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Are matrices associative? - Answers
Yes, matrices are associative with respect to addition and multiplication. This means that for any matrices A, B, and C of compatible dimensions, the equations ( (A + B) + C = A + (B + C) ) and ( (AB)C = A(BC) ) hold true. Associativity is a fundamental property that allows for the regrouping of matrices during operations without changing the result.
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Are matrices associative? - Answers
Yes, matrices are associative with respect to addition and multiplication. This means that for any matrices A, B, and C of compatible dimensions, the equations ( (A + B) + C = A + (B + C) ) and ( (AB)C = A(BC) ) hold true. Associativity is a fundamental property that allows for the regrouping of matrices during operations without changing the result.
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Are matrices associative? - Answers
Yes, matrices are associative with respect to addition and multiplication. This means that for any matrices A, B, and C of compatible dimensions, the equations ( (A + B) + C = A + (B + C) ) and ( (AB)C = A(BC) ) hold true. Associativity is a fundamental property that allows for the regrouping of matrices during operations without changing the result.
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- og:descriptionYes, matrices are associative with respect to addition and multiplication. This means that for any matrices A, B, and C of compatible dimensions, the equations ( (A + B) + C = A + (B + C) ) and ( (AB)C = A(BC) ) hold true. Associativity is a fundamental property that allows for the regrouping of matrices during operations without changing the result.
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