For w to be purely imaginary, 1−z1+(1−8α)z+1−zˉ1+(1−8α)zˉ=0
⇒1−zˉ+(1−8α)z−(1−8α)+1−z+(1−8α)zˉ−(1−8α)=0
⇒2−(z+zˉ)+(1−8α)(z+zˉ)−2+16α=0
⇒8α(z+zˉ)=16α
⇒z+zˉ=2 or α=0
For all z∈C, we have α=0.
The set of all α∈R, for which w=1−z1+(1−8α)z is a purely imaginary number, for all z∈C satisfying ∣z∣=1 and Re(z)=1, is :
Held on 15 Apr 2018 · Verified 6 Jul 2026.
0
0,41,−41
equal to R
an empty set
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