Express A as the sun of a hermitian and skew-hermitian matrix,where
`A=[(2+3_(i),7),(1-i,2_(i))],i=sqrt-1.`

Express A as the sum of a hermitian and skew-hermitian matrix,where A=[(2+3i,7),(1-i,2i)],i=sqrt-1.

Express A as the sum of a Hermitian and a skew-Hermitian matrix, where A=[(2+3i, 2, 5), (-3-i, 7, 3-i), (3-2i, i, 2+i)]dot

Express A as the sum of a Hermitian and a skew-Hermitian matrix, where A=[(2+3i, 2, 5), (-3-i, 7, 3-i), (3-2i, i, 2+i)]dot

the matrix A=[(i,1-2i),(-1-2i,0)], where I = sqrt-1, is

the matrix A=[(i,1-2i),(-1-2i,0)], where I = sqrt-1, is

the matrix A=[(i,1-2i),(-1-2i,0)], where I = sqrt-1, is

the matrix A=[(i,1-2i),(-1-2i,0)], where I = sqrt-1, is

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

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

Verify that the matrix (1)/sqrt3[(1,1+i),(1-i,-1)] is unitary, where i=sqrt-1