Let z be a complex number satisfying `1/2 le |z| le 4` , then sum of greatest and least values of `|z+1/z|` is :

Let z be a complex number satisfying |z+16|=4|z+1| . Then

If z be a complex number satisfying |z-4+8i|=4 , then the least and the greatest value of |z+2| are respectively (where i=sqrt(-i) )

If z a complex number satisfying |z^(3)+z^(-3)|le2 , then the maximum possible value of |z+z^(-1)| is -

If 0 le "arg"(z) le pi/4 , then the least value of |z-i| , is

If z is any complex number satisfying |z-3-2i|le 2 , then the maximum value of |2z - 6 + 5 i| is ___

If z is a complex number satisfying ∣ z + 16 ∣ = 4 | z+1 | , then the minimum value of | z | is