Онда (1) теңдеулер жүйесін матрицалық формада былай жазуға болады: (1.1)
А матрицасына детерминантын, ![](data:image/png;base64,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) транспонирленген матрицаны және кері ![](data:image/png;base64,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) матрицасын сәйкес қояйық. Егер болса, онда А матрицасы ерекше емес деп аталады, ал (1) жүйенің жалғыз шешімі бар болады:
Достарыңызбен бөлісу: |