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

Let A denote the matrix ({:(0,i),(i,0):}) , where i^(2) = -1 , and let I denote the identity matrix ({:(1,0),(0,1):}) . Then I + A + A^(2) + "….." + A^(2010) is -

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

If A=[(1+2i,i),(-I,1-2i)] , where i=sqrt(-1) , then A(adjA)= . . .

The matrix overset-A={:[(-i,1+2i),(-1+2i,0)]:} is which of the following?

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

If A= [(0,1,1),(0,0,1),(0,0,0)] is a matrix of order 3 then the value of the matrix (I+A)-2A^2(I-A), where I is a unity matrix is equal to (A) [(1,0,0),(1,1,0),(1,1,1)] (B) [(1,-1,-1),(0,1,-1),(0,0,1)] (C) [(1,1,-1),(0,1,1),(0,0,1)] (D) [(0,0,2),(0,0,0),(0,0,0)]

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

If A={:[(1+i,-i),(i,1+i)]:}," where "i=sqrt(-1)," and "A^(2)-2A+I=0," then ":A^(-1)=

The equation z^(2)-i|z-1|^(2)=0, where i=sqrt(-1), has.