Based on the following adjacency matrix (the one mentioned in the question that is provided on Moodle):

2. The adjacency matrix, A, corresponding to a particular subset of the world wide web is provided on Moodle. Consider the PageRank transition matrix P with 6 = 0.85. List, in order of increasing importance, the top 5 ranked web pages, using the following approximations for the stationary distribution q of P. You should use Mathematica to perform the relevant calculations, and include the relevant code in your solutions. (a) Pkp with k : 2 and u 2 e1 (b) Pkp. with k = 5 andp, 2 e1 (0) Pk\" with k : 10 and u : e1 (d) Pk\" with k: : 2 and ,t = (1/30, . . . , 1/30) (e) Pkp with k : 5 and u = (1/30,. . . ,1/30) (D Pkp. with k = 10 andp. : (1/30,. . .,1/30) (g) The exact stationary distribution q \f