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Catégorie :Category: nCreator TI-Nspire
Auteur Author: cheeseburgqr
Type : Classeur 3.0.1
Page(s) : 1
Taille Size: 1.79 Ko KB
Mis en ligne Uploaded: 25/08/2025 - 10:48:07
Uploadeur Uploader: cheeseburgqr (Profil)
Téléchargements Downloads: 1
Visibilité Visibility: Archive publique
Shortlink : https://tipla.net/a4826285

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Fichier Nspire généré sur TI-Planet.org.

Compatible OS 3.0 et ultérieurs.

<<
1) Angle at the centre is twice the angle at thecircumference Theorem. For a circle with centre   and distinct points   on the circle (with   on arc ), Proof. Join . Since   (radii), triangles   and   are isosceles. Let Then So At the circumference, Thus 2) Angle in a semicircle is a right angle Theorem. If   is a diameter and   lies on the circle, then . Proof. . By Theorem 1: 3) Angles in the same segment are equal Theorem. If   lie on a circle with   on the same arc , then Proof. By Theorem 1: So . 4) Opposite angles of a cyclic quadrilateral Theorem. If   is cyclic, then Proof. Angles   subtend supplementary arcs: But arcs . So Same for . 5) Radius  tangent Theorem. If tangent touches circle at   and centre is , then . Proof. Take any other point   on tangent line . Then   since only   lies on circle. The shortest distance from   to line   is the perpendicular, so   is perpendicular. 6) Alternate segment theorem(tangentchord) Theorem. If tangent at   and chord   are drawn, then for any point   on the opposite arc. Proof. Let . By Theorem 1: In , isosceles with , Now angle between tangent at   and chord   is Sotangentchord angle = inscribed angle. Made with nCreator - tiplanet.org
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