If z1 - z2- z3 are complex numbers such that 2z1 - 1z2 - 1z3 and z3z2- n-n- then the points z1- z2- z3 and Oorigin will always lie on

Given: ( 2z_1 ) = ( 1z_2 ) + ( 1z_3 ) , (z_3z_2) ≠ nπ 2z_1 = 1z_2 + 1z_3 ⇒1z_1 1z_2 = 1z_3 1z_1 ⇒z_2 z_1z_1 z_2 = z_1 z_3z_3 z_1 ⇒z_3 z_1z_2 z_1= z_ ...

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Standard XIII

Mathematics

Geometrical Representation of a Complex Number

If z1 , z2, z...

Question

If $z_{1}, z_{2}, z_{3}$ are complex numbers such that $(\frac{2}{z_{1}}) = (\frac{1}{z_{2}}) + (\frac{1}{z_{3}})$ and $arg (\frac{z_{3}}{z_{2}}) \neq n π, n \in I$ , then the points $z_{1}, z_{2}, z_{3}$ and $O$ (origin) will always lie on

a circle

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a straight line

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An equilateral triangle with

O

as centriod

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a rectangle

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Solution

The correct option is A a circle
$\frac{2}{z_{1}} = \frac{1}{z_{2}} + \frac{1}{z_{3}}$
$\Rightarrow \frac{1}{z_{1}} - \frac{1}{z_{2}} = \frac{1}{z_{3}} - \frac{1}{z_{1}}$
$\Rightarrow \frac{z_{2} - z_{1}}{z_{1} z_{2}} = \frac{z_{1} - z_{3}}{z_{3} z_{1}}$
$\Rightarrow \frac{z_{3} - z_{1}}{z_{2} - z_{1}} = - \frac{z_{3}}{z_{2}}$

Now $arg (\frac{z_{3} - z_{1}}{z_{2} - z_{1}}) = arg (- \frac{z_{3}}{z_{2}})$
$\Rightarrow arg (\frac{z_{3} - z_{1}}{z_{2} - z_{1}}) = π + arg (\frac{z_{3}}{z_{2}}) \Rightarrow arg (\frac{z_{3} - z_{1}}{z_{2} - z_{1}}) + arg (\frac{z_{2} - 0}{z_{3} - 0}) = π$
Let $α = arg (\frac{z_{3} - z_{1}}{z_{2} - z_{1}}), β = arg (\frac{z_{2} - 0}{z_{3} - 0})$
then, $α + β = π$
and possible diagram will be

Hence, the said points are concyclic.

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Geometrical Representation of a Complex Number

Standard XIII Mathematics

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If z1,z2,z3 are complex numbers such that (2z1)=(1z2)+(1z3) and arg(z3z2)≠nπ,n∈I, then the points z1,z2,z3 and O(origin) will always lie on

If $z_{1}, z_{2}, z_{3}$ are complex numbers such that $(\frac{2}{z_{1}}) = (\frac{1}{z_{2}}) + (\frac{1}{z_{3}})$ and $arg (\frac{z_{3}}{z_{2}}) \neq n π, n \in I$ , then the points $z_{1}, z_{2}, z_{3}$ and $O$ (origin) will always lie on