Illustrate and explain the region of the Argand's plane represented by the inequality `|z+i| ge |z + 2|`

The region represented by the inequality |2z-3i|<|3z-2i| is

What is the region represented by the inequality 3 lt |z-2-3i| lt 4 in the Argand plane

Illustrate and explain the set of points z in the Argand diagram, which represents |z- z_(1)| le 3 where z_(1)= 3-2i

Locate the region in the Argand plane determined by z^2+ z ^2+2|z^2|<(8i( z -z)) .

Represent the modulus of 1+i, in the Argand plane.

Represent the modulus of 3+4i in the Argand plane.

The inequality |z-4| < |z-2| represents

Represent the modulus of 8 + 6i in the Argand plane .

Consider the region R in the Argand plane described by the complex number. Z satisfying the inequalities |Z-2| le |Z-4| , |Z-3| le |Z+3| , |Z-i| le |Z-3i| , |Z+i| le |Z+3i| Answer the followin questions : Minimum of |Z_(1)-Z_(2)| given that Z_(1) , Z_(2) are any two complex numbers lying in the region R is

The inequality |z-4| lt |z-2| represents