| 惯性定律的新证法 |
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| 引用本文: | 沈景清.惯性定律的新证法[J].大学数学,2000(6). |
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| 作者姓名: | 沈景清 |
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| 作者单位: | 通化师范学院数学系!吉林通化134002 |
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| 摘 要: | 本文从实对称矩阵的角度 ,给出了惯性定律的一种新证法 .这种证法可使我们从已给的一个实二次型 f( x1 ,x2 ,… ,xn) =∑ni,j=1aijxixj 的矩阵 A=( aij) n× n的诸元素 ,来直接研究这个二次型的性质的这一体系更加完整 .同时 ,本文还大大地改进了雅可比方法 ,使雅可比的方法更加完美 ,应用更加广泛 .
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| 关 键 词: | 双线性齐式 实二次型的矩阵 合同矩阵 齐次线性方程组的解空间 分块矩阵 |
The New Method for Proving the Law of Inertia |
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| SHEN Jing,qing.The New Method for Proving the Law of Inertia[J].College Mathematics,2000(6). |
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| Authors: | SHEN Jing qing |
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| Abstract: | From the point of view about the real number symmetrical matrix, the article gives us a new method for proving the law of inertia. From some elements of the matrix A=(a ij ) n×n , which comes from a given real number quadrics f(x 1,x 2,…,x n)=∑ni,j=1a ij x ix j, this method gives us a way to study directly the quadrics' property and make this way pass unimpeded . At the same time, this article also improves greatly “Jacobi's method” and make it more perfect and wider in application . |
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| Keywords: | bilinear formula of the same power the matrix of real number quadrics the same property of matrix the soluted space of group of the same power linear equations the matrix in bloc� |
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