Using MATLAB solve Ax=b where A is the Hilbert matrix hilb(n), n=4,8,16 and b is chosen so that x=1 1 . . . 1 compute ||x-x'||base2, ||r||base2 and k(A) (use the norm() and cond() functions in matlab) -Repeat for A, the hadamard matrix, hadamard(n) -Repeat for A, the vandermande matrix vander([1 2 3...n]) In each case print out the three values listed above.
## Deliverables
1) Complete and fully-functional working program(s) in executable form as well as complete source code of all work done. 2) Installation package that will install the software (in ready-to-run condition) on the platform(s) specified in this bid request. 3) Complete ownership and distribution copyrights to all work purchased.
## Platform
program should do what is asked for. any regular platform is ok.(windows, unix etc)