If `|z|=2,` the points representing the complex numbers `-1+5z`will lie on

If |z|=1, then the point representing the complex number -1+3z will lie on a. a circle b. a parabola c. a straight line d. a hyperbola

if |z|=3 then the points representing thecomplex numbers -1+4z lie on a

If the point representing the complex number z_alpha is a point on or inside the circle having centre (0+i0) and radius alpha then maximum value of |z_1+z_2+……+z_n|= (A) (n(n+3))/2 (B) (n(n+1))/2 (C) (n(n-1))/2 (D) none of these

The locus of the points representing the complex numbers z for which |z|-2=|z-i|-|z+5i|=0 , is

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

Find the locus of the points representing the complex number z for which |z+5|^2=|z-5|^2=10.

Find the locus of the points representing the complex number z for which |z+5|^2-|z-5|^2=10.

The points representing complex numbers z for which |z-3|=|z-5| lie on the locus given by (A) circle (B) ellipse (C) straight line (D) none of these

The points representing complex number z for which |z+2+ 3i| = 5 lie on the locus given by

If the points represented by complex numbers z_(1)=a+ib, z_(2)=c+id " and " z_(1)-z_(2) are collinear, where i=sqrt(-1) , then