Construct the matrix A = `[a_(ij)]_(3xx3),` where `a_(ij)=i-j`. State whether A is symmetric or skew- symmetric.

Detemine the matrix A = (a_(ij))_(3 xx 2) if a_(ij) = 3i - 2j

Statement 1: Matrix 3xx3,a_(i j)=(i-j)/(i+2j) cannot be expressed as a sum of symmetric and skew-symmetric matrix. Statement 2: Matrix 3xx3,a_(i j)=(i-j)/(i+2j) is neither symmetric nor skew-symmetric

If a square matix a of order three is defined A=[a_("ij")] where a_("ij")=s g n(i-j) , then prove that A is skew-symmetric matrix.

The matrix A given by (a_(ij))_(2 xx 2) if a_(ij) = i - j is ………. .

Construct an mxxn matrix A = [ a_(ij) ], where a_(ij) is given by a_(ij)=|(3i-4j)|/(4) with m = 3, n = 4

If A=(a_(ij))_(2xx2) .Where a_(ij) is given by (i-2j)^(2) then A is:

Express the matrix A=[(1,3,5),(-6,8,3),(-4,6,5)] as the sum of a symmetric and a skew - symmetric matrices.

Construct an mxxn matrix A = [ a_(ij) ], where a_(ij) is given by a_(ij)=((i-2j)^(2))/(2) with m = 2, n = 3