Activity[br]1. Complete the table below based on your manipulation of any of the points B,C,D, or E.[br][img]data:image/png;base64,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[/img][br] Remember that :[br] a) segments BF and DF are secants intersecting outside the circle [br] b) CF is a part of segment BF located outside the circle[br] c) EF is a part of segment DF located outside the circle.[br]2. What conjecture maybe formed based on your completed table?[br][br] [br]