If z is a complex number of unit modulus and argument `theta`, then `arg((1+z)/(1+bar(z)))` equals to

Find modulus and argument of the complex numbers z=-1-isqrt(3)

Find modulus and argument of the complex numbers z=-sqrt(3)+i

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

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

For complex number z = 5 + 3i value z -barz=10 .

If z_1 and z_2 , are two non-zero complex numbers such tha |z_1+z_2|=|z_1|+|z_2| then arg(z_1)-arg(z_2) is equal to

Numbers of complex numbers z, such that abs(z)=1 and abs((z)/bar(z)+bar(z)/(z))=1 is

Find the modulus and arguments of the complex numbers. (i) (1+i)/(1-i) , (ii) 1/(1+i)

Let z=x+i y be a complex number where x and y are integers. Then, the area of the rectangle whose vertices are the roots of the equation z bar(z)^3+ bar(z) z^3=350 is