Let w I m w ≠0 be a complex number. Then, the set of all complex numbers z satisfying the equation w - w ¯ z = k 1 - z , for some real number k , is

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w ∈ C , I m w ≠ 0 ⇒ w = a + i b : b ≠0 (suppose) w - w ¯ z = k 1 - z If z = x + i y ⇒ a + i b - a - i b x + i y = k { 1 - x + i y } ⇒ a + i b - a x + i a y - i b x + b y = k - k x - i k y Equating real and imaginary parts a - a x - b y = k - k x … ( 1 ) and b - a y + b x = - k y … 2 From 1 k - a x - 1 = b y 2 k - a y = b ( x + 1 ) Dividing the two equations, we get, x - 1 y = y x + 1 ⇒ x 2 - 1 = y 2 ⇒ x 2 + y 2 = 1 ⇒ z = 1 z ≠ 1 + i 0 ( ∴ if z = 1 then from original equation w = w ⇒ a + i b = a - i b ⇒ b = 0 )

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