The sum of the least and greates in absolute value of z which satisfies the condition `|2z+1-I sqrt(3)|=1`, is

The maximum value of |z| where z satisfies the condition |z+(2/z)|=2 is

The maximum value of |z| where z satisfies the condition |z+(2/z)|=2 is

2z+ 1 =z What value of z satisfies the equation above?

If at least one value of the complex number z=x+iy satisfies the condition |z+sqrt(2)|=sqrt(a^(2)-3a+2) and the inequality |z+isqrt(2)| lt a , then

Find the number of complex numbers which satisfies both the equations |z-1-i|=sqrt(2)a n d|z+1+i|=2.

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

The locus of the points z satisfying the condition arg ((z-1)/(z+1))=pi/3 is, a

1. If |z-2+i|≤ 2 then find the greatest and least value of | z|

locus of the point z satisfying the equation |z-1|+|z-i|=2 is

1. If |z-2+i| ≤ 2 then find the greatest and least value of | z|