Know all about a circle
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All the details related to a circle.
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Know all about a circle
- 1. Know all about a Circle THE COLLECTION OF ALL THE POINTS IN A PLANE , WHICH ARE AT A FIXED DISTANCE FROM A FIXED POINT IN A PLANE, IS CALLED A CIRCLE
- 2. Parts of a circle
- 3. Line OB and OA are the radii of the circle D AB and CD are chords of the circle CF is also the chord of the cirle known as C O F DIAMETER Diameter is the longest - A B ---------------- of the circle
- 4. Area in green part is known as major sector Area in minor part is known as ----------------- And the arc comprised in these sectors are respectively known as Major arc Minor arc.
- 5. Angle ABC is subtended angle in circle with centre o Angle DOE is the central angle as it is making angle at the centre. Angles made in circle : the angles lying anywhere ON the the circle made by chords is known as SUBTENDED angle ( line AC is the chord)
- 6. A segment is any region in a circle separated by a chord Portion in green region is known as the Major segment Portion in purple color is known as minor segment What is the segment separated by a diameter Major segment , minor segment and known as?? Semicircles
- 7. Quick recap of A all the terms From the figure aside name the following : 1. Points in the interior of the circle 2. Diameter of the circle O B 3.Radius of the circle 4.Subtended angle in the circle 5.Central angle in the circle C 6.Major sector D 7.Minor sector 8.Semicricle
- 8. Equal chords of a circle subtend equal angles at the centre
- 9. Given: Chord AB = chord DC To Prove: A D angle AOB= angle DOC Proof: In Triangle ABC and triangle DOC OO AB=DC given AO=OC radii of same circle BO=OD radii of same circle C B Triangle AOB= Triangle DOC angle AOB= angle DOC (C.P.C.T) Equal chords of a circle subtend Hence proved……. equal angles at the centre
- 10. Given : Angle AOB= angle COD To prove: A B chord AB= Chord CD ` Proof: In triangle AOB and triangle COD C Angle AOB= angle COD (given ) O AO=OC radii of same circle BO=OD radii of same circle Triangle AOB= Triangle DOC D chord AB= Chord CD If the angles subtended by the chords of a circle at the centre are congruent , then the chords are congruent.
- 11. Given : OD perpendicular AB To prove:AD=DB Proof: In triangle AOD and triangle DOB O OA=OB radius OD=OD common side Angle ODA=angle ODB A D B (90 degrees.) Triangle AOD=ODB (R-H-S test) The perpendicular from the centre of the circle bisects the chord. AD=DB ( C.P.C.T)
- 12. Given : AD=DB To prove: OD perpendicular AB Proof: In triangle AOD and triangle DOB O OA=OB radius OD=OD common side AD=DB given triangle AOD = triangle A DOB S-S-S test D B Angle ODB=OAD (C.P.C.T) Angle ODB+angle OAD=180 linear pair The line drawn through the centre Angle ODB= ½ angleADB of a circle to bisect the chord is Angle ODB=90 perpendicular to the chord
- 13. Circle through 1,2,3, points On a sheet of paper try drawing circle through one point Two points Three points What do you see?
- 14. Answers Many circles can be drawn from one point Many circles can be drawn from two points But one and only one circle can be drawn from three points.
- 15. Try naming them and proving it. O OD is perpendicular to the line Others are all hypotenuse In a right angle triangle hypotenuse is the longest side… D So ………………………………… ………. The length of the perpendicular from a point to a line is the (shortest) distance of the line from the centre
- 16. Given: AB=CD To prove: OF=OE C Draw OF perpendicular to OE A O OOO E F D B Equal chords of a circle (or congruent circles) are equidistant from the centre
- 17. Pick statements in proper order to prove the theorem and match the reasons Statements Reasons AF=FB Radii of same circle AF=1/2AB C.P.C.T CE=ED Given CE=1/2CD Radii of same circle CE=AF S-S-S test Chord AF=chord CE S-A-S test OA =OC Each 90 degrees OB=OD In triangles AOF and OCE Triangles congruent by Angle F= Angle E OF=OE
- 18. Chords Equidistant from the centre of a circle are equal in length (converse of the earlier theorem) Try proving this………………….. Have fun
- 19. Concentric circles : Circle with same centre are known as concentric circ ooo
- 20. M The angels subtended by an arc at the centre is double the angle subtended by it at any point on the remaining part of the circle o Angle . AMB is half of angle AOB Angle AOB= angle of arc ACB A B Angle AMB= ½ of arc AMB C Angles Subtended by an Arc of a chord.
- 21. Angles ADB C ACB AEB E All lie in arc AMB D Hence all are equal to ½ arc AMB So angle A B ADB =ACB=AEB=1/2 M arc AMB Angles in the same segment of a circle are equal
- 22. Cyclic Quadrilaterals A Quadrilateral whose 4 corners are on sides of the circle is known as cyclic Quadrilateral
- 23. Properties of 1. the sum of either pair of Cyclic opposite angles of a cyclic Quadrilateral quadrilateral is 180 degrees If the sum of opposite angles of a quadrilateral is 180 degrees its cyclic quadrilateral.