A point z moves in the complex plane su...

A point z moves in the complex plane such that art `(z-2)/(z+2)=(pi)/(4)` then the minimum value of `|z-9sqrt(2)-2i|^(2)` is equal to ____________

Verified by Experts

The correct Answer is:

98

Similar Questions

Explore conceptually related problems

arg((z-2)/(z+2))=pi/4 , Find the minimum value of abs(z-9sqrt2-2i)^2

Let z be complex number such that |(z-9)/(z+3)|=2 hen the maximum value of |z+15i| is

If z=sqrt(2i), then z is equal to

If complex number z satisfies amp(z+i)=(pi)/(4) then minimum value of |z+1-i|+|z-2+3i| is

If z be the complex number such that |z+(1)/(z)|=2 then minimum value of (|z|)/(tan((pi)/(8))) is

If z satisfies the equation ((z-2)/(z+2))((barz-2)/(barz+2))=1 , then minimum value of |z| is equal to :

If z is a complex number such that |z|>=2 then the minimum value of |z+(1)/(2)| is

The minimum value of |Z-1+2i|+|4i-3-z| is

If z is a complex number satisfying |z^(2)+1|=4|z| , then the minimum value of |z| is