The locus of `z` satisfying the inequality `|(z+2i)/(2z+1)|<1,` where `z=x+iy,` is :

The locus of z satisfying the inequality |(z+2i)/(2z+i)|lt1 where z = x + iy , is :

If the point ((k-1)/k,(k-2)/k) lies on the locus of z satisfying the inequality |(z+3i)/(3z+i)| lt 1 , then the interval in which k lies is

The locus of z satisfying the inequality log_(1//3)|z+1|gtlog_(1//3)|z-1|

The locus of z satisfying the inequality log_0.8abs(z+1) gt log_0.8abs(z-1)

If Z=x+iy and if the point P in the Argand plane represent Z, then describe geometrically the locus of z satisfying the equation. 2|z-2|=|z-1|

On the complex plane locus of a point z satisfying the inequality 2<=|z-1|<3 denotes

If Z=x+iy and if the point P in the Argand plane represent Z, then describe geometrically the locus of z satisfying the equation. |z-2-3i|=5