For a complex number Z, if `|Z-i|le2 and Z_(1)=5+3i`, then the maximum value of `|iZ+Z_(1)|` is (where, `i^(2)=-1`)

If |z-i|<=2 and z_(0)=5+3i, the maximum value of |iz+z_(0)| is

If |z+2i|<=1 and z_(1)=6-3i then the maximum value of |iz+z_(1)-4| is equal to

if |z-2i| le sqrt2 , then the maximum value of |3+i(z-1)| is :

If |z-2i|lesqrt(2), where i=sqrt(-1), then the maximum value of |3-i(z-1)|, 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 any complex number satisfying |z-3-2i|<=2 then the maximum value of |2z-6+5i| is

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

" If "z" is a complex number such that "|z|=2" ,Then the maximum value of "|z-2+3i|"

For all complex numbers z_(1),z_(2) satisfying |z_(1)|=12 and |z_(2)-3-4i|=5, find the minimum value of |z_(1)-z_(2)|