lf `z(!=-1)` is a complex number such that `[z-1]/[z+1]` is purely imaginary, then `|z|` is equal to

If (z-1)/(z+1)(z ne-1) is purely imaginary then show that |z|=1

If z is a complex number such that |z|>=2 then the minimum value of |z+1/2| is

Fill in the blanks of the following If z_(1) and z_(2) are complex numbers such that z_(1)+z_(2) is a real number, then z_(1)=

The number of complex numbers z such that |z-1|=|z+1|=|z-i| is

Let z be a complex number such that the imaginary part of z is nonzero and a = z^2 + z + 1 is real. Then a cannot take the value

If z is a complex number satisfying the relation ∣z+1∣=z+2(1+i) then z is

A complex number z is said to be unimodular if abs(z)=1 . Suppose z_(1) and z_(2) are complex numbers such that (z_(1)-2z_(2))/(2-z_(1) bar z_(2)) is unimodular and z_(2) is not unimodular. Then the point z_(1) lies on a

If a is a complex number such that |a|=1 , then find thevalue of a, so that equation az^2 + z +1=0 has one purely imaginary root.

State true of false for the following: If z is a complex number such that z ne0 and Re(z)=0 then 1_(m)(z^(2))=0

If (z-1)/(z+1) is purely imaginary number (zne-1) then find the value of |z|.