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Question
If z−αz+α(α∈R) is a purely imaginary number and |z|=2, then a value of α is:
If z−αz+α(α∈R) is a purely imaginary number and |z|=2, then a value of α is:
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Solution
The correct option is B 2
Let u =z−αz+α
As, u is purely imaginary
So, u+¯u=0
⇒z−αz+α+¯z−α¯z+α=0
⇒z¯z+zα−¯zα−α2+z¯z−zα+¯zα−α2=0
⇒2z¯z−2α2=0
⇒|z|2=α2
⇒α=±|z|
⇒α=±2
Let u =z−αz+α
As, u is purely imaginary
So, u+¯u=0
⇒z−αz+α+¯z−α¯z+α=0
⇒z¯z+zα−¯zα−α2+z¯z−zα+¯zα−α2=0
⇒2z¯z−2α2=0
⇒|z|2=α2
⇒α=±|z|
⇒α=±2
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