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

If alpha and beta are the complex roots of the equation (1+i)x^(2)+(1-i)x-2i=0 where i=sqrt(-1) , the value of |alpha-beta|^(2) is

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

The value of sum_(r=-3)^(1003)i^(r)(where i=sqrt(-1)) is

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

For every real number c ge 0, find all complex numbers z which satisfy the equation abs(z)^(2)-2iz+2c(1+i)=0 , where i=sqrt(-1) and passing through (-1,4).

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the minimum value of abs(2z-6+5i) , is

Show that the area of the triagle on the argand plane formed by the complex numbers Z, iz and z+iz is (1)/(2)|z|^(2)," where "i=sqrt(-1).

If the conjugate of a complex numbers is 1/(i-1) , where i=sqrt(-1) . Then, the complex number is

If centre of a regular hexagon is at origin and one of the vertices on Argand diagram is 1+2i, where i=sqrt(-1) , then its perimeter is

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