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线性代数典型例题 |
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| 英文版线性代数(linear Algebra)基础知识要点:线性方程组(Systems of Linear Equations),线性变换(Linear Transformations),矩阵和行列式(Determinant),特征值(Eigenvalue)和特征向量(eigenvector),矩阵相似对角化(Diagonalization)和合同对角化,正交投影(orthogonal Projection)等 |
| 点击查看》》英文版线性代数(linear Algebra)基础知识要点 |
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| 题关键词:配方法,以及特征值法划二次型成标准型,并求其符号或判定正定性。 |
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| 题关键词:不可对角化矩阵,相似于他的约当标准型矩阵,约当标准型要根据特征值和特征向量和相似的定义综合取定 |
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题关键词:二次型及其矩阵, 二次型惯性指数与规范型
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设A为n阶实对称矩阵,秩r(A)=n,Aij是A=(aij)nXm中元素的代数余子式,二次型 (1)记X=(x1,x2,...,xn)T, 把f(x1,x2,...,xn)写成矩阵形式,并证明二次型f(X)的矩阵为A-1 |
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| 题关键词:矩阵特征值(eigenvalues)的特征向量(eigenvectors)的定义,矩阵特征值与其伴随阵和逆阵的特征值的关系。 |
题:Let A be a 3X3 matrix and its eigenvalues are λ1= 1, λ2= 2, λ3= 3,then
Find :
(1) det(A), (2) the eigenvalues of A -1 (3) the eigenvalues of adj(A),
(4)the eigenvalues of A-1+A2 (注:det(A)=|A|, adjA = A* ) |
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| 题关键词:矩阵相似(similar)与合同(contract),方阵对角化(diagonalization) |
| 设A为三阶矩阵,P=(α1,α2,α3)为3阶可逆矩阵,Q=(α1,α2,α3+α2),(1)若PTAP=diag(1,1,2), 则QTAQ=?(2)若P-1AP=diag(1,1,2),则Q-1AQ=? |
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题关键词:eigenvalues and eigenvector, diagonalization, inner product, invertible matrix. |
In this question A is the matrix A:=UVT , where u and v are non-zero vector in R10 .
- If u·v≠0 find all 10 eigenvalues and describe their corresponding eigenvectors
- Decide if A is diagonalizable.
- Decide if A is invertible.
- If u·v≠0 find all 10 eigenvalues and describe their corresponding eigenvectors
- Decide if A is diagonalizable.
- Decide if A is invertible.
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| 题:the matrix of the linear transformation,change of basis,linear maping, similar matrix. |
Let SєL(v,v) be given by S(u1)=u1-u2 , S(u2)=u1 , where {u1,u2}is a basis for V.
Find the matrices of S with respect to the basis {u1,u2}and with respect to the new basis{w1,w2}where w1=3u1-u2, w2=u1+u2.
Find invertible matrices X in each case such that X-1AX=B where A is the matrix of the transformation with respect to the old basis, and B is the matrix with respect to the new basis. |
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| Problem:The extrema of the function of two or more variable, Ctitical point, Lagrange Multipliers, Max-Min Existence Theorem. |
| Let f(x,y)=y2-2y-3yx2 . (a) Find the critical points of f(x,y). (b) Find the absolute maximum and minimum values of f on the closed and bounded set enclosed by x=√y , x=1andy=0. |
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