[color=#ff0000][b]Definition:[/b][/color][br][br]A [color=#0000ff][b]cyclic quadrilateral[/b][/color], by definition, is [color=#0000ff]any quadrilateral that can be inscribed inside a circle.  That is, all 4 vertices of a cyclic quadrilateral always lie on the circle itself. [/color] [br][br]First, interact with the applet, and then answer the questions that follow.  [br]

Based upon your observations, [color=#ff0000][i]what can you conclude about both pairs of opposite angles of any cyclic quadrilateral?[/i][/color]  [br][br]Prove your assertion true using a theorem previously learned.  Explain fully why what you've observed in the applet above is true.   [br][br]

File originated from  [url=https://www.geogebra.org/tbrzezinski]Tim Brzezinski[/url]