Let `M` be a `3xx3` matrix satisfying `M[0 1 0]=M[1-1 0]=[1 1-1],a n dM[1 1 1]=[0 0 12]` Then the sum of the diagonal entries of `M` is _________.

Find the matrix X satisfying. [(2,1),(3,2) X [(-3,2),(5,-3)] = [(1,0),(0,1)]

If M is a 3xx3 matrix, where det M=1a n dM M^T=1,w h e r eI is an identity matrix, prove theat det (M-I)=0.

Let A = [(1,0,0), (2,1,0), (3,2,1)], and U_1, U_2 and U_3 are columns of a 3 xx 3 matrix U . If column matrices U_1, U_2 and U_3 satisfy AU_1 = [(1),(0),(0)], AU_2 = [(2),(3),(0)], AU_3 = [(2),(3),(1)] then the sum of the elements of the matrix U^(-1) is

Find the matrix X satisfying. [(2,1),(5,3)] X [(5,3),(3,2)] = [(1,0),(0,1)]

If A = {:[(3,1,-1),(0,1,2)] , then show that AA' is a symmetric matrix.

Let A = ({:(0,0,-1),(0,-1,0),(-1,0 ,0):}). The only correct statement about the matrix A is :

Let A= [[1,0,0],[2,1,0],[3,2,1]] be a square matrix and C_(1), C_(2), C_(3) be three column matrices satisfying AC_(1) = [[1],[0],[0]], AC_(2) = [[2],[3],[0]] and AC_(3)= [[2],[3],[1]] of matrix B. If the matrix C= 1/3 (AcdotB). The ratio of the trace of the matrix B to the matrix C, is

Calculate pH of 0.1M HC1.