Let `w(Im w != 0)` be a complex number. Then the set of all complex numbers z satisfying the equal `w-barw z = k(1-z)` , for some real number k, is :

Let w(Im w!=0) be a complex number.Then the set of all complex numbers z satisfying the equal w-bar(w)z=k(1-z), for some real number k,is :

Let z be a complex number satisfying |z+16|=4|z+1| . Then

Suppose two complex numbers z=a+ib , w=c+id satisfy the equation (z+w)/(z)=(w)/(z+w) . Then

Let w be the complex number cos(2pi)/3 + isin(2pi)/3 . Then the number of distinct complex numbers z satisfying |(z+1, w, w^2),(2, z+w^2, 1),(w^2, 1, z+w)|=0 is equal

Let omega be the complex number cos((2 pi)/(3))+i sin((2 pi)/(3))* Then the number of distinct complex cos numbers z satisfying Delta=det[[omega,z+omega^(2),1omega,z+omega^(2),1omega^(2),1,z+omega]]=0 is

Let z be a complex number satisfying z^(117)=1 then minimum value of |z-omega| (where omega is cube root of unity) is

Find number of values of complex numbers omega satisfying the system of equaltion z^(3)=-(bar(omega))^(7) and z^(5).omega^(11)=1

Find the number of values of complex numbers omega satisfying the system of equations z^(3)==(overlineomega)^(7) and z^(5).omega^(11)=1