Chapter 12 – Line Bisectors and Angle BisectorsPost author:AuthorPost published:November 25, 2018Post category:Class 9 Maths Notes / FiPDFPost comments:2 CommentsTheory / DefinitionsChapter 12 – Line Bisectors and Angle BisectorsClass 9 Maths NotesExercise No : 12.1Chapter 12 – Line Bisectors and Angle BisectorsClass 9 Maths NotesExercise No : 12.2Chapter 12 – Line Bisectors and Angle BisectorsClass 9 Maths NotesExercise No : 12.3Chapter 12 – Line Bisectors and Angle BisectorsClass 9 Maths NotesReview Exercise 12Chapter 12 – Line Bisectors and Angle BisectorsClass 9 Maths NotesSHARE WITH OTHERS:Click to share on Facebook (Opens in new window)Click to share on WhatsApp (Opens in new window)Click to share on Twitter (Opens in new window)Click to share on LinkedIn (Opens in new window)Download Freeilm.com Android App (15MB)Read more articles Previous PostChapter 11 – Parallelograms and Triangles Next PostChapter 13 – Sides and Angles of Triangles You Might Also Like Nazam 4 – Pewasta Reh Shajar Se Umeed Bahar Rakh July 21, 2020 Theorems Related With Area – Definitions August 8, 2020 This Post Has 2 Comments Raees January 20, 2020 Reply Salam sir theorem 12.1 exercise question number 1 is wrong . Question is “prove that the center to circle is on right bisector of each chords of circle.” But in this theorem they prove that O is the center of circle.So please cheak it……:D Adnan Ansar February 16, 2021 Reply amazing sirLeave a Reply Cancel replyCommentEnter your name or username to commentEnter your email address to commentEnter your website URL (optional) Δ
Raees January 20, 2020 Reply Salam sir theorem 12.1 exercise question number 1 is wrong . Question is “prove that the center to circle is on right bisector of each chords of circle.” But in this theorem they prove that O is the center of circle.So please cheak it……:D
Salam sir theorem 12.1 exercise question number 1 is wrong . Question is “prove that the center to circle is on right bisector of each chords of circle.” But in this theorem they prove that O is the center of circle.So please cheak it……:D
amazing sir