If `|(z-2)/(z-3)|=2` represents a circle, then find its radius.

If |(z-2)/(z-3)|=2 express a circle, then its radius is ......

Show that |(z-2)/(z-3)|=2 represents a circle. Find the centre of radius.

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

Let z_(1),z_(2) and z_(3) be three non-zero complex numbers and z_(1) ne z_(2) . If |{:(abs(z_(1)),abs(z_(2)),abs(z_(3))),(abs(z_(2)),abs(z_(3)),abs(z_(1))),(abs(z_(3)),abs(z_(1)),abs(z_(2))):}|=0 , prove that (i) z_(1),z_(2),z_(3) lie on a circle with the centre at origin. (ii) arg(z_(3)/z_(2))=arg((z_(3)-z_(1))/(z_(2)-z_(1)))^(2) .

Show that all the roots of the equation a_(1)z^(3)+a_(2)z^(2)+a_(3)z+a_(4)=3, (where|a_(i)|le1,i=1,2,3,4,) lie outside the circle with centre at origin and radius 2//3.

If |z_1-1|lt=1,|z_2-2|lt=2,|z_(3)-3|lt=3, then find the greatest value of |z_1+z_2+z_3|dot

State true of false for the following: the inequality |z-4| lt |z-2| represents the region given by x gt 3

For any two complex numbers z_(1) "and" z_(2) , abs(z_(1)-z_(2)) ge {{:(abs(z_(1))-abs(z_(2))),(abs(z_(2))-abs(z_(1))):} and equality holds iff origin z_(1) " and " z_(2) are collinear and z_(1),z_(2) lie on the same side of the origin . If abs(z-(3)/(z))=6 and sum of greatest and least values of abs(z) is 2lambda , then lambda^(2) , is

If z_(1), z_(2) and z_(3), z_(4) are two pairs of conjugate complex numbers, then find arg ((z_(1))/(z_(4)))+arg((z_(2))/(z_(3))) .

If z ne 1 and (z^(2))/(z-1) is real, the point represented by the complex numbers z lies