If `{:A=alpha[(1,1+i),(1-i,-1)]:}a in R`, is a unitary matrix then `alpha^2` is

Let A= [(1,2),(-1,4)] . If A^(-1)= alpha I +beta A, alpha, beta in R , I is a 2 xx 2 identity matrix, then 4(alpha-beta) is equal to

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

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

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

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

if (tanalpha-i(sin ""(alpha)/(2)+cos ""(alpha)/(2)))/(1+2 i sin ""(alpha)/(2)) is purely imaginary then alpha is given by -

if (tanalpha-i(sin ""(alpha)/(2)+cos ""(alpha)/(2)))/(1+2 i sin ""(alpha)/(2)) is purely imaginary then alpha is given by -

[" Let "A=[[1,2],[-1,5]]" .If "A^(2)=alpha A+beta I" ,where "alpha,beta in R" and "l" is an identity matrix of order "2" ,then "],[alpha+beta" is equal to "]

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

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