" If "|z-3+2i|<=4" then the difference between the greatest value and the least value of "|z|" is "

If |z-(3+2i)|=|z cos((pi)/(4)-argz)|, then locus of z 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 is any complex number satisfying |z-3-2i|lt=2 then the maximum value of |2z-6+5i| is

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

Let z be a complex number on the locus (z-i)/(z+i)=e^(i theta)(theta in R) , such that |z-3-2i|+|z+1-3i| is minimum. Then,which of the following statement(s) is (are) correct?

If |z-2-3i|+|z+2-6i|=4 where i=sqrt(-1) then find the locus of P(z)

If |z-2-3i|+|z+2-6i|=4 where i=sqrt(-1) then find the locus of P(z)

If |z-2-3i|+|z+2-6i|=4 where i=sqrt(-1) then find the locus of P(z)