If z complex number satisfying `|z-3|<=5` then range of |z+3i| is (where i=`sqrt(-1)` )

If z complex number satisfying |z-1|=1 then which of the following is correct

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 satisfying |z-3|<=4 and | omega z-1-omega^(2)|=a (where omega is complex cube root of unity then

The locus of a complex number z satisfying |z-(1+3i)|+|z+3-6i|=4

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

The number of complex numbers z satisfying |z-3-i|=|z-9-i| and |z-3+3i|=3 are a.one b.two c.four d.none of these

Let z be a complex number satisfying |z|=3|z-1| on the argand plane. If the locus of z is a conic C of area m pi and eccentricity e ,then the value of |m-e| is equal to

The locus of a complex number z satisfying |z-(1+3i)|+|z+3-6i|=4 (A) Line segment (B) Ellipse (C) Two rays (D) No such z exists