(D) The inequality $2 < |z-(1+i)| < 3$ represents the region between two concentric circles centered at $(1, 1)$ with radii $r_1 = 2$ and $r_2 = 3$.Th

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(D) The inequality $2 The area of this region (an annulus) is given by the difference between the area of the outer circle and the area of the inner circle.Area $= \pi r_2^2 - \pi r_1^2$Area $= \pi (3)^2 - \pi (2)^2$Area $= 9\pi - 4\pi = 5\pi$.

Class 11 Mathematics 4-1.Complex numbers Geometry of complex numbers

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If $z=x+iy$ represents a point $P$ in the Argand plane, then the area of the region represented by the inequality $2 < |z-(1+i)| < 3$ is (in $\pi$)

TS EAMCET 2019 All TS EAMCET

A
$49$
B
$36$
C
$25$
D
$5$

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In the Argand diagram,if $O, P$ and $Q$ represent the origin,the complex number $z$ and the complex number $z + iz$ respectively,then the angle $\angle OPQ$ is

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If $z=x+iy$ represents a point $P$ in the Argand plane, then the area of the region represented by the inequality $2 < |z-(1+i)| < 3$ is (in $\pi$)

Similar Questions

In the Argand diagram,if $O, P$ and $Q$ represent the origin,the complex number $z$ and the complex number $z + iz$ respectively,then the angle $\angle OPQ$ is

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