubn99tsNpPT333/XopUnT540999/vxk4cKAt06BBg8xjjz1mTp061a88WJwbNmww11xzjS1zvwsCPfHXX3+ZpUuXWrl99tln/WqJ7N59910zefJkc9lll1kcR48ebV544QWDzHslnTt3zixZssSgQ+g3OoVuHTlyxJvRCvKj/SFP5Opz6hnylAaGwrz//vv9ZEKvN3XqVDN9+nRz7NgxS5b79u2zgqTBQapVCxPSvu6668xTTz1lh6Eff/yxmTZtWh+J8n97oowLFiyIJJL265v+WzqMK664wmzatKlfdcBj2bJlFo933nnH/PHHHwYSwW0DgSBvRiOhp88//9zcfPPN5sEHHzRffvml+eKLLyxxipEAdr64e5AT8sQQ8KVMnfSjZ8gTgUCCK1eu7CiQtWvX2v8XL17c53NBcMuXL7eNbPDgwebw4cOdMCzlHGQ+ceJEs2bNmpbynj9/3jZ4lP6mm24yJ06c6Jf/6dOnzahRo+x1XB9yokNBNnPnzjW///57v6oiM/6nYzx+/Hjf/x9++KG56qqrrGyRfcjpwoULZvbs2bZTdQ0A6WjFCt2/f78XMEi5kBvy9TX1BHkKmdCAfvjhh36ywF/GcB4l4vPWW2/1XUPvJ+f5XlXCOobssZQ3b97cki0dgZTpueeea/lPfkhn0U6+8n8IR+lIojoR6vjqq6/2YcUQFcuThCWGfxgcIRYIJtQkde00gvrkk0+smwccHnroocpHV1GYS5tlZOCrARA8eUovhuJAKJ2Sa2FijWCVSHLJ0yVV+b+so5tve+PGL8RwHoWH9CH/9iTWBuTri0XRXsY8v5EZHQMYxHUQroXJKEKGgUIo3O+Sap4y+XovHTH15DNu3LgWN8W3335rxowZY/+bMGFCR+OirnpJG4gaLdZVLsk3ePLELwghthOQACBHhnyQDL4gaWAcFy1aZBWr6mH7V199ZSc4cO63k7bb8OPqJcQRd43Uv2lHwQDXRlxYEjJEpsjWHdajF0IooQ/bsdzQASZAGam4Q3f8vRBqJ2KtWycYJU6ZMsWOEJC3bylo8mR2fcaMGZY8O02udBOGDB1QLJ9m/2RIT7mYTIpKkMU999xjh/9RVnfUvT6fp/EvXLjQNvgsrhQZjYBfVORF3vozKUPDJw+OR48eNR988IG55ZZb+s4xMVl3kk6IchZtgdNxvf3223Z2H+LGEIGsX3zxRTtyknNxsdbELVM2JkFd0q8bN/IPmjx37txpiQMCjRNQJ0GcOXOmb0b23nvvTX1/p2cWcc4lDnx23XrkPBgUUd4yniGTQAw3kVOahIuDYT5uHHyl3fBL82y5lk6LCazVq1fbECka/4ABA2x+jAZ27dplZ/+LJivJP80Rq5vyMTrLYmDE5cVkJq4AFnDICI4wOiIdCLVbsWKFnVVvH1m5z0S+yLnqkZ9bhqjvwZKn+PxQDHqvpGnr1q1WmbiPDxbOjz/+mPT20q+T2WUaP1aXuBiiMpahD9dDpE1PdB7EKiIb14fZrV64QSBLkSuNGt9xN/y6PbfT/0zC0OAhD3EP4HvmOxbpjTfeaMtRN3mWPbLCRcDIhw5LyFMsfQhTZBFHnshHIl5oiz5Zn8GSp/j7WLL4zTffdNLx2HMI7dNPPzVjx461M94vvfRS7YKT2WWIcNWqVYnLgxKjqCiy6/eLBcDTPyEkgqixYCCpLIkOhZllcASTJHGerg96+/btsdmCt/iZcau42DMCIm8WX9Q5bIeEGApTtjQreg4dOmSGDh1qP3yPSj///LOtIx38Tz/9ZEPFyEsMGSx+ol8effTRrqM6iQhA7p1C86LKUPb5IMnT7a3yhl8ICSN4gq3r6vnIF78rfiIUMs2KJ1G+JMP8shUu7/PFBwb50ECzJrHIkSs+SWad4xKYcy0fIcao6xn1yIdruWfdunVRl1d+nvZBfQhEf+KJJ1J1qJCd4MD3qEQeyAe9Fb8qESKdVoBFPUPOCxGTL+X2JQVJnt99950ZP368FXLckCCJENxQjrp6PlF2rK1t27alHmq6PX+TZ5ZdV0zcRFkSuYKpDCVplGIRRd3rWp5JfYMyRMefiN/Pl0T50SV0Ia0xIJZnGn+xDNGxNNHFLEks+CzzF1nyS3JPkOQps9H4llDgbgmCnDNnjvWJEZBOw5LkhnLQyHh2lcklTiYa3LK9/vrrhhVRf/75Z9ciifJ1s5q6PqjGC8SCSUpGEAND6CFDhtjdltonDZNaUVmrLHqY1XWUNd+4+4Q4169f3zJ6YYSFCyOPNd8pX/SVvRhoO3lGgXQ+yN2n0VOQ5ClEkXRo5w7J4oKI6xAcyk6+7cSJUmI5MXmSJMmqpDrqkKR8Sa4RCyYpGQnZ0nDbOz7BT/4rYzgoelj3xJBgy5B5+PDhpp04+R+3QtSCC7k/y9Ed9eQZBTJvgdyRVxmyylK34MjT9Y+gvEmS+DWZEWU5n2vdyX8IjR407TAnSf5R16DsuAqwLnfv3t3yISqAjR6SKhKB4lhg1COPEkeVtezz4I7lQvmTkpH4NZkYInTItTzlP57HzHvakKdu9XVdDFi/dSfZ7g3rkh2mXH2iY5XJm6LLKR1Yngk+yuQuoU4q/6Lr0v684MhThJWGJGiYTAZde+21NoAXnykTMqxKYbadZ9ErJ5mVbQc4629RdvKO+yR1I7gWAJ2A20FkLWOV97l+7KSdIuXDckeu8+bNsyuNkDVEyW9wxXd38ODBwqvik7+TTsPduyFKn5J2xGnAktFCHn+n5CeWPPMZ6EPdKTjylOFp2p4OMmFfQyyUG264wTYslkbOnDnT7N27t8U/VIXQUOQoJZfzaWYvXcstqTujinomzUMiBqh72tVSdHrPPPOMYQ9PrFAiFljpA8Zl7efJiIV8sgTyJ8Uk6XV0sKIzcUc6mqITs/nkWUSMZta2XXSd5HnBkaf0Tkn9YgJELxwl3jPpRJpPmIgFk7ZTrKsOdFbMTFc5WqmrrnH5EpvMwo4i4ovdDtQH11NQ5Ml2Y/hD6OmaaF3FKWER/0nPnXS2uog8i3qGdopFIdnc57iTRmlcN2XVOCjydP16ZcwcliWEqp7LxhQMW+lcfOi5k9bb7RSZ3GGyR1PvIYDckT/668OkUVDk6Qa0x61+6D21+7fG7mSaTyteuskDvyS+ZxpNk+NUu9VT/49HwI1gQB/K8lfHl+K/f4MiT5ccfAgP+Q9mP765w54mdS7uQoU8gdZ+SEFLkRUBd9KzPR476zPz3BcUebrD0jLCLvIA7cO9Lgk1ya3hxqg2ifR9kHloZZBVYcQsoxd1psLIk1CfvBuf5gXCDckg2F1TKwKuz6hJw193RJF0RVVrzfVXKAjIdoQ+rJQrjDyL2Pg0r4BlNhnfWNLg8bx5Nul+12fUpGgEN0RFRxRN0rjiyyrxzz6ErBVGnvgYWfqVZ+PTvFALsEqenZF0yTOLz4hVTzLbCcZZPqIjnUvY+aw7olDy7IxRr5z1qY0XQp6ynpyKueFCss0Xwy5ZO+uuL24XOEN/3m/CygyGlWlfOeoTsO118+F3XvKsqw5KnnUh71++PrXxQsgT0oNAmQ0T/1SapYMiIndCI4v16BOwUiefjkqePklDy5IFAZ/aeCHk6YIgy+iybATgWp5ZXrrmE7AuJr58V/L0RRJajqwI+NTGCyVPyK+IjU9DADZrHcq8T8mzTHT12VUgECx5uv7OOpb/+QRsFYqUNo+85KkTRmkR1+uLRsCnNl6o5Sn+zrrCCNyJhTK21ypaEap+XlOXOYpe4Qdv0rLSquXbC/khf/QgLs6THZwYAfOCO45F7OjUCdtCyTOPv7NT4dKec8mTHkpTKwLuhFxTg+R1hVGrTHvtl6wwiiNPt7ONuy4vdoWSZ5Ebn2apGK+tYJafnknJsz+CLnny/iN81E1IuuFLE6RUTRmFPNlkGr3olFzLs8zXhRdKnkVufNoJlG7nylgDzds02cYNq7bqxCayDzzwgGFXcnmrIa8HOXfunN1Sjk0y0sTCuj1yk5Y5lrGslBVxvIKjVyxZXp3Mq0d4fxF40nHy4Tvn+I9rfE6uz96HrQkLJc+6gS/aspIGliXmtAgsXDcEZXA/LCTYtGlTKuuxqZa522iK2IoMy4TXrYBnr5Cn23G6esR3jIMyLbQi2gLP8M1nHxR5uo0sr0+PgP8FCxb0EVYdlmcUeU6ZMsW+tCztsNt9Xh31ydOIZLiWZVlpe77sgSCbQvc6efIG1h07dlT+jq52mST57RpHPsgtKPJEAEU1MreB0TvXQTbkiQ93y5Yt9lWx/OatgWlJUxRTwjzKdKJLXkUfiyr76dOnzahRo/o6RR8aYdFYdXqeWJ6vvPKK1aX33nvPfP31140gTamP1IH26MOcRnDkyVZ0gJuHIGhgOKRpWDynTvLMUw9ROjlKx+KDv0jKlPTo7tWatSOT0cSsWbPMbbfdZuXaa+SZFbukcirzOspOW2TUgD7UnYIjzwMHDhhecAbIWWI9aWDEht199912aBwKebouDR/e/5JW8eU96Mg1a6znrl27zIgRI+zbHHHr8Cwlz7SSqO96GX348vbX4MjTDWvJ8ioOaWBHjx7t2+SERlZHj02eDNs3btxo7rjjDrvb1MCBA+3Lr06ePJlKi/PikiqzEi52JwuyvIrjzJkzZuLEiXaSze1IyiJPyB7fNLrDEX3CWuJ98XLu2LFjJSDV+ZEy5KXjofNEj5h0RK+I6sjqCuqc279neWZRG6TzLMLrwM6XvWiDI0/3TYtpLSyWH6Lo9HAISxSuTvIk70GDBpmtW7faXatOnTplJk2aZM+lsazFIm/ia4elgcrrh9NuOsNoYunSpYZXj7AlYtnkKbP5q1evtmFAyHDAgAE2NIqwMzroYcOGVfoGSNFlCJNtH9l3lzClOXPmWBJNG7khMok7FrlBurv024fXDlPv4MiTSol5P378eDvBEidg+Y8GRriGNDDOi8LVSZ74d5i8ctO2bdtsD4wlBeEnSVkwSfLcKq/BEgePtH5g7hs5cqQhVItUNnmy8z0+c8iDDg79wdLju+t+SNu558FadHnNmjUtVubBgwcNy6nTYpqkLEVukC7lR/51jAI71TdI8swC9P79+61lcOTIkT6c5Dl1kSdDVRoixO4mdzGAbDjt/t/+3bXG8eeWMURrz7OM30Qa0CEiDzqDJAnrCkt1/fr1ffXOQp4EkE+ePNla/Nu3b4/NGtKQUDmxltlBH4sUyxe3A0PPKoft5I0uYXG6CXzk7QDLly/vw8i9xv1+6NAhM3ToUPvhe1QqaoN0eb4s/U5jEMm9ZR2DJE8UBWWlkSUx8Ts1MACvmzyjhO7GuyWxXuSVwz712lF1izsP6dPAkWuSenP9ypUrDbPr7hsMspCnWO7kLcQYVVaeLx+ZmMo6yRWVR1HnXSySuEMkYgMc4vzFYF/EBunUE+OBDoc8fer8gyRPAMciA+xuCoGQGcpwHcMsiEk++/bt61srj+Ob87JMsijlzfIclzy71Y/ny4vx8OfSUTQ54TPEb5tkxpWJEHyLLD8UmXIkFI2JEvRj/vz59j9wYelrVHItz6S+Zhmi++xndskzCaZiebK0FeMiSRKrMYmudnqedP7giPx9ScGSJ7Or+J26Ae4qD42p2yeuty1SqMyO33rrrXaY2L43qkue3VbcuFb42rVriyxiLc/CgpwxY4aVUzeXhWstdpNrNxyzVFZ8tPhbIYC6Ejp+33332YkhXAquG8jV/zL8nhgnWIvgnyVKAszEEELu7giiLjwl32DJU4ZsCG3hwoUtCiOV73ZE+aXRVe2kdvNmEsv1Vbnk2f5fe53E9YAFhmUdQpLNWrI2Jhe/MjtD8XcmcTGUKRfRAXS5fYGES57t/xVRJneWvN0ISPJ8t3zdOsskzyvymmDJE5AgC4YXWYnDJbCqyZOyU26G2h999FGLzOU95p1m4t0L6UDER5hkMsC91+fv4qPuNqqIqkMV5Ok2+izxxlFlz3IevNAj1rETJoVeSJIhMcTaPhMv1+Q5CnFn3SBd3DQ+upyCJk/X+mTiwFWaOIXAr0kDw8IRy5PvnKvK50lZ33zzTTNt2jSzc+dOu3ch+eNvI9Aa4ly1alWsRS3ruOlAQrE6RW5ifbI7Eq6JJImoAzAkZAkiQbbcj4ukm88zyfPda3zzd0qAPtYb4W3ggE94+vTpFgd8v2UMifP4O3EvsDkPuo68fUtBkydg4/tkOJKGQNwZRSFPOZY5zOukHExU8CZRgpspAwHzNHhCquI6A/7DkuCeMiyKTmWt8hwNnVl04icJM0uS3JGEyFOORfs8sZiQGX53dNCHBGEuXrzYYka9we7OO+80e/fujZ0sy1P2PBukQ+6DBw+2BJ9m39o85U1zb/DkCRgMVRjisQGw6yxPA1TTrpXhEpaFj4pXBJ50IExydAsdKiKvtM9Az5iZhrB6OWXdIF3cHpAnJOpj6gnyRJGZ8aOnrdp3WYfQGcZinfqseEXggnVN8DvDOpYXagoHAXHL+Dxq6gnyRKXw87AmHMczPq6QE4rHmwMJ1Ykb2oeAAcN3Ig6YXGPzDU3NR0Amet2l0j7WqmfIE/CZKKCRsUlEqMP3Xqhje0OSjtH3xtZebv3dHwHpDDF0ku7b0P8p1ZzpKfIEUmarCZsI0SrrZRLpxU6jGoqoLhcMGgwbDBzk6XvqOfJkGMsEEhMNSZfZ+S5Eyic9NjPQvTpJcfjwYTN8+PAgO8Ym6GCeMtIuMWiQH9snNiH1HHkiFAS1e/duO0sbiv/ztddes68prioO1VflhkBZeaT+T18l1LlcyAu5Ib+mpJ4kz6YIR8upCCgC/iLQSPI8fvy43ZswbhccfyH3t2SsQya4211H729ptWSKQL0INJI8CXYn6B3fpaZiEBCf6ZAhQwybLWtSBBSBeAQaSZ74R5iR49MkH0m8KOr7V2Y5WbLHWuJQw7jqQ1hzDhGBRpIngmBFCStLmDVv3ykmREGVVSde9cF6fbBsQmxdWTjocxWBtAg0ljxda4mGz3vW8YWGvqImrYCjrgc/dpjnfTRYnE2JrYuqj55XBKpGoLHkCVAQANuyQZ6yOw7btbF/IkG2vR624yoTWPECNbYmY6cb3gcvmLHjlLo/XLT0uyLQHYFGkyfVY8YdC4rhu5BB+/HSSy81V155ZWEf1o2TH1uOQdaPP/643UEn7ew/s9q8X4fXE7C/JJ1AGWW9+OKLI7FhSzJftkzrrq56hSLgDwKNJ0+B8ty5c3bnJNn3sp1Ai/7diawhwB07dnTdG5EVQE8++WTfvopFly3J85KWVfDVoyKgCLQiEAx5SrUIuRFrLgmJZL2mE3nKs6KsuSRWsjyjjOPEiRPNihUr7EbKaa1kwVePioAi8C8CwZFnlYIVPyJ7hPKSOXZ5F9Jr9yNG+Wdffvll658lQF0nu6qUnualCORDQMkzH34td0OQnWawOc9uMRArfs158+aZU6dOtdyrPxQBRaBZCCh5liAvZvmZBIIsiZ18/vnnLWky1MdKVQuzBND1kYpAxQgoeZYEONbmsmXL7Oz51VdfbeMpm7BHYUlw6GMVgeAQUPIsUaRMXo0YMcJccskldq/CErPSRysCikDFCCh5lgw4b/7buHGjYRmkJkVAEQgHASXPcGSpNVEEFIEKEVDyrBBszUoRUATCQUDJMxxZak0UAUWgQgSUPCsC+8KFC3bnp0WLFmmoUkWYazaKQJkIKHmWia7zbILnCZCfPXu2gUg1KQKKQLMRUPKsQH7sWjRhwgQbND9z5kydea8Ac81CESgbASXPkhFmNdHTTz9td1EaPXq0GTNmjAnldcclQ6ePVwS8RkDJs2TxEOc5d+5cc+LECTNu3Dglz5Lx1scrAlUhoORZItL4NufPn283SuY7/k52cNdlmiWCro9WBCpCQMmzRKA3b95sXwnC3plCnoMHD9ZXXpSIuT5aEagKASXPkpCWSaLhw4ebsWPH2o/s97lnz56SctXHKgKKQFUIKHmWgDQ7KvGajW3btrXEdC5ZssTOuLPTvSZFQBFoNgJKniXIb//+/WbWrFnm/PnzLU/fsGGDJc9169a1nNcfioAi0DwElDwLltnZs2ftBshbtmzp92QhT6xSTYqAItBsBJQ8C5IfrxF++OGH+96IyVs8WVVE4s2e06dPb/lv6tSp5uTJkwXlro9RBBSBqhFQ8qwacc1PEVAEgkBAyTMIMWolFAFFoGoElDyrRlzzUwQUgSAQUPIMQoxaCUVAEagaASXPqhHX/BQBRSAIBJQ8gxCjVkIRUASqRkDJs2rENT9FQBEIAgElzyDEqJVQBBSBqhH4P2mEmfHlScFJAAAAAElFTkSuQmCC[/img]

Die Addition und Subtraktion von Matrizen lässt sich durchführen, wenn die beiden Matrizen jeweils vom gleichen Typ sind. Etwas unmathematischer ausgedrückt müssen diese die selbe „Gestalt“ aufweisen. Man addiert oder subtrahiert jeweils die entsprechenden Komponenten der beiden Matrizen.[br][br]Gegeben sind die Matrizen A und B[br][br][img]data:image/png;base64,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[/img][br]Es folgt:[br][br][br]Die Addition von Matrizen ist – ebenso wie eine normale Addition – kommutativ, d.h. die Reihenfolge der Matrizen ist beliebig: A+B=B+A. Subtraktion ist analog!

Damit eine solche Matrix-Vektor-Multiplikation durchgeführt werden kann, muss die Spaltenzahl der Matrix mit der Zahl der Komponenten des Vektors übereinstimmen.[br]Gegeben sei die reelle Matrix und der reelle (Spalten-)Vektor:[br][br][img]data:image/png;base64,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[/img][br][br]Um das erste Element des Ergebnisvektors zu berechnen, betrachtet man die erste Zeile von A, multipliziert die jeweils entsprechenden Einträge dieser Zeile mit denen des Ausgangsvektors und summiert die Ergebnisse auf (die Sternchen stehen für noch nicht berechnete Elemente):[br][br][img]data:image/png;base64,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[/img][br]Für das zweite Element des Ergebnisvektors betrachtet man entsprechend die zweite Zeile von A und berechnet analog:[br][br][img]data:image/png;base64,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[/img]

Um zwei Matrizen miteinander multiplizieren zu können, muss die Spaltenzahl der ersten Matrix mit der Zeilenzahl der zweiten Matrix übereinstimmen. Gegeben seien die beiden reellen Matrizen:[br][br][img]data:image/png;base64,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[/img][br][br]Da die Matrix A ebenso viele Spalten wie die Matrix B Zeilen besitzt, ist die Matrizenmultiplikation A⋅B durchführbar. Nachdem A zwei Zeilen und B zwei Spalten hat, wird das Matrizenprodukt ebenfalls zwei Zeilen und Spalten aufweisen. Zur Berechnung des ersten Matrixelements der Ergebnismatrix werden die Produkte der entsprechenden Einträge der ersten Zeile von A und der ersten Spalte von B aufsummiert (die Sternchen stehen für noch nicht berechnete Elemente):[br][br][img]data:image/png;base64,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[/img][br][br]Für das nächste Element der Ergebnismatrix in der ersten Zeile und zweiten Spalte wird entsprechend die erste Zeile von A und die zweite Spalte von B verwendet:[br][br][img]data:image/png;base64,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[/img][br]Dieses Rechenschema setzt sich nun in der zweiten Zeile und ersten Spalte 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[/img][br][br]Es wiederholt sich bei dem letzten Element in der zweiten Zeile und zweiten 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[/img][br][br]Das Ergebnis ist das Matrizenprodukt A⋅B.[br]