![]() ![]() Segments created with a secant and a tangent drawn to a circle from a common point Segments created with two secants drawn to a circle from a common pointĦ. Two tangents drawn to a circle from a common point are congruentĥ. Segments created with two intersecting ChordsĤ. A diameter (or radius) perpendicular to a chord, bisects that chord (and the converse)ģ. Parallel Chords intersect congruent arcsĢ. List of Circle Proofs to know: (see the formal proofs here - circle_theorem_proofs.pdfġ. More Super Circle Work: g.c.a.2.chordssecantsandtangents18.pdfĬircle Notes and Theorems: circle_notes.pdf geom_circle_angle_measure_rules.pdfĮxam on Circles Wed 5/16: All segment relationships, all angle relationships, super circles, circle proofs (see list below), equation of a circle, area of a sector and arc length of a circle. ![]() Segments Intercepted by Circle #4,5,6: g.g.53.456segmentsinterceptedbycircle456.pdf Solutions: seg_intercepted_circle_answers.pdfĬhords #2: pr_chords_2_12.pdf Answers: pr_chords_2.pdfĪrc Length and Area of Sector: arc_length_and_sector_area_solutions_cw.pdf Solutions: segs_practice_a.pdf and segs_reteach.pdf Secants and Tangents: chords_secants_and_tangents14.pdf w/answers: chords_secants_and_tangents.pdfĬircle Packet with Segments: circle_packet_with_segments.pdf POW extra credit: pow_supercircle.jpg pow_supercircle2.jpg pow_complete_square.jpg ![]()
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