The least value of p for which the two curves `argz=pi/6` and `|z-2sqrt(3)i|=p` intersect is

Given that the two curves a r g(z)=pi/6 and |z-2sqrt(3)i|=r intersect in two distinct points, then a. [r]!=2 b. 0 < r < 3 c. r=6 d. 3 < r < 2sqrt(3) (Note : [r] represents integral part of r)

Given that the two curves a r g(z)=pi/6 and |z-2sqrt(3)i|=r intersect in two distinct points, then a. [r]!=2 b. 0 < r < 3 c. r=6 d. 3 < r < 2sqrt(3) (Note : [r] represents integral part of r)

Given that the two curves a r g(z)=pi/6a n d|z-2sqrt(3)i|=r intersect in two distinct points, then

Given that the two curves a r g(z)=pi/6a n d|z-2sqrt(3)i|=r intersect in two distinct points, then [r]!=2 b. 0

Find the least value of |z| for which |(z+2)/(z+i)|<=2

The area bounded by the curves argz=(pi)/(3) and argz=2(pi)/(3) and arg(z-2-2i sqrt(3))= in the argand plane is (in sq.units)

The mirror image of the curve arg((z-3)/(z-i))=pi/6, i=sqrt(- 1) in the real axis

The mirror image of the curve arg((z-3)/(z-i))=pi/6, i=sqrt(- 1) in the real axis