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

If z lies on the Curve (arg(z+i)=(pi)/(4)) then the minimum value of |z+4-3i|+|z-4+3i| is (Note i^(2)=-1 )

If z lies on the curve arg (z+i)=(pi)/(4) , then the minimum value of |z+4-3i|+|z-4+3i| is [Note :i^(2)=-1 ]

Let z_1 and z_2 be two complex numbers satisfying |z_1|=9 and |z_2-3-4i|=4 Then the minimum value of |z_1-Z_2| is

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

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

Suppose that z is a complex number the satisfies |z-2-2i|<=1. The maximum value of |2iz+4| is equal to

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