4. Determine which of the following sets of n x n ma- trices are subspaces of Mnxn (R). a) The n x n diagonal matrices b) The n x n upper triangular matrices c) The n x n symmetric matrices d) The n x n matrices of determinant zero e) The n x n invertible matrices

Number 4 part a b c d and e

Transcribed Image Text:

13. Is 3x² in Span(x? 14. Is sin(x +I|4)n Spanl 3. Determine which of the following sets of functions are subspaces of F[a, b]. a) All functions f in F[a, b] for which f (a) = 0 b) All functions f in F[a, b] for which f (a) = 1 c) All functions f in C[a, b] for which Sa f(x) dx = 0 d) All functions f in D[a, b] for which f'(x) = f(x) e) All functions f in D[a, b] for which f'(x) = e* 15. Determine if 16. Determine if %3D 4. Determine which of the following sets of n x n ma- trices are subspaces of Mnxn (R). 17. Determine if a) The n x n diagonal matrices b) The n x n upper triangular matrices c) The n x n symmetric matrices d) The n x n matrices of determinant zero 18. Determine if 0 1 e) The n x n invertible matrices -1 0 5. If A is an m x n matrix and B is a nonzero element of Rm, do the solutions to the system AX = B form a subspace of R"? Why or why not? 19. Determine if x² - 1, 20. Determine if x'+x,: 6. Complex numbers a +bi where a and b are integers are called Gaussian integers. Do the Gaussian inte- gers form a subspace of the vector space of complex numbers? Why or why not? Use the system of linear ec Maple or another appropri cises 21-24. 1. Do the sequences that converge to zero form a sub- space of the vector space of convergent sequences? How about the sequences that converge to a rational number? 1 21. Determine if -1 8. Do the series that converge to a positive number form a subspace of the vector space of convergent series? How about the series that converge absolutely? 4 -1 9. Is in Span -4 10. Is in Span 31[ -41 [ 2 1.