Let A = (aij)nxn be a square matrix with integer entries.
a) Show that if an integer k is an eigenvalue of A, then k divides the determinant of A. j=1
b) Let k be an integer such that each row of A has sum k (i.e.,Σnj=1 aj = k; 1 si≤n), then show that k divides the determinant of A. [8M]
