z=-1-i sqrt(3)

If z_(1)=1+i sqrt(3) , z_(2)=1-i sqrt(3), then (z_(1)^(100)+z_(2)^(100))/(z_(1)+z_(2))=

The complex number z_(1),z_(2) and z_(3) satisfying (z_(1)-z_(3))/(z_(2)-z_(3))=(1-i sqrt(3))/(2) are the vertices of a triangle which is :

The complex numbers z_(1), z_(2), z_(3) satisfying (z_(1)-z_(3))/(z_(2)-z_(3))=(1-i sqrt(3))/(2) are the vertices of a triangle which is

Find the polar form of the complex number z=-1+ sqrt(3)i

z_(1), z_(2) ,z_(3) are vertices of a triangle ABC having area Delta satisfies (z_(3)-z_(1))=(1-i sqrt(3))(z_(2)-z_(1)) and sqrt(3)|z_(2)-z_(3)|^(2)=k Delta then value of k^(2)=

The complex numbers z_1, z_2 and z_3 satisfying (z_1-z_3)/(z_2-z_3) =(1- i sqrt(3))/2 are the vertices of triangle which is (1) of area zero (2) right angled isosceles(3) equilateral (4) obtuse angled isosceles

The complex numbers z_1 z_2 and z3 satisfying (z_1-z_3)/(z_2-z_3) =(1- i sqrt(3))/2 are the vertices of triangle which is (1) of area zero (2) right angled isosceles(3) equilateral (4) obtuse angled isosceles

If z_(1)=sqrt(3)-i, z_(2)=1+i sqrt(3) , then amp (z_(1)+z_(2))=

The argument of the complex number z=(1+i sqrt3)(1+i) (costheta+isintheta) is

Let |z-sqrt(3)-i|+|z-1-sqrt(3)i|=sqrt(6)-sqrt(2) Find the difference between the maximum and a minimum value of the argument of z