If`agt0 and blt0, then sqrt(a)sqrt(b)` is equal to (where, `i=sqrt(-1))`

sqrt((-8-6i)) is equal to (where, i=sqrt(-1)

The real part of (1-i)^(-i), where i=sqrt(-1) is

l n ((3)/(sqrt(3)))- ln (2+sqrt(3)) equals (where l nx = log_(e)x)

The value of the determinant |{:(sqrt(6),2i,3+sqrt(6)i),(sqrt(12),sqrt(3)+sqrt(8)i,3sqrt(2)+sqrt(6)i),(sqrt(18),sqrt(2)+sqrt(12)i,sqrt(27)+2i):}| is (where i= sqrt(-1)

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

{sqrt(5+12i)+sqrt(5-12i)}/(sqrt(5+12i)-sqrt(5-12i) =

The value of sum_(n=0)^(50)i^(2n+n)! (where i=sqrt(-1)) is

Calculate sqrt(0.99)

The centre of a square ABCD is at z=0, A is z_(1) . Then, the centroid of /_\ABC is (where, i=sqrt(-1) )