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1、南京航空航天大学Matrix-Theory双语矩阵论期末考试 作者: 日期: Part I (必做题,共5题,70分) 第1题(15分)得分 Let denote the set of all real polynomials of degree less than 3 with domain(定义域) . The addition and scalar multiplication are defined in the usual way. Define an inner product on by .(1) Construct an orthonormal basis for from t
2、he basis by using the Gram-Schmidt orthogonalization process. (2) Let. Find the projection of onto the subspace spanned by.Solution: (1) , , , , , - (2) -第2题(15分)得分 Let be the linear transformation on (the vector space of real polynomials of degree less than 3) defined by . (1) Find the matrix repre
3、senting with respect to the ordered basis for . (2) Find a basis for such that with respect to this basis, the matrix B representing is diagonal. (3) Find the kernel(核) and range (值域)of this transformation.Solution: (1) - (2) (The column vectors of T are the eigenvectors of A) The corresponding eige
4、nvectors in are (T diagonalizes A) . With respect to this new basis , the representing matrix of is diagonal. - (3) The kernel is the subspace consisting of all constant polynomials. The range is the subspace spanned by the vectors -第3题(20分)得分Let . (1) Find all determinant divisors and elementary di
5、visors of. (2) Find a Jordan canonical form of . (3) Compute . (Give the details of your computations.) Solution: (1),(特征多项式 . Eigenvalues are 1, 2, 2.)Determinant divisor of order , , Elementary divisors are . - (2) The Jordan canonical form is - (3) For eigenvalue 1, , An eigenvector is For eigenv
6、alue 2, , An eigenvector is Solve , we obtain that , - 第4题(10分)得分Suppose that and . (1) What are the possible minimal polynomials of? Explain.(2) In each case of part (1), what are the possible characteristic polynomials of? Explain.Solution: (1) An annihilating polynomial of A is . The minimal poly
7、nomial of A divides any annihilating polynomial of A. The possible minimal polynomials are, , and . -(2) The minimal polynomial of A divides the characteristic polynomial of A. Since A is a matrix of order 3, the characteristic polynomial of A is of degree 3. The minimal polynomial of A and the char
8、acteristic polynomial of A have the same linear factors. Case , the characteristic polynomial is Case , the characteristic polynomial is Case , the characteristic polynomial is or -第5题(10分)得分Let . Find the Moore-Penrose inverse of . Solution: , 也可以用SVD求. -Part II (选做题, 每题10分) 请在以下题目中(第6至第9题)选择三题解答. 如果你做了四题,请在题号上画圈标明需要批改的三题. 否则,阅卷者会随意挑选三题批改,这可能影响你的成绩. 第6题 Let be the vector space consisting of all real polynomials of degree less than 4 with usual addition and scalar multiplication. Let be three distinct real numbers. For each pair of polynomials and in, define
