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

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).

Find the all complex numbers satisying the equation 2|z|^(2)+z^(2)-5+isqrt(3)=0, wherei=sqrt(-1).

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

Number of solutions of the equation z^(2)+|z|^(2)=0 , where z in C , 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 z^(3)+(3+2i)z+(-1+ia)=0, " where " i=sqrt(-1) , has one real root, the value of a lies in the interval (a in R)

Solve the equation z^2 +|z|=0 , where z is a complex number.

If one root of the quadratic equation ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1) is 2-i , the other root is

If |z-1|=1, where is a point on the argand plane, show that |(z-2)/(z)|= tan (argz), where i=sqrt(-1).

If the points represented by complex numbers z_(1)=a+ib, z_(2)=c+id " and " z_(1)-z_(2) are collinear, where i=sqrt(-1) , then