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Let 2+ i z +2...

Question

Let $(2 + i) z + (2 - i) ¯ z = λ, λ ϵ R$ , be a straight line in the complex plane. If $A (z_{1})$ and $B (z_{2})$ are 2 points in the plane such that AB is perpendicular to the given line and also the midpoint of AB lies on the given line, then $λ$ is equal to

(2 + i) z_{1} + (2 - i)_{2}

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(2 - i)_{1} + (2 + i) z_{2}

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(2 + i) z_{1} + (2 - i) z_{2}

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(2 - i)_{1} + (2 + i)_{2}

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Solution

The correct options are
A $(2 + i) z_{1} + (2 - i)_{2}$
B $(2 - i)_{1} + (2 + i) z_{2}$
Given line is perpendicular to AB.

$∴$ Its equation is $| z - z_{1} | = | z - z_{2} |$
$\Rightarrow z (_{1} -_{2}) + ¯ z (z_{1} - z_{2}) = | z_{1} |^{2} - | z_{2} |^{2} \dots \dots (i)$
$(2 + i) z + (2 - i) ¯ z = λ \dots \dots (i i)$
From (i) and (ii)
$\frac{_{1} -_{2}}{2 + i} = \frac{z_{1} - z_{2}}{2 - i} = \frac{| z_{1} |^{2} - | z_{2} |^{2}}{λ} = k$
$\Rightarrow λ = \frac{| z_{1} |^{2} - | z_{2} |^{2}}{k}$
$2 + i = \frac{_{1} -_{2}}{k}, 2 - i = \frac{z_{1} - z_{2}}{k}$
$∴ (2 + i) z_{1} + (2 - i)_{2} = \frac{_{1} -_{2}}{k} z_{1} + (\frac{z_{1} - z_{2}}{k})_{2} = \frac{| z_{1} |^{2} - | z_{2} |^{2}}{k} = λ$
Similarly conjugate of (iii) gives a solution

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Let (2+i)z+(2−i)¯z=λ,λϵR, be a straight line in the complex plane. If A(z1) and B(z2) are 2 points in the plane such that AB is perpendicular to the given line and also the midpoint of AB lies on the given line, then λ is equal to

Let $(2 + i) z + (2 - i) ¯ z = λ, λ ϵ R$ , be a straight line in the complex plane. If $A (z_{1})$ and $B (z_{2})$ are 2 points in the plane such that AB is perpendicular to the given line and also the midpoint of AB lies on the given line, then $λ$ is equal to