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Transcript
LINES THAT INTERSECT CIRCLES Geometry CP1 (Holt 12-1) K. Santos Circle definition Circle: set of all points in a plane that are a given distance (radius) from a given point (center). Circle P P Radius: is a segment that connects the center of the circle to a point on the circle Interior & Exterior of a circle Interior of a circle: set of all the points inside the circle Exterior of a circle: set of all points outside the circle exterior interior Lines & Segments that intersect a circle A G F E O B C D Chord: is a segment whose endpoints lie on a circle. Diameter: -a chord that contains the center -connects two points on the circle and passes through the center Secant: line that intersects a circle at two points Tangent β’ A tangent to a circle is a line in the plane of the circle that intersects the circle in exactly one point π΄π΅ β’ Tangent may be a line, ray, or segment β’ The point where a circle and a tangent intersect is the point of tangency Point B A B Pairs of circles Congruent Circles: two circles that have congruent radii Concentric Circles: coplanar circles with the same center Tangent Circles Tangent Circles: coplanar circles that intersect at exactly one point Internally tangent circles externally tangent circles Common Tangent Common tangent: a line that is tangent to two circles Common external tangents common internal tangents Theorem 12-1-1 If a line is tangent to a circle, then the line is perpendicular to the radius drawn to the point of tangency. O A Given: π΄π΅ is tangent to circle O Then: π΄π΅βππ P B Example πΈπ· is tangent to circle O. Radius is 5β and ED = 12β Find the length of ππ· . O E D Remember Pythagorean theorem (let ππ· = x) π₯ 2 = 52 + 122 π₯ 2 = 25 + 144 π₯ 2 = 169 x= 169 x = 13 Example Find x. 130° x Radius perpendicular to tangents (right angles) Sum of the angles in a quadrilateral are 360° 90 + 90 + 130 + x = 360 310 + x = 360 x = 50° Theorem 12-1-2 If a line in the plane of a circle is perpendicular to a radius at its endpoint on the circle, then the line is tangent to the circle. O A Given: π΄π΅βππ Then: π΄π΅ is tangent to circle O P B ExampleβIs there a tangent line? Determine if there is a tangent line? 12 8 6 If there is a tangent then there must have been a right angle (in a right triangle). Test for a right angle. 122 62 + 82 144 36 + 64 144 β 100 so there is no right angle, no tangent line Theorem 12-1-3 If two segments are tangent to a circle from the same point, then the segments are congruent. A B C Given: π΄π΅ and πΆπ΅ are tangents to the circle Then: π΄π΅ β πΆπ΅ Example: R π π and π π are tangent to circle Q. Find RS. 2n β 1 T RT = RS 2n β 1 = n + 3 nβ1=3 n=4 RS = n + 3 RS = 4 + 3 RS = 7 n+3 S
