| 1. | The aim of this chapter is to develop properties of the inverse .
本章的目的是要开发逆矩阵的性质。 |
| 2. | This combination process is called the assemblage of stiffness matrices .
这种组合的过程称为刚度矩阵的装配。 |
| 3. | The fundamental circ matrix is one example of a reduced circ matrix .
基本圈矩阵是简化广义圈矩阵的一个例子。 |
| 4. | The condition number, defined below, is changed by scaling the matrix .
调整矩阵的比例就改变了下面定义的条件数。 |
| 5. | Local deviations depend strongly on the local geometry of the solid matrix .
局部偏离严格地依赖于固体矩阵的局部几何形状。 |
| 6. | In other words, the hermiticity of a matrix is invariant under unitary transformations .
换言之,矩阵的厄密性在幺正变换下保持不变。 |
| 7. | The zero or null matrix denoted by 0 is definde as a matrix all of whose elements are zero .
如果一个矩阵的所有元素都为零,则称它为零矩阵。 |
| 8. | We define the rank of a matrix as the number of linearly independent rows which it contains .
我们把这个矩阵的秩定义为它所包含的线性无关行的数目。 |
| 9. | The elimination process leading to the eventual formation of an upper triangular matrix is then carried out .
于是进行导致最后形成一个上三角形矩阵的消去手续。 |
| 10. | This means that a general element of the flexibility matrix is known as maxwell's reciprocal relation .
这意味着,对于柔度矩阵的一般元素是为众所周知的马克斯威尔互等关系。 |
