Let "z" be a complex number,then the area bounded by the curve `|z-5i|^(2)`+`|z-12|^(2)`=169` in square units is

If z is not purely real then area bounded by curves Img(z+1/z)=0 & |z-1| = 2 is(in square units)-

Let z be a complex number such that |z|=5 Find the maximum value of |z+3+4i|

Let z be a complex number such that |z|=2 . Then the maximum value of |z+(1)/(z)| is

Let z be a complex number in the argand plane wnich satisfies 26|z-3-4i|=|(5+12i)z+(5-12i)bar(z)+13| Then the locus of z is

Let z be a complex number satisfying 2z+|z|=2+6i .Then the imaginary part of z is

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

Let z be a complex number satisfying (3+2i) z +(5i-4) bar(z) =-11-7i .Then |z|^(2) is

Let z be a complex number such that |z| = 2, then maximum possible value of |z + (2)/(z)| is

Let z be a complex number such that the imaginary part of z is nonzero and a=z^(2)+z+1 is real.Then a cannot take the value

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?