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

If a point p dentes a complex number z=x+iy in the argand plane and if (z+1)/(z+i) is a purely real number , then the locus of p is

Let z_(1),z_(2) be two fixed complex numbers in the Argand plane and z be an arbitrary point satisfying |z-z_(1)|+|z-z_(2)|=2|z_(1)-z_(2)| . Then the locus of z will be

Locate the region in the argand plane for z satisfying |z+i|=|z-2|.

If z satisfies |z-6+4i|+|z-3+2i|=13 then the locus of z is

The number of complex number z satisfying the equations |z|-4=|z-i|-|z+5i|=0 is

The complex number z = x + iy which satisfy the equation |(z-5i)/(z+5i)|=1 lie on

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

The complex numbers z and w satisfy the system z+(20i)/(w)= 5+i, w+(12i)/(z)= -4+10i. The smallest possible value of |zw|^2 is