If z(1), z(2), z(3), z(4) are the affixe...

If `z_(1), z_(2), z_(3), z_(4)` are the affixes of four points in the Argand plane, z is the affix of a point such that `|z-z_(1)| = |z-z_(2)|=|z-z_(3)|= |z-z_(4)|`, then prove that `z_(1), z_(2), z_(3), z_(4)` are concyclic

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If `z_(1), z_(2), z_(3), z_(4)` are the affixes of four points in the Argand plane, z is the affix of a point such that `|z-z_(1)| = |z-z_(2)|=|z-z_(3)|= |z-z_(4)|`, then prove that `z_(1), z_(2), z_(3), z_(4)` are concyclic

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