If `z_(1) and overline(z)_(1)` represent adjacent vertices of a regular polygon of n sides whose centre is origin and if `(Im (z_(1)) )/(Re (z_(1))) = sqrt(2)-1` then n is equal to:

If z_1 and bar z_1 represent adjacent vertices of a regular polygon of n sides where centre is origin and if (Im(z))/(Re(z)) = sqrt(2) - 1, then n is equal to: (A) 8 (B) 16 (C) 24 (D) 32

If z_1& z_1 represent adjacent vertices of a regular polygon on n sides with centre at the origin & if (l m(z_1))/(R e(z_1))=sqrt(2)-1 then the value of n is equal to: 8 (b) 12 (c) 16 (d) 24

Im ((1) / (z_ (1) bar (z) _ (1)))

The center of a regular polygon of n sides is located at the point z=0, and one of its vertex z_(1) is known. If z_(2) be the vertex adjacent to z_(1) , then z_(2) is equal to

if |z-i Re(z)|=|z-Im(z)| where i=sqrt(-1) then z lies on

If z_(1)=cos theta+i sin theta and 1,z_(1),(z_(1))^(2),(z_(1))^(3),......,(z_(1))^(n-1) are vertices of a regular polygon such that (Im(z_(1))^(2))/(ReZ_(1))=(sqrt(5)-1)/(2), then the value n is

Points z_(1)&z_(2), are adjacent vertices of a regular octagon.The vertex z_(3) adjacent to z_(2)(z_(3)!=z_(1)) is represented by