Let the complex numbers z1, z2 and z3 re...

Let the complex numbers `z_1`, `z_2` and `z_3` represent the vertices A, B and C of a triangle ABC respectively, which is inscribed in the circle of radius unity and centre at origin.The internal bisector of the angle A meets the circumcircle again at the point D, Which is represented by the complex number `z_4` and altitude from A to BC meets the circumcircle at E. given by `z_5`. Then `arg([z_2z_3]/z_4^2)` is equal to

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