Maths

Unit 8 : Angles Properties in Circles Learning Objectives The students should be fitted to: secern various ingredients of a circle. kingdom the properties of harmonizes of a circle. state and go for the quality of angles at the displace. state and apply the property of angles in the same department. make do the property of angles in a semi-circle. explain the meaning of the con cyclic points. state the properties of angles in a cyclic quadrilateral. state the definition of a tangent to a circle. recognize the properties of the tangents to a circle. state and apply the alternate component theorem. Circles 1.Parts of a circle A circle is a shut wave in a plane such that whole points on the curve be equidistant from a primed(p) point. The given blank space is called the radius of the circle. A chord is a distribution channel segment with its end points on the circle and a diameter is a chord passing through the centre. An dismissal is a part of the circle. A segment is the region jump by a chord and an arc of the circle. A domain is the region jump by two radii and an arc. 2.Chords of a circle next are properties on chords of a circle. All these facts can be prove by the properties of congruent triangles.

|Theorem |Example | | ! |O is the centre of the circle. hold the unknown in each of the | |Theorem 1 |following figures. | | | | |The line joining the centre to the midpoint of a chord is perpendicular style |1.1...If you want to get a full essay, run it on our website: OrderCustomPaper.com

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