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

if matrix A=(1)/sqrt2[(1,i),(-i,a)], i=sqrt-1 is unitary matrix, a is equal to

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

If alpha and beta are the complex roots of the equation (1+i)x^(2)+(1-i)x-2i=o where i=sqrt(-1) , the value of |alpha-beta|^(2) is

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

Express (1+i)^(-1) ,where, i= sqrt(-1) in the form A+iB.

If matrix A = [a_(ij)] _(2xx2) where a_(ij) {:(-1," if " i !=j ),(=0 , " if " i = j):} then A^(2) is equal to :

Solve the following equations by matrix method. For the matrix A = [(1,1,1),(1,2,-3),(2,-1,3)] . Show that A^(3) - 6A^(2) + 5A + 11 I = 0 . Hence, find A^(-1) .

The value of the sum sum_(n=1) ^(13) (i^(n)+i^(n+1)) , where i = sqrt( - 1) ,equals :