向量组的线性相关性是线性代数中的重要概念,也是解决问题的重要的理论根据。
Linear relation of vector group is an important concept in linear algebra and is also an important theoretical foundation of solving problems.
利用向量组线性相关性的基本判别定理1和2,给出了判别两个向量组等价及其线性相关性的推论1和2及应用举例。
In this paper, two inferences and their applied examples about the equivalence and the linearly dependent of two vector groups by using its discriminating theorem 1, 2 are presented.
将行列式的值、矩阵的秩、齐次线性方程组的解等知识运用于向量组线性相关性判定,归纳出六种判定向量组线性相关性的方法。
The judging methods of the vectors group related dependence from determinant values, rank of matrix, solution of system of linear equations etc were studied.
将行列式的值、矩阵的秩、齐次线性方程组的解等知识运用于向量组线性相关性判定,归纳出六种判定向量组线性相关性的方法。
The judging methods of the vectors group related dependence from determinant values, rank of matrix, solution of system of linear equations etc were studied.
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